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Rework some figures + add some control diagrams

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Thomas Dehaeze 2020-11-06 16:59:03 +01:00
parent 3b14dd83d8
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43 changed files with 923 additions and 2301 deletions
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@ -3,7 +3,7 @@
"http://www.w3.org/TR/xhtml1/DTD/xhtml1-strict.dtd"> "http://www.w3.org/TR/xhtml1/DTD/xhtml1-strict.dtd">
<html xmlns="http://www.w3.org/1999/xhtml" lang="en" xml:lang="en"> <html xmlns="http://www.w3.org/1999/xhtml" lang="en" xml:lang="en">
<head> <head>
<!-- 2020-11-06 ven. 15:06 --> <!-- 2020-11-06 ven. 16:58 -->
<meta http-equiv="Content-Type" content="text/html;charset=utf-8" /> <meta http-equiv="Content-Type" content="text/html;charset=utf-8" />
<title>SVD Control</title> <title>SVD Control</title>
<meta name="generator" content="Org mode" /> <meta name="generator" content="Org mode" />
@ -35,56 +35,57 @@
<h2>Table of Contents</h2> <h2>Table of Contents</h2>
<div id="text-table-of-contents"> <div id="text-table-of-contents">
<ul> <ul>
<li><a href="#org588d944">1. Gravimeter - Simscape Model</a> <li><a href="#org35a46c7">1. Gravimeter - Simscape Model</a>
<ul> <ul>
<li><a href="#org91ed3f1">1.1. Introduction</a></li> <li><a href="#org0fae6d2">1.1. Introduction</a></li>
<li><a href="#org2a3289b">1.2. Simscape Model - Parameters</a></li> <li><a href="#org135842b">1.2. Simscape Model - Parameters</a></li>
<li><a href="#orge1533ee">1.3. System Identification - Without Gravity</a></li> <li><a href="#org7170b34">1.3. System Identification - Without Gravity</a></li>
<li><a href="#orgbcef719">1.4. System Identification - With Gravity</a></li> <li><a href="#orgedddbaf">1.4. System Identification - With Gravity</a></li>
<li><a href="#org24c3a91">1.5. Analytical Model</a> <li><a href="#org1df2360">1.5. Analytical Model</a>
<ul> <ul>
<li><a href="#orgfdc2987">1.5.1. Parameters</a></li> <li><a href="#org33301c4">1.5.1. Parameters</a></li>
<li><a href="#org620e32a">1.5.2. Generation of the State Space Model</a></li> <li><a href="#orga4d2293">1.5.2. Generation of the State Space Model</a></li>
<li><a href="#orgfe0c577">1.5.3. Comparison with the Simscape Model</a></li> <li><a href="#org6769845">1.5.3. Comparison with the Simscape Model</a></li>
<li><a href="#orga854866">1.5.4. Analysis</a></li> <li><a href="#org643ea44">1.5.4. Analysis</a></li>
<li><a href="#org95a6eba">1.5.5. Control Section</a></li> <li><a href="#orgcccb3fe">1.5.5. Control Section</a></li>
<li><a href="#org9b1baf2">1.5.6. Greshgorin radius</a></li> <li><a href="#orgf251330">1.5.6. Greshgorin radius</a></li>
<li><a href="#org80e1355">1.5.7. Injecting ground motion in the system to have the output</a></li> <li><a href="#orgcc8b8c9">1.5.7. Injecting ground motion in the system to have the output</a></li>
</ul> </ul>
</li> </li>
</ul> </ul>
</li> </li>
<li><a href="#org4c3e754">2. Gravimeter - Functions</a> <li><a href="#org3a10e2f">2. Gravimeter - Functions</a>
<ul> <ul>
<li><a href="#org790312c">2.1. <code>align</code></a></li> <li><a href="#org40d4ae0">2.1. <code>align</code></a></li>
<li><a href="#orge6969fe">2.2. <code>pzmap_testCL</code></a></li> <li><a href="#orgb65d1a4">2.2. <code>pzmap_testCL</code></a></li>
</ul> </ul>
</li> </li>
<li><a href="#org9d512a7">3. Stewart Platform - Simscape Model</a> <li><a href="#org7761bbf">3. Stewart Platform - Simscape Model</a>
<ul> <ul>
<li><a href="#org1235f4d">3.1. Simscape Model - Parameters</a></li> <li><a href="#org7ecae48">3.1. Simscape Model - Parameters</a></li>
<li><a href="#org8c80aff">3.2. Identification of the plant</a></li> <li><a href="#orge09a2ff">3.2. Identification of the plant</a></li>
<li><a href="#orgffd8770">3.3. Obtained Dynamics</a></li> <li><a href="#org94abd99">3.3. Physical Decoupling using the Jacobian</a></li>
<li><a href="#org639dffa">3.4. Real Approximation of \(G\) at the decoupling frequency</a></li> <li><a href="#orge18ab64">3.4. Real Approximation of \(G\) at the decoupling frequency</a></li>
<li><a href="#org0cb963a">3.5. Verification of the decoupling using the &ldquo;Gershgorin Radii&rdquo;</a></li> <li><a href="#org83f6d87">3.5. SVD Decoupling</a></li>
<li><a href="#org1e039d4">3.6. Decoupled Plant</a></li> <li><a href="#org6de1985">3.6. Verification of the decoupling using the &ldquo;Gershgorin Radii&rdquo;</a></li>
<li><a href="#orga66d3f9">3.7. Diagonal Controller</a></li> <li><a href="#org3f44896">3.7. Obtained Decoupled Plants</a></li>
<li><a href="#orgdeb9b20">3.8. Closed-Loop system Performances</a></li> <li><a href="#org32f4718">3.8. Diagonal Controller</a></li>
<li><a href="#orgc4a81f5">3.9. Closed-Loop system Performances</a></li>
</ul> </ul>
</li> </li>
</ul> </ul>
</div> </div>
</div> </div>
<div id="outline-container-org588d944" class="outline-2"> <div id="outline-container-org35a46c7" class="outline-2">
<h2 id="org588d944"><span class="section-number-2">1</span> Gravimeter - Simscape Model</h2> <h2 id="org35a46c7"><span class="section-number-2">1</span> Gravimeter - Simscape Model</h2>
<div class="outline-text-2" id="text-1"> <div class="outline-text-2" id="text-1">
</div> </div>
<div id="outline-container-org91ed3f1" class="outline-3"> <div id="outline-container-org0fae6d2" class="outline-3">
<h3 id="org91ed3f1"><span class="section-number-3">1.1</span> Introduction</h3> <h3 id="org0fae6d2"><span class="section-number-3">1.1</span> Introduction</h3>
<div class="outline-text-3" id="text-1-1"> <div class="outline-text-3" id="text-1-1">
<div id="orgb33269b" class="figure"> <div id="orgbed6454" class="figure">
<p><img src="figs/gravimeter_model.png" alt="gravimeter_model.png" /> <p><img src="figs/gravimeter_model.png" alt="gravimeter_model.png" />
</p> </p>
<p><span class="figure-number">Figure 1: </span>Model of the gravimeter</p> <p><span class="figure-number">Figure 1: </span>Model of the gravimeter</p>
@ -92,8 +93,8 @@
</div> </div>
</div> </div>
<div id="outline-container-org2a3289b" class="outline-3"> <div id="outline-container-org135842b" class="outline-3">
<h3 id="org2a3289b"><span class="section-number-3">1.2</span> Simscape Model - Parameters</h3> <h3 id="org135842b"><span class="section-number-3">1.2</span> Simscape Model - Parameters</h3>
<div class="outline-text-3" id="text-1-2"> <div class="outline-text-3" id="text-1-2">
<div class="org-src-container"> <div class="org-src-container">
<pre class="src src-matlab">open(<span class="org-string">'gravimeter.slx'</span>) <pre class="src src-matlab">open(<span class="org-string">'gravimeter.slx'</span>)
@ -124,8 +125,8 @@ g = 0; <span class="org-comment">% Gravity [m/s2]</span>
</div> </div>
</div> </div>
<div id="outline-container-orge1533ee" class="outline-3"> <div id="outline-container-org7170b34" class="outline-3">
<h3 id="orge1533ee"><span class="section-number-3">1.3</span> System Identification - Without Gravity</h3> <h3 id="org7170b34"><span class="section-number-3">1.3</span> System Identification - Without Gravity</h3>
<div class="outline-text-3" id="text-1-3"> <div class="outline-text-3" id="text-1-3">
<div class="org-src-container"> <div class="org-src-container">
<pre class="src src-matlab"><span class="org-matlab-cellbreak"><span class="org-comment">%% Name of the Simulink File</span></span> <pre class="src src-matlab"><span class="org-matlab-cellbreak"><span class="org-comment">%% Name of the Simulink File</span></span>
@ -147,7 +148,7 @@ G.OutputName = {<span class="org-string">'Ax1'</span>, <span class="org-string">
</pre> </pre>
</div> </div>
<pre class="example" id="org554e6db"> <pre class="example" id="org9123e1b">
pole(G) pole(G)
ans = ans =
-0.000473481142385795 + 21.7596190728632i -0.000473481142385795 + 21.7596190728632i
@ -172,7 +173,7 @@ State-space model with 4 outputs, 3 inputs, and 6 states.
<div id="org238cc1e" class="figure"> <div id="org891f1ff" class="figure">
<p><img src="figs/open_loop_tf.png" alt="open_loop_tf.png" /> <p><img src="figs/open_loop_tf.png" alt="open_loop_tf.png" />
</p> </p>
<p><span class="figure-number">Figure 2: </span>Open Loop Transfer Function from 3 Actuators to 4 Accelerometers</p> <p><span class="figure-number">Figure 2: </span>Open Loop Transfer Function from 3 Actuators to 4 Accelerometers</p>
@ -180,8 +181,8 @@ State-space model with 4 outputs, 3 inputs, and 6 states.
</div> </div>
</div> </div>
<div id="outline-container-orgbcef719" class="outline-3"> <div id="outline-container-orgedddbaf" class="outline-3">
<h3 id="orgbcef719"><span class="section-number-3">1.4</span> System Identification - With Gravity</h3> <h3 id="orgedddbaf"><span class="section-number-3">1.4</span> System Identification - With Gravity</h3>
<div class="outline-text-3" id="text-1-4"> <div class="outline-text-3" id="text-1-4">
<div class="org-src-container"> <div class="org-src-container">
<pre class="src src-matlab">g = 9.80665; <span class="org-comment">% Gravity [m/s2]</span> <pre class="src src-matlab">g = 9.80665; <span class="org-comment">% Gravity [m/s2]</span>
@ -198,7 +199,7 @@ Gg.OutputName = {<span class="org-string">'Ax1'</span>, <span class="org-string"
<p> <p>
We can now see that the system is unstable due to gravity. We can now see that the system is unstable due to gravity.
</p> </p>
<pre class="example" id="orgc834be0"> <pre class="example" id="org07f9663">
pole(Gg) pole(Gg)
ans = ans =
-10.9848275341252 + 0i -10.9848275341252 + 0i
@ -210,7 +211,7 @@ ans =
</pre> </pre>
<div id="orge2ad788" class="figure"> <div id="orgc42d08d" class="figure">
<p><img src="figs/open_loop_tf_g.png" alt="open_loop_tf_g.png" /> <p><img src="figs/open_loop_tf_g.png" alt="open_loop_tf_g.png" />
</p> </p>
<p><span class="figure-number">Figure 3: </span>Open Loop Transfer Function from 3 Actuators to 4 Accelerometers with an without gravity</p> <p><span class="figure-number">Figure 3: </span>Open Loop Transfer Function from 3 Actuators to 4 Accelerometers with an without gravity</p>
@ -218,12 +219,12 @@ ans =
</div> </div>
</div> </div>
<div id="outline-container-org24c3a91" class="outline-3"> <div id="outline-container-org1df2360" class="outline-3">
<h3 id="org24c3a91"><span class="section-number-3">1.5</span> Analytical Model</h3> <h3 id="org1df2360"><span class="section-number-3">1.5</span> Analytical Model</h3>
<div class="outline-text-3" id="text-1-5"> <div class="outline-text-3" id="text-1-5">
</div> </div>
<div id="outline-container-orgfdc2987" class="outline-4"> <div id="outline-container-org33301c4" class="outline-4">
<h4 id="orgfdc2987"><span class="section-number-4">1.5.1</span> Parameters</h4> <h4 id="org33301c4"><span class="section-number-4">1.5.1</span> Parameters</h4>
<div class="outline-text-4" id="text-1-5-1"> <div class="outline-text-4" id="text-1-5-1">
<p> <p>
Bode options. Bode options.
@ -255,8 +256,8 @@ Frequency vector.
</div> </div>
</div> </div>
<div id="outline-container-org620e32a" class="outline-4"> <div id="outline-container-orga4d2293" class="outline-4">
<h4 id="org620e32a"><span class="section-number-4">1.5.2</span> Generation of the State Space Model</h4> <h4 id="orga4d2293"><span class="section-number-4">1.5.2</span> Generation of the State Space Model</h4>
<div class="outline-text-4" id="text-1-5-2"> <div class="outline-text-4" id="text-1-5-2">
<p> <p>
Mass matrix Mass matrix
@ -357,11 +358,11 @@ State-space model with 12 outputs, 6 inputs, and 6 states.
</div> </div>
</div> </div>
<div id="outline-container-orgfe0c577" class="outline-4"> <div id="outline-container-org6769845" class="outline-4">
<h4 id="orgfe0c577"><span class="section-number-4">1.5.3</span> Comparison with the Simscape Model</h4> <h4 id="org6769845"><span class="section-number-4">1.5.3</span> Comparison with the Simscape Model</h4>
<div class="outline-text-4" id="text-1-5-3"> <div class="outline-text-4" id="text-1-5-3">
<div id="orgc91e57a" class="figure"> <div id="orgc235221" class="figure">
<p><img src="figs/gravimeter_analytical_system_open_loop_models.png" alt="gravimeter_analytical_system_open_loop_models.png" /> <p><img src="figs/gravimeter_analytical_system_open_loop_models.png" alt="gravimeter_analytical_system_open_loop_models.png" />
</p> </p>
<p><span class="figure-number">Figure 4: </span>Comparison of the analytical and the Simscape models</p> <p><span class="figure-number">Figure 4: </span>Comparison of the analytical and the Simscape models</p>
@ -369,8 +370,8 @@ State-space model with 12 outputs, 6 inputs, and 6 states.
</div> </div>
</div> </div>
<div id="outline-container-orga854866" class="outline-4"> <div id="outline-container-org643ea44" class="outline-4">
<h4 id="orga854866"><span class="section-number-4">1.5.4</span> Analysis</h4> <h4 id="org643ea44"><span class="section-number-4">1.5.4</span> Analysis</h4>
<div class="outline-text-4" id="text-1-5-4"> <div class="outline-text-4" id="text-1-5-4">
<div class="org-src-container"> <div class="org-src-container">
<pre class="src src-matlab"><span class="org-comment">% figure</span> <pre class="src src-matlab"><span class="org-comment">% figure</span>
@ -438,8 +439,8 @@ State-space model with 12 outputs, 6 inputs, and 6 states.
</div> </div>
</div> </div>
<div id="outline-container-org95a6eba" class="outline-4"> <div id="outline-container-orgcccb3fe" class="outline-4">
<h4 id="org95a6eba"><span class="section-number-4">1.5.5</span> Control Section</h4> <h4 id="orgcccb3fe"><span class="section-number-4">1.5.5</span> Control Section</h4>
<div class="outline-text-4" id="text-1-5-5"> <div class="outline-text-4" id="text-1-5-5">
<div class="org-src-container"> <div class="org-src-container">
<pre class="src src-matlab">system_dec_10Hz = freqresp(system_dec,2<span class="org-type">*</span><span class="org-constant">pi</span><span class="org-type">*</span>10); <pre class="src src-matlab">system_dec_10Hz = freqresp(system_dec,2<span class="org-type">*</span><span class="org-constant">pi</span><span class="org-type">*</span>10);
@ -579,8 +580,8 @@ legend(<span class="org-string">'Control OFF'</span>,<span class="org-string">'D
</div> </div>
</div> </div>
<div id="outline-container-org9b1baf2" class="outline-4"> <div id="outline-container-orgf251330" class="outline-4">
<h4 id="org9b1baf2"><span class="section-number-4">1.5.6</span> Greshgorin radius</h4> <h4 id="orgf251330"><span class="section-number-4">1.5.6</span> Greshgorin radius</h4>
<div class="outline-text-4" id="text-1-5-6"> <div class="outline-text-4" id="text-1-5-6">
<div class="org-src-container"> <div class="org-src-container">
<pre class="src src-matlab">system_dec_freq = freqresp(system_dec,w); <pre class="src src-matlab">system_dec_freq = freqresp(system_dec,w);
@ -626,8 +627,8 @@ ylabel(<span class="org-string">'Greshgorin radius [-]'</span>);
</div> </div>
</div> </div>
<div id="outline-container-org80e1355" class="outline-4"> <div id="outline-container-orgcc8b8c9" class="outline-4">
<h4 id="org80e1355"><span class="section-number-4">1.5.7</span> Injecting ground motion in the system to have the output</h4> <h4 id="orgcc8b8c9"><span class="section-number-4">1.5.7</span> Injecting ground motion in the system to have the output</h4>
<div class="outline-text-4" id="text-1-5-7"> <div class="outline-text-4" id="text-1-5-7">
<div class="org-src-container"> <div class="org-src-container">
<pre class="src src-matlab">Fr = logspace(<span class="org-type">-</span>2,3,1e3); <pre class="src src-matlab">Fr = logspace(<span class="org-type">-</span>2,3,1e3);
@ -683,15 +684,15 @@ rot = PHI(<span class="org-type">:</span>,11,11);
</div> </div>
</div> </div>
<div id="outline-container-org4c3e754" class="outline-2"> <div id="outline-container-org3a10e2f" class="outline-2">
<h2 id="org4c3e754"><span class="section-number-2">2</span> Gravimeter - Functions</h2> <h2 id="org3a10e2f"><span class="section-number-2">2</span> Gravimeter - Functions</h2>
<div class="outline-text-2" id="text-2"> <div class="outline-text-2" id="text-2">
</div> </div>
<div id="outline-container-org790312c" class="outline-3"> <div id="outline-container-org40d4ae0" class="outline-3">
<h3 id="org790312c"><span class="section-number-3">2.1</span> <code>align</code></h3> <h3 id="org40d4ae0"><span class="section-number-3">2.1</span> <code>align</code></h3>
<div class="outline-text-3" id="text-2-1"> <div class="outline-text-3" id="text-2-1">
<p> <p>
<a id="org0505783"></a> <a id="orgfb353de"></a>
</p> </p>
<p> <p>
@ -720,11 +721,11 @@ This Matlab function is accessible <a href="gravimeter/align.m">here</a>.
</div> </div>
<div id="outline-container-orge6969fe" class="outline-3"> <div id="outline-container-orgb65d1a4" class="outline-3">
<h3 id="orge6969fe"><span class="section-number-3">2.2</span> <code>pzmap_testCL</code></h3> <h3 id="orgb65d1a4"><span class="section-number-3">2.2</span> <code>pzmap_testCL</code></h3>
<div class="outline-text-3" id="text-2-2"> <div class="outline-text-3" id="text-2-2">
<p> <p>
<a id="orga422981"></a> <a id="org5036f27"></a>
</p> </p>
<p> <p>
@ -773,15 +774,24 @@ This Matlab function is accessible <a href="gravimeter/pzmap_testCL.m">here</a>.
</div> </div>
</div> </div>
<div id="outline-container-org9d512a7" class="outline-2"> <div id="outline-container-org7761bbf" class="outline-2">
<h2 id="org9d512a7"><span class="section-number-2">3</span> Stewart Platform - Simscape Model</h2> <h2 id="org7761bbf"><span class="section-number-2">3</span> Stewart Platform - Simscape Model</h2>
<div class="outline-text-2" id="text-3"> <div class="outline-text-2" id="text-3">
<p> <p>
In this analysis, we wish to applied SVD control to the Stewart Platform shown in Figure <a href="#orge1e9c00">5</a>. In this analysis, we wish to applied SVD control to the Stewart Platform shown in Figure <a href="#org599d22c">5</a>.
</p> </p>
<p>
Some notes about the system:
</p>
<ul class="org-ul">
<li>6 voice coils actuators are used to control the motion of the top platform.</li>
<li>the motion of the top platform is measured with a 6-axis inertial unit (3 acceleration + 3 angular accelerations)</li>
<li>the control objective is to isolate the top platform from vibrations coming from the bottom platform</li>
</ul>
<div id="orge1e9c00" class="figure">
<div id="org599d22c" class="figure">
<p><img src="figs/SP_assembly.png" alt="SP_assembly.png" /> <p><img src="figs/SP_assembly.png" alt="SP_assembly.png" />
</p> </p>
<p><span class="figure-number">Figure 5: </span>Stewart Platform CAD View</p> <p><span class="figure-number">Figure 5: </span>Stewart Platform CAD View</p>
@ -791,21 +801,22 @@ In this analysis, we wish to applied SVD control to the Stewart Platform shown i
The analysis of the SVD control applied to the Stewart platform is performed in the following sections: The analysis of the SVD control applied to the Stewart platform is performed in the following sections:
</p> </p>
<ul class="org-ul"> <ul class="org-ul">
<li>Section <a href="#org1f1154c">3.1</a>: The parameters of the Simscape model of the Stewart platform are defined</li> <li>Section <a href="#orgfcb588b">3.1</a>: The parameters of the Simscape model of the Stewart platform are defined</li>
<li>Section <a href="#org76fc591">3.2</a>: The plant is identified from the Simscape model and the centralized plant is computed thanks to the Jacobian</li> <li>Section <a href="#org7e17fba">3.2</a>: The plant is identified from the Simscape model and the system coupling is shown</li>
<li>Section <a href="#org4d48d60">3.3</a>: The identified Dynamics is shown</li> <li>Section <a href="#org6c132b8">3.3</a>: The plant is first decoupled using the Jacobian</li>
<li>Section <a href="#orgf063500">3.4</a>: A real approximation of the plant is computed for further decoupling using the Singular Value Decomposition (SVD)</li> <li>Section <a href="#orga31d045">3.4</a>: A real approximation of the plant is computed for further decoupling using the Singular Value Decomposition (SVD)</li>
<li>Section <a href="#org6d984d9">3.5</a>: The decoupling is performed thanks to the SVD. The effectiveness of the decoupling is verified using the Gershorin Radii</li> <li>Section <a href="#org4dc6a4f">3.5</a>: The decoupling is performed thanks to the SVD</li>
<li>Section <a href="#org083c541">3.6</a>: The dynamics of the decoupled plant is shown</li> <li>Section <a href="#org3f0c4bc">3.6</a>: The effectiveness of the decoupling with the Jacobian and SVD are compared using the Gershorin Radii</li>
<li>Section <a href="#org7fb568e">3.7</a>: A diagonal controller is defined to control the decoupled plant</li> <li>Section <a href="#orgaedd69e">3.7</a>: The dynamics of the decoupled plants are shown</li>
<li>Section <a href="#org3072cea">3.8</a>: Finally, the closed loop system properties are studied</li> <li>Section <a href="#org594262e">3.8</a>: A diagonal controller is defined to control the decoupled plant</li>
<li>Section <a href="#orga712b26">3.9</a>: Finally, the closed loop system properties are studied</li>
</ul> </ul>
</div> </div>
<div id="outline-container-org1235f4d" class="outline-3"> <div id="outline-container-org7ecae48" class="outline-3">
<h3 id="org1235f4d"><span class="section-number-3">3.1</span> Simscape Model - Parameters</h3> <h3 id="org7ecae48"><span class="section-number-3">3.1</span> Simscape Model - Parameters</h3>
<div class="outline-text-3" id="text-3-1"> <div class="outline-text-3" id="text-3-1">
<p> <p>
<a id="org1f1154c"></a> <a id="orgfcb588b"></a>
</p> </p>
<div class="org-src-container"> <div class="org-src-container">
<pre class="src src-matlab">open(<span class="org-string">'drone_platform.slx'</span>); <pre class="src src-matlab">open(<span class="org-string">'drone_platform.slx'</span>);
@ -813,7 +824,7 @@ The analysis of the SVD control applied to the Stewart platform is performed in
</div> </div>
<p> <p>
Definition of spring parameters Definition of spring parameters:
</p> </p>
<div class="org-src-container"> <div class="org-src-container">
<pre class="src src-matlab">kx = 0.5<span class="org-type">*</span>1e3<span class="org-type">/</span>3; <span class="org-comment">% [N/m]</span> <pre class="src src-matlab">kx = 0.5<span class="org-type">*</span>1e3<span class="org-type">/</span>3; <span class="org-comment">% [N/m]</span>
@ -835,7 +846,7 @@ Gravity:
</div> </div>
<p> <p>
We load the Jacobian (previously computed from the geometry). We load the Jacobian (previously computed from the geometry):
</p> </p>
<div class="org-src-container"> <div class="org-src-container">
<pre class="src src-matlab">load(<span class="org-string">'./jacobian.mat'</span>, <span class="org-string">'Aa'</span>, <span class="org-string">'Ab'</span>, <span class="org-string">'As'</span>, <span class="org-string">'l'</span>, <span class="org-string">'J'</span>); <pre class="src src-matlab">load(<span class="org-string">'./jacobian.mat'</span>, <span class="org-string">'Aa'</span>, <span class="org-string">'Ab'</span>, <span class="org-string">'As'</span>, <span class="org-string">'l'</span>, <span class="org-string">'J'</span>);
@ -854,25 +865,45 @@ Kc = tf(zeros(6));
</div> </div>
</div> </div>
<div id="outline-container-org8c80aff" class="outline-3"> <div id="outline-container-orge09a2ff" class="outline-3">
<h3 id="org8c80aff"><span class="section-number-3">3.2</span> Identification of the plant</h3> <h3 id="orge09a2ff"><span class="section-number-3">3.2</span> Identification of the plant</h3>
<div class="outline-text-3" id="text-3-2"> <div class="outline-text-3" id="text-3-2">
<p> <p>
<a id="org76fc591"></a> <a id="org7e17fba"></a>
</p> </p>
<p> <p>
The dynamics is identified from forces applied by each legs to the measured acceleration of the top platform. The plant shown in Figure <a href="#org8c9425f">6</a> is identified from the Simscape model.
</p> </p>
<p>
The inputs are:
</p>
<ul class="org-ul">
<li>\(D_w\) translation and rotation of the bottom platform (with respect to the center of mass of the top platform)</li>
<li>\(\tau\) the 6 forces applied by the voice coils</li>
</ul>
<p>
The outputs are the 6 accelerations measured by the inertial unit.
</p>
<div id="org8c9425f" class="figure">
<p><img src="figs/stewart_platform_plant.png" alt="stewart_platform_plant.png" />
</p>
<p><span class="figure-number">Figure 6: </span>Considered plant \(\bm{G} = \begin{bmatrix}G_d\\G\end{bmatrix}\). \(D_w\) is the translation/rotation of the support, \(\tau\) the actuator forces, \(a\) the acceleration/angular acceleration of the top platform</p>
</div>
<div class="org-src-container"> <div class="org-src-container">
<pre class="src src-matlab"><span class="org-matlab-cellbreak"><span class="org-comment">%% Name of the Simulink File</span></span> <pre class="src src-matlab"><span class="org-matlab-cellbreak"><span class="org-comment">%% Name of the Simulink File</span></span>
mdl = <span class="org-string">'drone_platform'</span>; mdl = <span class="org-string">'drone_platform'</span>;
<span class="org-matlab-cellbreak"><span class="org-comment">%% Input/Output definition</span></span> <span class="org-matlab-cellbreak"><span class="org-comment">%% Input/Output definition</span></span>
clear io; io_i = 1; clear io; io_i = 1;
io(io_i) = linio([mdl, <span class="org-string">'/Dw'</span>], 1, <span class="org-string">'openinput'</span>); io_i = io_i <span class="org-type">+</span> 1; io(io_i) = linio([mdl, <span class="org-string">'/Dw'</span>], 1, <span class="org-string">'openinput'</span>); io_i = io_i <span class="org-type">+</span> 1; <span class="org-comment">% Ground Motion</span>
io(io_i) = linio([mdl, <span class="org-string">'/V-T'</span>], 1, <span class="org-string">'openinput'</span>); io_i = io_i <span class="org-type">+</span> 1; io(io_i) = linio([mdl, <span class="org-string">'/V-T'</span>], 1, <span class="org-string">'openinput'</span>); io_i = io_i <span class="org-type">+</span> 1; <span class="org-comment">% Actuator Forces</span>
io(io_i) = linio([mdl, <span class="org-string">'/Inertial Sensor'</span>], 1, <span class="org-string">'openoutput'</span>); io_i = io_i <span class="org-type">+</span> 1; io(io_i) = linio([mdl, <span class="org-string">'/Inertial Sensor'</span>], 1, <span class="org-string">'openoutput'</span>); io_i = io_i <span class="org-type">+</span> 1; <span class="org-comment">% Top platform acceleration</span>
G = linearize(mdl, io); G = linearize(mdl, io);
G.InputName = {<span class="org-string">'Dwx'</span>, <span class="org-string">'Dwy'</span>, <span class="org-string">'Dwz'</span>, <span class="org-string">'Rwx'</span>, <span class="org-string">'Rwy'</span>, <span class="org-string">'Rwz'</span>, ... G.InputName = {<span class="org-string">'Dwx'</span>, <span class="org-string">'Dwy'</span>, <span class="org-string">'Dwz'</span>, <span class="org-string">'Rwx'</span>, <span class="org-string">'Rwy'</span>, <span class="org-string">'Rwz'</span>, ...
@ -895,19 +926,47 @@ State-space model with 6 outputs, 12 inputs, and 24 states.
<p> <p>
The &ldquo;centralized&rdquo; plant \(\bm{G}_x\) is now computed (Figure <a href="#org5fb072e">6</a>). The elements of the transfer matrix \(\bm{G}\) corresponding to the transfer function from actuator forces \(\tau\) to the measured acceleration \(a\) are shown in Figure <a href="#org45fc08a">7</a>.
</p>
<p>
One can easily see that the system is strongly coupled.
</p> </p>
<div id="org5fb072e" class="figure"> <div id="org45fc08a" class="figure">
<p><img src="figs/centralized_control.png" alt="centralized_control.png" /> <p><img src="figs/stewart_platform_coupled_plant.png" alt="stewart_platform_coupled_plant.png" />
</p> </p>
<p><span class="figure-number">Figure 6: </span>Centralized control architecture</p> <p><span class="figure-number">Figure 7: </span>Magnitude of all 36 elements of the transfer function matrix \(\bm{G}\)</p>
</div>
</div>
</div>
<div id="outline-container-org94abd99" class="outline-3">
<h3 id="org94abd99"><span class="section-number-3">3.3</span> Physical Decoupling using the Jacobian</h3>
<div class="outline-text-3" id="text-3-3">
<p>
<a id="org6c132b8"></a>
Consider the control architecture shown in Figure <a href="#orge05441f">8</a>.
The Jacobian matrix is used to transform forces/torques applied on the top platform to the equivalent forces applied by each actuator.
</p>
<div id="orge05441f" class="figure">
<p><img src="figs/plant_decouple_jacobian.png" alt="plant_decouple_jacobian.png" />
</p>
<p><span class="figure-number">Figure 8: </span>Decoupled plant \(\bm{G}_x\) using the Jacobian matrix \(J\)</p>
</div> </div>
<p> <p>
Thanks to the Jacobian, we compute the transfer functions in the inertial frame (transfer function from forces and torques applied to the top platform to the absolute acceleration of the top platform). We define a new plant:
\[ G_x(s) = G(s) J^{-T} \]
</p> </p>
<p>
\(G_x(s)\) correspond to the transfer function from forces and torques applied to the top platform to the absolute acceleration of the top platform.
</p>
<div class="org-src-container"> <div class="org-src-container">
<pre class="src src-matlab">Gx = G<span class="org-type">*</span>blkdiag(eye(6), inv(J<span class="org-type">'</span>)); <pre class="src src-matlab">Gx = G<span class="org-type">*</span>blkdiag(eye(6), inv(J<span class="org-type">'</span>));
Gx.InputName = {<span class="org-string">'Dwx'</span>, <span class="org-string">'Dwy'</span>, <span class="org-string">'Dwz'</span>, <span class="org-string">'Rwx'</span>, <span class="org-string">'Rwy'</span>, <span class="org-string">'Rwz'</span>, ... Gx.InputName = {<span class="org-string">'Dwx'</span>, <span class="org-string">'Dwy'</span>, <span class="org-string">'Dwz'</span>, <span class="org-string">'Rwx'</span>, <span class="org-string">'Rwy'</span>, <span class="org-string">'Rwz'</span>, ...
@ -917,38 +976,15 @@ Gx.InputName = {<span class="org-string">'Dwx'</span>, <span class="org-string"
</div> </div>
</div> </div>
<div id="outline-container-orgffd8770" class="outline-3"> <div id="outline-container-orge18ab64" class="outline-3">
<h3 id="orgffd8770"><span class="section-number-3">3.3</span> Obtained Dynamics</h3> <h3 id="orge18ab64"><span class="section-number-3">3.4</span> Real Approximation of \(G\) at the decoupling frequency</h3>
<div class="outline-text-3" id="text-3-3">
<p>
<a id="org4d48d60"></a>
</p>
<div id="orgdb3fa27" class="figure">
<p><img src="figs/stewart_platform_translations.png" alt="stewart_platform_translations.png" />
</p>
<p><span class="figure-number">Figure 7: </span>Stewart Platform Plant from forces applied by the legs to the acceleration of the platform</p>
</div>
<div id="org1b6e945" class="figure">
<p><img src="figs/stewart_platform_rotations.png" alt="stewart_platform_rotations.png" />
</p>
<p><span class="figure-number">Figure 8: </span>Stewart Platform Plant from torques applied by the legs to the angular acceleration of the platform</p>
</div>
</div>
</div>
<div id="outline-container-org639dffa" class="outline-3">
<h3 id="org639dffa"><span class="section-number-3">3.4</span> Real Approximation of \(G\) at the decoupling frequency</h3>
<div class="outline-text-3" id="text-3-4"> <div class="outline-text-3" id="text-3-4">
<p> <p>
<a id="orgf063500"></a> <a id="orga31d045"></a>
</p> </p>
<p> <p>
Let&rsquo;s compute a real approximation of the complex matrix \(H_1\) which corresponds to the the transfer function \(G_c(j\omega_c)\) from forces applied by the actuators to the measured acceleration of the top platform evaluated at the frequency \(\omega_c\). Let&rsquo;s compute a real approximation of the complex matrix \(H_1\) which corresponds to the the transfer function \(G(j\omega_c)\) from forces applied by the actuators to the measured acceleration of the top platform evaluated at the frequency \(\omega_c\).
</p> </p>
<div class="org-src-container"> <div class="org-src-container">
<pre class="src src-matlab">wc = 2<span class="org-type">*</span><span class="org-constant">pi</span><span class="org-type">*</span>30; <span class="org-comment">% Decoupling frequency [rad/s]</span> <pre class="src src-matlab">wc = 2<span class="org-type">*</span><span class="org-constant">pi</span><span class="org-type">*</span>30; <span class="org-comment">% Decoupling frequency [rad/s]</span>
@ -1124,11 +1160,11 @@ This can be verified below where only the real value of \(G(\omega_c)\) is shown
</div> </div>
</div> </div>
<div id="outline-container-org0cb963a" class="outline-3"> <div id="outline-container-org83f6d87" class="outline-3">
<h3 id="org0cb963a"><span class="section-number-3">3.5</span> Verification of the decoupling using the &ldquo;Gershgorin Radii&rdquo;</h3> <h3 id="org83f6d87"><span class="section-number-3">3.5</span> SVD Decoupling</h3>
<div class="outline-text-3" id="text-3-5"> <div class="outline-text-3" id="text-3-5">
<p> <p>
<a id="org6d984d9"></a> <a id="org4dc6a4f"></a>
</p> </p>
<p> <p>
@ -1142,8 +1178,32 @@ First, the Singular Value Decomposition of \(H_1\) is performed:
</div> </div>
<p> <p>
Then, the &ldquo;Gershgorin Radii&rdquo; is computed for the plant \(G_c(s)\) and the &ldquo;SVD Decoupled Plant&rdquo; \(G_d(s)\): The obtained matrices \(U\) and \(V\) are used to decouple the system as shown in Figure <a href="#org29682d3">9</a>.
\[ G_d(s) = U^T G_c(s) V \] </p>
<div id="org29682d3" class="figure">
<p><img src="figs/plant_decouple_svd.png" alt="plant_decouple_svd.png" />
</p>
<p><span class="figure-number">Figure 9: </span>Decoupled plant \(\bm{G}_{SVD}\) using the Singular Value Decomposition</p>
</div>
<p>
The decoupled plant is then:
\[ G_{SVD}(s) = U^T G(s) V \]
</p>
</div>
</div>
<div id="outline-container-org6de1985" class="outline-3">
<h3 id="org6de1985"><span class="section-number-3">3.6</span> Verification of the decoupling using the &ldquo;Gershgorin Radii&rdquo;</h3>
<div class="outline-text-3" id="text-3-6">
<p>
<a id="org3f0c4bc"></a>
</p>
<p>
The &ldquo;Gershgorin Radii&rdquo; is computed for the coupled plant \(G(s)\), for the &ldquo;Jacobian plant&rdquo; \(G_x(s)\) and the &ldquo;SVD Decoupled Plant&rdquo; \(G_{SVD}(s)\):
</p> </p>
<p> <p>
@ -1154,94 +1214,55 @@ This is computed over the following frequencies.
</pre> </pre>
</div> </div>
<p>
Gershgorin Radii for the coupled plant:
</p>
<div class="org-src-container">
<pre class="src src-matlab">Gr_coupled = zeros(length(freqs), size(Gc,2));
H = abs(squeeze(freqresp(Gc, freqs, <span class="org-string">'Hz'</span>))); <div id="orgb5da81f" class="figure">
<span class="org-keyword">for</span> <span class="org-variable-name">out_i</span> = <span class="org-constant">1:size(Gc,2)</span>
Gr_coupled(<span class="org-type">:</span>, out_i) = squeeze((sum(H(out_i,<span class="org-type">:</span>,<span class="org-type">:</span>)) <span class="org-type">-</span> H(out_i,out_i,<span class="org-type">:</span>))<span class="org-type">./</span>H(out_i, out_i, <span class="org-type">:</span>));
<span class="org-keyword">end</span>
</pre>
</div>
<p>
Gershgorin Radii for the decoupled plant using SVD:
</p>
<div class="org-src-container">
<pre class="src src-matlab">Gd = U<span class="org-type">'*</span>Gc<span class="org-type">*</span>V;
Gr_decoupled = zeros(length(freqs), size(Gd,2));
H = abs(squeeze(freqresp(Gd, freqs, <span class="org-string">'Hz'</span>)));
<span class="org-keyword">for</span> <span class="org-variable-name">out_i</span> = <span class="org-constant">1:size(Gd,2)</span>
Gr_decoupled(<span class="org-type">:</span>, out_i) = squeeze((sum(H(out_i,<span class="org-type">:</span>,<span class="org-type">:</span>)) <span class="org-type">-</span> H(out_i,out_i,<span class="org-type">:</span>))<span class="org-type">./</span>H(out_i, out_i, <span class="org-type">:</span>));
<span class="org-keyword">end</span>
</pre>
</div>
<p>
Gershgorin Radii for the decoupled plant using the Jacobian:
</p>
<div class="org-src-container">
<pre class="src src-matlab">Gj = Gc<span class="org-type">*</span>inv(J<span class="org-type">'</span>);
Gr_jacobian = zeros(length(freqs), size(Gj,2));
H = abs(squeeze(freqresp(Gj, freqs, <span class="org-string">'Hz'</span>)));
<span class="org-keyword">for</span> <span class="org-variable-name">out_i</span> = <span class="org-constant">1:size(Gj,2)</span>
Gr_jacobian(<span class="org-type">:</span>, out_i) = squeeze((sum(H(out_i,<span class="org-type">:</span>,<span class="org-type">:</span>)) <span class="org-type">-</span> H(out_i,out_i,<span class="org-type">:</span>))<span class="org-type">./</span>H(out_i, out_i, <span class="org-type">:</span>));
<span class="org-keyword">end</span>
</pre>
</div>
<div id="org3cf0ede" class="figure">
<p><img src="figs/simscape_model_gershgorin_radii.png" alt="simscape_model_gershgorin_radii.png" /> <p><img src="figs/simscape_model_gershgorin_radii.png" alt="simscape_model_gershgorin_radii.png" />
</p> </p>
<p><span class="figure-number">Figure 9: </span>Gershgorin Radii of the Coupled and Decoupled plants</p> <p><span class="figure-number">Figure 10: </span>Gershgorin Radii of the Coupled and Decoupled plants</p>
</div> </div>
</div> </div>
</div> </div>
<div id="outline-container-org1e039d4" class="outline-3"> <div id="outline-container-org3f44896" class="outline-3">
<h3 id="org1e039d4"><span class="section-number-3">3.6</span> Decoupled Plant</h3> <h3 id="org3f44896"><span class="section-number-3">3.7</span> Obtained Decoupled Plants</h3>
<div class="outline-text-3" id="text-3-6">
<p>
<a id="org083c541"></a>
</p>
<p>
Let&rsquo;s see the bode plot of the decoupled plant \(G_d(s)\).
\[ G_d(s) = U^T G_c(s) V \]
</p>
<div id="orgcc74e6b" class="figure">
<p><img src="figs/simscape_model_decoupled_plant_svd.png" alt="simscape_model_decoupled_plant_svd.png" />
</p>
<p><span class="figure-number">Figure 10: </span>Decoupled Plant using SVD</p>
</div>
<div id="orgaf3df78" class="figure">
<p><img src="figs/simscape_model_decoupled_plant_jacobian.png" alt="simscape_model_decoupled_plant_jacobian.png" />
</p>
<p><span class="figure-number">Figure 11: </span>Decoupled Plant using the Jacobian</p>
</div>
</div>
</div>
<div id="outline-container-orga66d3f9" class="outline-3">
<h3 id="orga66d3f9"><span class="section-number-3">3.7</span> Diagonal Controller</h3>
<div class="outline-text-3" id="text-3-7"> <div class="outline-text-3" id="text-3-7">
<p> <p>
<a id="org7fb568e"></a> <a id="orgaedd69e"></a>
</p> </p>
<p> <p>
The controller \(K\) is a diagonal controller consisting a low pass filters with a crossover frequency \(\omega_c\) and a DC gain \(C_g\). The bode plot of the diagonal and off-diagonal elements of \(G_{SVD}\) are shown in Figure <a href="#org966fd33">11</a>.
</p>
<div id="org966fd33" class="figure">
<p><img src="figs/simscape_model_decoupled_plant_svd.png" alt="simscape_model_decoupled_plant_svd.png" />
</p>
<p><span class="figure-number">Figure 11: </span>Decoupled Plant using SVD</p>
</div>
<p>
Similarly, the bode plots of the diagonal elements and off-diagonal elements of the decoupled plant \(G_x(s)\) using the Jacobian are shown in Figure <a href="#org5c065e5">12</a>.
</p>
<div id="org5c065e5" class="figure">
<p><img src="figs/simscape_model_decoupled_plant_jacobian.png" alt="simscape_model_decoupled_plant_jacobian.png" />
</p>
<p><span class="figure-number">Figure 12: </span>Stewart Platform Plant from forces (resp. torques) applied by the legs to the acceleration (resp. angular acceleration) of the platform as well as all the coupling terms between the two (non-diagonal terms of the transfer function matrix)</p>
</div>
</div>
</div>
<div id="outline-container-org32f4718" class="outline-3">
<h3 id="org32f4718"><span class="section-number-3">3.8</span> Diagonal Controller</h3>
<div class="outline-text-3" id="text-3-8">
<p>
<a id="org594262e"></a>
</p>
<p>
The controller \(K_c\) is a diagonal controller consisting a low pass filters with a crossover frequency \(\omega_c\) and a DC gain \(C_g\).
</p> </p>
<div class="org-src-container"> <div class="org-src-container">
@ -1253,7 +1274,7 @@ Kc = eye(6)<span class="org-type">*</span>C_g<span class="org-type">/</span>(s<s
</div> </div>
<p> <p>
The control diagram for the centralized control is shown in Figure <a href="#org5fb072e">6</a>. The control diagram for the centralized control is shown in Figure <a href="#orga82736e">13</a>.
</p> </p>
<p> <p>
@ -1262,10 +1283,10 @@ The Jacobian is used to convert forces in the cartesian frame to forces applied
</p> </p>
<div id="orge11b6b2" class="figure"> <div id="orga82736e" class="figure">
<p><img src="figs/centralized_control.png" alt="centralized_control.png" /> <p><img src="figs/centralized_control.png" alt="centralized_control.png" />
</p> </p>
<p><span class="figure-number">Figure 12: </span>Control Diagram for the Centralized control</p> <p><span class="figure-number">Figure 13: </span>Control Diagram for the Centralized control</p>
</div> </div>
<p> <p>
@ -1277,14 +1298,14 @@ The feedback system is computed as shown below.
</div> </div>
<p> <p>
The SVD control architecture is shown in Figure <a href="#orgef128af">13</a>. The SVD control architecture is shown in Figure <a href="#org8b3df12">14</a>.
The matrices \(U\) and \(V\) are used to decoupled the plant \(G\). The matrices \(U\) and \(V\) are used to decoupled the plant \(G\).
</p> </p>
<div id="orgef128af" class="figure"> <div id="org8b3df12" class="figure">
<p><img src="figs/svd_control.png" alt="svd_control.png" /> <p><img src="figs/svd_control.png" alt="svd_control.png" />
</p> </p>
<p><span class="figure-number">Figure 13: </span>Control Diagram for the SVD control</p> <p><span class="figure-number">Figure 14: </span>Control Diagram for the SVD control</p>
</div> </div>
<p> <p>
@ -1297,11 +1318,11 @@ The feedback system is computed as shown below.
</div> </div>
</div> </div>
<div id="outline-container-orgdeb9b20" class="outline-3"> <div id="outline-container-orgc4a81f5" class="outline-3">
<h3 id="orgdeb9b20"><span class="section-number-3">3.8</span> Closed-Loop system Performances</h3> <h3 id="orgc4a81f5"><span class="section-number-3">3.9</span> Closed-Loop system Performances</h3>
<div class="outline-text-3" id="text-3-8"> <div class="outline-text-3" id="text-3-9">
<p> <p>
<a id="org3072cea"></a> <a id="orga712b26"></a>
</p> </p>
<p> <p>
@ -1327,19 +1348,19 @@ ans =
<pre class="example"> <pre class="example">
ans = ans =
logical logical
0 1
</pre> </pre>
<p> <p>
The obtained transmissibility in Open-loop, for the centralized control as well as for the SVD control are shown in Figure <a href="#org9b356fe">14</a>. The obtained transmissibility in Open-loop, for the centralized control as well as for the SVD control are shown in Figure <a href="#org9378b87">15</a>.
</p> </p>
<div id="org9b356fe" class="figure"> <div id="org9378b87" class="figure">
<p><img src="figs/stewart_platform_simscape_cl_transmissibility.png" alt="stewart_platform_simscape_cl_transmissibility.png" /> <p><img src="figs/stewart_platform_simscape_cl_transmissibility.png" alt="stewart_platform_simscape_cl_transmissibility.png" />
</p> </p>
<p><span class="figure-number">Figure 14: </span>Obtained Transmissibility</p> <p><span class="figure-number">Figure 15: </span>Obtained Transmissibility</p>
</div> </div>
</div> </div>
</div> </div>
@ -1347,7 +1368,7 @@ The obtained transmissibility in Open-loop, for the centralized control as well
</div> </div>
<div id="postamble" class="status"> <div id="postamble" class="status">
<p class="author">Author: Dehaeze Thomas</p> <p class="author">Author: Dehaeze Thomas</p>
<p class="date">Created: 2020-11-06 ven. 15:06</p> <p class="date">Created: 2020-11-06 ven. 16:58</p>
</div> </div>
</body> </body>
</html> </html>

426
index.org
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@ -693,17 +693,23 @@ This Matlab function is accessible [[file:gravimeter/pzmap_testCL.m][here]].
In this analysis, we wish to applied SVD control to the Stewart Platform shown in Figure [[fig:SP_assembly]]. In this analysis, we wish to applied SVD control to the Stewart Platform shown in Figure [[fig:SP_assembly]].
Some notes about the system:
- 6 voice coils actuators are used to control the motion of the top platform.
- the motion of the top platform is measured with a 6-axis inertial unit (3 acceleration + 3 angular accelerations)
- the control objective is to isolate the top platform from vibrations coming from the bottom platform
#+name: fig:SP_assembly #+name: fig:SP_assembly
#+caption: Stewart Platform CAD View #+caption: Stewart Platform CAD View
[[file:figs/SP_assembly.png]] [[file:figs/SP_assembly.png]]
The analysis of the SVD control applied to the Stewart platform is performed in the following sections: The analysis of the SVD control applied to the Stewart platform is performed in the following sections:
- Section [[sec:stewart_simscape]]: The parameters of the Simscape model of the Stewart platform are defined - Section [[sec:stewart_simscape]]: The parameters of the Simscape model of the Stewart platform are defined
- Section [[sec:stewart_identification]]: The plant is identified from the Simscape model and the centralized plant is computed thanks to the Jacobian - Section [[sec:stewart_identification]]: The plant is identified from the Simscape model and the system coupling is shown
- Section [[sec:stewart_dynamics]]: The identified Dynamics is shown - Section [[sec:stewart_jacobian_decoupling]]: The plant is first decoupled using the Jacobian
- Section [[sec:stewart_real_approx]]: A real approximation of the plant is computed for further decoupling using the Singular Value Decomposition (SVD) - Section [[sec:stewart_real_approx]]: A real approximation of the plant is computed for further decoupling using the Singular Value Decomposition (SVD)
- Section [[sec:stewart_svd_decoupling]]: The decoupling is performed thanks to the SVD. The effectiveness of the decoupling is verified using the Gershorin Radii - Section [[sec:stewart_svd_decoupling]]: The decoupling is performed thanks to the SVD
- Section [[sec:stewart_decoupled_plant]]: The dynamics of the decoupled plant is shown - Section [[sec:comp_decoupling]]: The effectiveness of the decoupling with the Jacobian and SVD are compared using the Gershorin Radii
- Section [[sec:stewart_decoupled_plant]]: The dynamics of the decoupled plants are shown
- Section [[sec:stewart_diagonal_control]]: A diagonal controller is defined to control the decoupled plant - Section [[sec:stewart_diagonal_control]]: A diagonal controller is defined to control the decoupled plant
- Section [[sec:stewart_closed_loop_results]]: Finally, the closed loop system properties are studied - Section [[sec:stewart_closed_loop_results]]: Finally, the closed loop system properties are studied
@ -765,7 +771,7 @@ First, the position of the "joints" (points of force application) are estimated
open('drone_platform.slx'); open('drone_platform.slx');
#+end_src #+end_src
Definition of spring parameters Definition of spring parameters:
#+begin_src matlab #+begin_src matlab
kx = 0.5*1e3/3; % [N/m] kx = 0.5*1e3/3; % [N/m]
ky = 0.5*1e3/3; ky = 0.5*1e3/3;
@ -781,7 +787,7 @@ Gravity:
g = 0; g = 0;
#+end_src #+end_src
We load the Jacobian (previously computed from the geometry). We load the Jacobian (previously computed from the geometry):
#+begin_src matlab #+begin_src matlab
load('./jacobian.mat', 'Aa', 'Ab', 'As', 'l', 'J'); load('./jacobian.mat', 'Aa', 'Ab', 'As', 'l', 'J');
#+end_src #+end_src
@ -796,16 +802,44 @@ We initialize other parameters:
** Identification of the plant ** Identification of the plant
<<sec:stewart_identification>> <<sec:stewart_identification>>
The dynamics is identified from forces applied by each legs to the measured acceleration of the top platform. The plant shown in Figure [[fig:stewart_platform_plant]] is identified from the Simscape model.
The inputs are:
- $D_w$ translation and rotation of the bottom platform (with respect to the center of mass of the top platform)
- $\tau$ the 6 forces applied by the voice coils
The outputs are the 6 accelerations measured by the inertial unit.
#+begin_src latex :file stewart_platform_plant.pdf :tangle no :exports results
\begin{tikzpicture}
\node[block={2cm}{1.5cm}] (G) {$\begin{bmatrix}G_d\\G\end{bmatrix}$};
\node[above] at (G.north) {$\bm{G}$};
% Inputs of the controllers
\coordinate[] (inputd) at ($(G.south west)!0.75!(G.north west)$);
\coordinate[] (inputu) at ($(G.south west)!0.25!(G.north west)$);
% Connections and labels
\draw[<-] (inputd) -- ++(-0.8, 0) node[above right]{$D_w$};
\draw[<-] (inputu) -- ++(-0.8, 0) node[above right]{$\tau$};
\draw[->] (G.east) -- ++(0.8, 0) node[above left]{$a$};
\end{tikzpicture}
#+end_src
#+name: fig:stewart_platform_plant
#+caption: Considered plant $\bm{G} = \begin{bmatrix}G_d\\G\end{bmatrix}$. $D_w$ is the translation/rotation of the support, $\tau$ the actuator forces, $a$ the acceleration/angular acceleration of the top platform
#+RESULTS:
[[file:figs/stewart_platform_plant.png]]
#+begin_src matlab #+begin_src matlab
%% Name of the Simulink File %% Name of the Simulink File
mdl = 'drone_platform'; mdl = 'drone_platform';
%% Input/Output definition %% Input/Output definition
clear io; io_i = 1; clear io; io_i = 1;
io(io_i) = linio([mdl, '/Dw'], 1, 'openinput'); io_i = io_i + 1; io(io_i) = linio([mdl, '/Dw'], 1, 'openinput'); io_i = io_i + 1; % Ground Motion
io(io_i) = linio([mdl, '/V-T'], 1, 'openinput'); io_i = io_i + 1; io(io_i) = linio([mdl, '/V-T'], 1, 'openinput'); io_i = io_i + 1; % Actuator Forces
io(io_i) = linio([mdl, '/Inertial Sensor'], 1, 'openoutput'); io_i = io_i + 1; io(io_i) = linio([mdl, '/Inertial Sensor'], 1, 'openoutput'); io_i = io_i + 1; % Top platform acceleration
G = linearize(mdl, io); G = linearize(mdl, io);
G.InputName = {'Dwx', 'Dwy', 'Dwz', 'Rwx', 'Rwy', 'Rwz', ... G.InputName = {'Dwx', 'Dwy', 'Dwz', 'Rwx', 'Rwy', 'Rwz', ...
@ -821,108 +855,93 @@ There are 24 states (6dof for the bottom platform + 6dof for the top platform).
#+RESULTS: #+RESULTS:
: State-space model with 6 outputs, 12 inputs, and 24 states. : State-space model with 6 outputs, 12 inputs, and 24 states.
The "centralized" plant $\bm{G}_x$ is now computed (Figure [[fig:centralized_control]]). The elements of the transfer matrix $\bm{G}$ corresponding to the transfer function from actuator forces $\tau$ to the measured acceleration $a$ are shown in Figure [[fig:stewart_platform_coupled_plant]].
#+name: fig:centralized_control One can easily see that the system is strongly coupled.
#+caption: Centralized control architecture
[[file:figs/centralized_control.png]] #+begin_src matlab :exports none
freqs = logspace(-1, 2, 1000);
figure;
% Magnitude
hold on;
for i_in = 1:6
for i_out = [1:i_in-1, i_in+1:6]
plot(freqs, abs(squeeze(freqresp(G(i_out, 6+i_in), freqs, 'Hz'))), 'color', [0,0,0,0.2], ...
'HandleVisibility', 'off');
end
end
plot(freqs, abs(squeeze(freqresp(G(i_out, 6+i_in), freqs, 'Hz'))), 'color', [0,0,0,0.2], ...
'DisplayName', '$G(i,j)\ i \neq j$');
set(gca,'ColorOrderIndex',1)
for i_in_out = 1:6
plot(freqs, abs(squeeze(freqresp(G(i_in_out, 6+i_in_out), freqs, 'Hz'))), 'DisplayName', sprintf('$G(%d,%d)$', i_in_out, i_in_out));
end
hold off;
set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log');
xlabel('Frequency [Hz]'); ylabel('Magnitude');
ylim([1e-2, 1e5]);
legend('location', 'northwest');
#+end_src
#+begin_src matlab :tangle no :exports results :results file replace
exportFig('figs/stewart_platform_coupled_plant.pdf', 'eps', true, 'width', 'wide', 'height', 'normal');
#+end_src
#+name: fig:stewart_platform_coupled_plant
#+caption: Magnitude of all 36 elements of the transfer function matrix $\bm{G}$
#+RESULTS:
[[file:figs/stewart_platform_coupled_plant.png]]
** Physical Decoupling using the Jacobian
<<sec:stewart_jacobian_decoupling>>
Consider the control architecture shown in Figure [[fig:plant_decouple_jacobian]].
The Jacobian matrix is used to transform forces/torques applied on the top platform to the equivalent forces applied by each actuator.
#+begin_src latex :file plant_decouple_jacobian.pdf :tangle no :exports results
\begin{tikzpicture}
\node[block={2cm}{1.5cm}] (G) {$\begin{bmatrix}G_d\\G\end{bmatrix}$};
% Inputs of the controllers
\coordinate[] (inputd) at ($(G.south west)!0.75!(G.north west)$);
\coordinate[] (inputu) at ($(G.south west)!0.25!(G.north west)$);
\node[block, left=0.6 of inputu] (J) {$J^{-T}$};
% Connections and labels
\draw[<-] (inputd) -- ++(-0.8, 0) node[above right]{$D_w$};
\draw[->] (G.east) -- ++( 0.8, 0) node[above left]{$a$};
\draw[->] (J.east) -- (inputu) node[above left]{$\tau$};
\draw[<-] (J.west) -- ++(-0.8, 0) node[above right]{$\mathcal{F}$};
\begin{scope}[on background layer]
\node[fit={(J.south west) (G.north east)}, fill=black!10!white, draw, dashed, inner sep=8pt] (Gx) {};
\node[below right] at (Gx.north west) {$\bm{G}_x$};
\end{scope}
\end{tikzpicture}
#+end_src
#+name: fig:plant_decouple_jacobian
#+caption: Decoupled plant $\bm{G}_x$ using the Jacobian matrix $J$
#+RESULTS:
[[file:figs/plant_decouple_jacobian.png]]
We define a new plant:
\[ G_x(s) = G(s) J^{-T} \]
$G_x(s)$ correspond to the transfer function from forces and torques applied to the top platform to the absolute acceleration of the top platform.
Thanks to the Jacobian, we compute the transfer functions in the inertial frame (transfer function from forces and torques applied to the top platform to the absolute acceleration of the top platform).
#+begin_src matlab #+begin_src matlab
Gx = G*blkdiag(eye(6), inv(J')); Gx = G*blkdiag(eye(6), inv(J'));
Gx.InputName = {'Dwx', 'Dwy', 'Dwz', 'Rwx', 'Rwy', 'Rwz', ... Gx.InputName = {'Dwx', 'Dwy', 'Dwz', 'Rwx', 'Rwy', 'Rwz', ...
'Fx', 'Fy', 'Fz', 'Mx', 'My', 'Mz'}; 'Fx', 'Fy', 'Fz', 'Mx', 'My', 'Mz'};
#+end_src #+end_src
** Obtained Dynamics
<<sec:stewart_dynamics>>
#+begin_src matlab :exports none
freqs = logspace(-1, 2, 1000);
figure;
tiledlayout(3, 1, 'TileSpacing', 'None', 'Padding', 'None');
% Magnitude
ax1 = nexttile([2, 1]);
hold on;
plot(freqs, abs(squeeze(freqresp(Gx('Ax', 'Fx'), freqs, 'Hz'))), 'DisplayName', '$A_x/F_x$');
plot(freqs, abs(squeeze(freqresp(Gx('Ay', 'Fy'), freqs, 'Hz'))), 'DisplayName', '$A_y/F_y$');
plot(freqs, abs(squeeze(freqresp(Gx('Az', 'Fz'), freqs, 'Hz'))), 'DisplayName', '$A_z/F_z$');
hold off;
set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log');
ylabel('Magnitude [m/N]'); set(gca, 'XTickLabel',[]);
legend('location', 'southeast');
% Phase
ax2 = nexttile;
hold on;
plot(freqs, 180/pi*angle(squeeze(freqresp(Gx('Ax', 'Fx'), freqs, 'Hz'))));
plot(freqs, 180/pi*angle(squeeze(freqresp(Gx('Ay', 'Fy'), freqs, 'Hz'))));
plot(freqs, 180/pi*angle(squeeze(freqresp(Gx('Az', 'Fz'), freqs, 'Hz'))));
hold off;
set(gca, 'XScale', 'log'); set(gca, 'YScale', 'lin');
ylabel('Phase [deg]'); xlabel('Frequency [Hz]');
ylim([-180, 180]);
yticks([-360:90:360]);
linkaxes([ax1,ax2],'x');
#+end_src
#+begin_src matlab :tangle no :exports results :results file replace
exportFig('figs/stewart_platform_translations.pdf', 'eps', true, 'width', 'wide', 'height', 'tall');
#+end_src
#+name: fig:stewart_platform_translations
#+caption: Stewart Platform Plant from forces applied by the legs to the acceleration of the platform
#+RESULTS:
[[file:figs/stewart_platform_translations.png]]
#+begin_src matlab :exports none
freqs = logspace(-1, 2, 1000);
figure;
tiledlayout(3, 1, 'TileSpacing', 'None', 'Padding', 'None');
% Magnitude
ax1 = nexttile([2, 1]);
hold on;
plot(freqs, abs(squeeze(freqresp(Gx('Arx', 'Mx'), freqs, 'Hz'))), 'DisplayName', '$A_{R_x}/M_x$');
plot(freqs, abs(squeeze(freqresp(Gx('Ary', 'My'), freqs, 'Hz'))), 'DisplayName', '$A_{R_y}/M_y$');
plot(freqs, abs(squeeze(freqresp(Gx('Arz', 'Mz'), freqs, 'Hz'))), 'DisplayName', '$A_{R_z}/M_z$');
hold off;
set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log');
ylabel('Magnitude [rad/(Nm)]'); set(gca, 'XTickLabel',[]);
legend('location', 'southeast');
% Phase
ax2 = nexttile;
hold on;
plot(freqs, 180/pi*angle(squeeze(freqresp(Gx('Arx', 'Mx'), freqs, 'Hz'))));
plot(freqs, 180/pi*angle(squeeze(freqresp(Gx('Ary', 'My'), freqs, 'Hz'))));
plot(freqs, 180/pi*angle(squeeze(freqresp(Gx('Arz', 'Mz'), freqs, 'Hz'))));
hold off;
set(gca, 'XScale', 'log'); set(gca, 'YScale', 'lin');
ylabel('Phase [deg]'); xlabel('Frequency [Hz]');
ylim([-180, 180]);
yticks([-360:90:360]);
linkaxes([ax1,ax2],'x');
#+end_src
#+begin_src matlab :tangle no :exports results :results file replace
exportFig('figs/stewart_platform_rotations.pdf', 'eps', true, 'width', 'wide', 'height', 'tall');
#+end_src
#+name: fig:stewart_platform_rotations
#+caption: Stewart Platform Plant from torques applied by the legs to the angular acceleration of the platform
#+RESULTS:
[[file:figs/stewart_platform_rotations.png]]
** Real Approximation of $G$ at the decoupling frequency ** Real Approximation of $G$ at the decoupling frequency
<<sec:stewart_real_approx>> <<sec:stewart_real_approx>>
Let's compute a real approximation of the complex matrix $H_1$ which corresponds to the the transfer function $G_c(j\omega_c)$ from forces applied by the actuators to the measured acceleration of the top platform evaluated at the frequency $\omega_c$. Let's compute a real approximation of the complex matrix $H_1$ which corresponds to the the transfer function $G(j\omega_c)$ from forces applied by the actuators to the measured acceleration of the top platform evaluated at the frequency $\omega_c$.
#+begin_src matlab #+begin_src matlab
wc = 2*pi*30; % Decoupling frequency [rad/s] wc = 2*pi*30; % Decoupling frequency [rad/s]
@ -968,7 +987,7 @@ This can be verified below where only the real value of $G(\omega_c)$ is shown
| -162.0 | -237.0 | -237.0 | -162.0 | 398.9 | 398.9 | | -162.0 | -237.0 | -237.0 | -162.0 | 398.9 | 398.9 |
| 220.6 | -220.6 | 220.6 | -220.6 | 220.6 | -220.6 | | 220.6 | -220.6 | 220.6 | -220.6 | 220.6 | -220.6 |
** Verification of the decoupling using the "Gershgorin Radii" ** SVD Decoupling
<<sec:stewart_svd_decoupling>> <<sec:stewart_svd_decoupling>>
First, the Singular Value Decomposition of $H_1$ is performed: First, the Singular Value Decomposition of $H_1$ is performed:
@ -978,26 +997,61 @@ First, the Singular Value Decomposition of $H_1$ is performed:
[U,S,V] = svd(H1); [U,S,V] = svd(H1);
#+end_src #+end_src
Then, the "Gershgorin Radii" is computed for the plant $G_c(s)$ and the "SVD Decoupled Plant" $G_d(s)$: The obtained matrices $U$ and $V$ are used to decouple the system as shown in Figure [[fig:plant_decouple_svd]].
\[ G_d(s) = U^T G_c(s) V \]
#+begin_src latex :file plant_decouple_svd.pdf :tangle no :exports results
\begin{tikzpicture}
\node[block={2cm}{1.5cm}] (G) {$\begin{bmatrix}G_d\\G\end{bmatrix}$};
% Inputs of the controllers
\coordinate[] (inputd) at ($(G.south west)!0.75!(G.north west)$);
\coordinate[] (inputu) at ($(G.south west)!0.25!(G.north west)$);
\node[block, left=0.6 of inputu] (V) {$V$};
\node[block, right=0.6 of G.east] (U) {$U^T$};
% Connections and labels
\draw[<-] (inputd) -- ++(-0.8, 0) node[above right]{$D_w$};
\draw[->] (G.east) -- (U.west) node[above left]{$a$};
\draw[->] (U.east) -- ++( 0.8, 0) node[above left]{$y$};
\draw[->] (V.east) -- (inputu) node[above left]{$\tau$};
\draw[<-] (V.west) -- ++(-0.8, 0) node[above right]{$u$};
\begin{scope}[on background layer]
\node[fit={(V.south west) (G.north-|U.east)}, fill=black!10!white, draw, dashed, inner sep=8pt] (Gsvd) {};
\node[below right] at (Gsvd.north west) {$\bm{G}_{SVD}$};
\end{scope}
\end{tikzpicture}
#+end_src
#+name: fig:plant_decouple_svd
#+caption: Decoupled plant $\bm{G}_{SVD}$ using the Singular Value Decomposition
#+RESULTS:
[[file:figs/plant_decouple_svd.png]]
The decoupled plant is then:
\[ G_{SVD}(s) = U^T G(s) V \]
** Verification of the decoupling using the "Gershgorin Radii"
<<sec:comp_decoupling>>
The "Gershgorin Radii" is computed for the coupled plant $G(s)$, for the "Jacobian plant" $G_x(s)$ and the "SVD Decoupled Plant" $G_{SVD}(s)$:
This is computed over the following frequencies. This is computed over the following frequencies.
#+begin_src matlab #+begin_src matlab
freqs = logspace(-2, 2, 1000); % [Hz] freqs = logspace(-2, 2, 1000); % [Hz]
#+end_src #+end_src
Gershgorin Radii for the coupled plant: #+begin_src matlab :exports none
#+begin_src matlab % Gershgorin Radii for the coupled plant:
Gr_coupled = zeros(length(freqs), size(Gc,2)); Gr_coupled = zeros(length(freqs), size(Gc,2));
H = abs(squeeze(freqresp(Gc, freqs, 'Hz'))); H = abs(squeeze(freqresp(Gc, freqs, 'Hz')));
for out_i = 1:size(Gc,2) for out_i = 1:size(Gc,2)
Gr_coupled(:, out_i) = squeeze((sum(H(out_i,:,:)) - H(out_i,out_i,:))./H(out_i, out_i, :)); Gr_coupled(:, out_i) = squeeze((sum(H(out_i,:,:)) - H(out_i,out_i,:))./H(out_i, out_i, :));
end end
#+end_src
Gershgorin Radii for the decoupled plant using SVD: % Gershgorin Radii for the decoupled plant using SVD:
#+begin_src matlab
Gd = U'*Gc*V; Gd = U'*Gc*V;
Gr_decoupled = zeros(length(freqs), size(Gd,2)); Gr_decoupled = zeros(length(freqs), size(Gd,2));
@ -1005,10 +1059,8 @@ Gershgorin Radii for the decoupled plant using SVD:
for out_i = 1:size(Gd,2) for out_i = 1:size(Gd,2)
Gr_decoupled(:, out_i) = squeeze((sum(H(out_i,:,:)) - H(out_i,out_i,:))./H(out_i, out_i, :)); Gr_decoupled(:, out_i) = squeeze((sum(H(out_i,:,:)) - H(out_i,out_i,:))./H(out_i, out_i, :));
end end
#+end_src
Gershgorin Radii for the decoupled plant using the Jacobian: % Gershgorin Radii for the decoupled plant using the Jacobian:
#+begin_src matlab
Gj = Gc*inv(J'); Gj = Gc*inv(J');
Gr_jacobian = zeros(length(freqs), size(Gj,2)); Gr_jacobian = zeros(length(freqs), size(Gj,2));
@ -1037,12 +1089,12 @@ Gershgorin Radii for the decoupled plant using the Jacobian:
set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log'); set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log');
hold off; hold off;
xlabel('Frequency (Hz)'); ylabel('Gershgorin Radii') xlabel('Frequency (Hz)'); ylabel('Gershgorin Radii')
legend('location', 'northeast'); legend('location', 'northwest');
ylim([1e-3, 1e3]); ylim([1e-3, 1e3]);
#+end_src #+end_src
#+begin_src matlab :tangle no :exports results :results file replace #+begin_src matlab :tangle no :exports results :results file replace
exportFig('figs/simscape_model_gershgorin_radii.pdf', 'eps', true, 'width', 'wide', 'height', 'tall'); exportFig('figs/simscape_model_gershgorin_radii.pdf', 'eps', true, 'width', 'wide', 'height', 'normal');
#+end_src #+end_src
#+name: fig:simscape_model_gershgorin_radii #+name: fig:simscape_model_gershgorin_radii
@ -1050,36 +1102,56 @@ Gershgorin Radii for the decoupled plant using the Jacobian:
#+RESULTS: #+RESULTS:
[[file:figs/simscape_model_gershgorin_radii.png]] [[file:figs/simscape_model_gershgorin_radii.png]]
** Decoupled Plant ** Obtained Decoupled Plants
<<sec:stewart_decoupled_plant>> <<sec:stewart_decoupled_plant>>
Let's see the bode plot of the decoupled plant $G_d(s)$. The bode plot of the diagonal and off-diagonal elements of $G_{SVD}$ are shown in Figure [[fig:simscape_model_decoupled_plant_svd]].
\[ G_d(s) = U^T G_c(s) V \]
#+begin_src matlab :exports results #+begin_src matlab :exports none
freqs = logspace(-1, 2, 1000); freqs = logspace(-1, 2, 1000);
figure; figure;
tiledlayout(3, 1, 'TileSpacing', 'None', 'Padding', 'None');
% Magnitude
ax1 = nexttile([2, 1]);
hold on; hold on;
for i_in = 1:6
for i_out = [1:i_in-1, i_in+1:6]
plot(freqs, abs(squeeze(freqresp(Gd(i_out, i_in), freqs, 'Hz'))), 'color', [0,0,0,0.2], ...
'HandleVisibility', 'off');
end
end
plot(freqs, abs(squeeze(freqresp(Gd(1, 2), freqs, 'Hz'))), 'color', [0,0,0,0.5], ...
'DisplayName', '$G_{SVD}(i,j),\ i \neq j$');
set(gca,'ColorOrderIndex',1)
for ch_i = 1:6 for ch_i = 1:6
plot(freqs, abs(squeeze(freqresp(Gd(ch_i, ch_i), freqs, 'Hz'))), ... plot(freqs, abs(squeeze(freqresp(Gd(ch_i, ch_i), freqs, 'Hz'))), ...
'DisplayName', sprintf('$G(%i, %i)$', ch_i, ch_i)); 'DisplayName', sprintf('$G_{SVD}(%i,%i)$', ch_i, ch_i));
end
for in_i = 1:5
for out_i = in_i+1:6
plot(freqs, abs(squeeze(freqresp(Gd(out_i, in_i), freqs, 'Hz'))), 'color', [0, 0, 0, 0.2], ...
'HandleVisibility', 'off');
end
end end
hold off; hold off;
set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log'); set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log');
ylabel('Magnitude'); xlabel('Frequency [Hz]'); ylabel('Magnitude'); set(gca, 'XTickLabel',[]);
legend('location', 'northwest'); legend('location', 'northwest');
ylim([1e-3, 1e4]); ylim([1e-1, 1e5])
% Phase
ax2 = nexttile;
hold on;
for ch_i = 1:6
plot(freqs, 180/pi*angle(squeeze(freqresp(Gd(ch_i, ch_i), freqs, 'Hz'))));
end
hold off;
set(gca, 'XScale', 'log'); set(gca, 'YScale', 'lin');
ylabel('Phase [deg]'); xlabel('Frequency [Hz]');
ylim([-180, 180]);
yticks([-180:90:360]);
linkaxes([ax1,ax2],'x');
#+end_src #+end_src
#+begin_src matlab :tangle no :exports results :results file replace #+begin_src matlab :tangle no :exports results :results file replace
exportFig('figs/simscape_model_decoupled_plant_svd.pdf', 'eps', true, 'width', 'wide', 'height', 'normal'); exportFig('figs/simscape_model_decoupled_plant_svd.pdf', 'eps', true, 'width', 'wide', 'height', 'tall');
#+end_src #+end_src
#+name: fig:simscape_model_decoupled_plant_svd #+name: fig:simscape_model_decoupled_plant_svd
@ -1087,42 +1159,69 @@ Let's see the bode plot of the decoupled plant $G_d(s)$.
#+RESULTS: #+RESULTS:
[[file:figs/simscape_model_decoupled_plant_svd.png]] [[file:figs/simscape_model_decoupled_plant_svd.png]]
#+begin_src matlab :exports results Similarly, the bode plots of the diagonal elements and off-diagonal elements of the decoupled plant $G_x(s)$ using the Jacobian are shown in Figure [[fig:simscape_model_decoupled_plant_jacobian]].
#+begin_src matlab :exports none
freqs = logspace(-1, 2, 1000); freqs = logspace(-1, 2, 1000);
figure; figure;
tiledlayout(3, 1, 'TileSpacing', 'None', 'Padding', 'None');
% Magnitude
ax1 = nexttile([2, 1]);
hold on; hold on;
for ch_i = 1:6 for i_in = 1:6
plot(freqs, abs(squeeze(freqresp(Gj(ch_i, ch_i), freqs, 'Hz'))), ... for i_out = [1:i_in-1, i_in+1:6]
'DisplayName', sprintf('$G(%i, %i)$', ch_i, ch_i)); plot(freqs, abs(squeeze(freqresp(Gx(i_out, 6+i_in), freqs, 'Hz'))), 'color', [0,0,0,0.2], ...
end 'HandleVisibility', 'off');
for in_i = 1:5 end
for out_i = in_i+1:6
plot(freqs, abs(squeeze(freqresp(Gj(out_i, in_i), freqs, 'Hz'))), 'color', [0, 0, 0, 0.2], ...
'HandleVisibility', 'off');
end
end end
plot(freqs, abs(squeeze(freqresp(Gx(1, 2), freqs, 'Hz'))), 'color', [0,0,0,0.5], ...
'DisplayName', '$G_x(i,j),\ i \neq j$');
set(gca,'ColorOrderIndex',1)
plot(freqs, abs(squeeze(freqresp(Gx('Ax', 'Fx'), freqs, 'Hz'))), 'DisplayName', '$G_x(1,1) = A_x/F_x$');
plot(freqs, abs(squeeze(freqresp(Gx('Ay', 'Fy'), freqs, 'Hz'))), 'DisplayName', '$G_x(2,2) = A_y/F_y$');
plot(freqs, abs(squeeze(freqresp(Gx('Az', 'Fz'), freqs, 'Hz'))), 'DisplayName', '$G_x(3,3) = A_z/F_z$');
plot(freqs, abs(squeeze(freqresp(Gx('Arx', 'Mx'), freqs, 'Hz'))), 'DisplayName', '$G_x(4,4) = A_{R_x}/M_x$');
plot(freqs, abs(squeeze(freqresp(Gx('Ary', 'My'), freqs, 'Hz'))), 'DisplayName', '$G_x(5,5) = A_{R_y}/M_y$');
plot(freqs, abs(squeeze(freqresp(Gx('Arz', 'Mz'), freqs, 'Hz'))), 'DisplayName', '$G_x(6,6) = A_{R_z}/M_z$');
hold off; hold off;
set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log'); set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log');
ylabel('Magnitude'); xlabel('Frequency [Hz]'); ylabel('Magnitude'); set(gca, 'XTickLabel',[]);
legend('location', 'northwest'); legend('location', 'northwest');
ylim([1e-1, 1e6]); ylim([1e-2, 2e6])
set(gca, 'YMinorTick', 'on');
% Phase
ax2 = nexttile;
hold on;
plot(freqs, 180/pi*angle(squeeze(freqresp(Gx('Ax', 'Fx'), freqs, 'Hz'))));
plot(freqs, 180/pi*angle(squeeze(freqresp(Gx('Ay', 'Fy'), freqs, 'Hz'))));
plot(freqs, 180/pi*angle(squeeze(freqresp(Gx('Az', 'Fz'), freqs, 'Hz'))));
plot(freqs, 180/pi*angle(squeeze(freqresp(Gx('Arx', 'Mx'), freqs, 'Hz'))));
plot(freqs, 180/pi*angle(squeeze(freqresp(Gx('Ary', 'My'), freqs, 'Hz'))));
plot(freqs, 180/pi*angle(squeeze(freqresp(Gx('Arz', 'Mz'), freqs, 'Hz'))));
hold off;
set(gca, 'XScale', 'log'); set(gca, 'YScale', 'lin');
ylabel('Phase [deg]'); xlabel('Frequency [Hz]');
ylim([0, 180]);
yticks([0:45:360]);
linkaxes([ax1,ax2],'x');
#+end_src #+end_src
#+begin_src matlab :tangle no :exports results :results file replace #+begin_src matlab :tangle no :exports results :results file replace
exportFig('figs/simscape_model_decoupled_plant_jacobian.pdf', 'eps', true, 'width', 'wide', 'height', 'normal'); exportFig('figs/simscape_model_decoupled_plant_jacobian.pdf', 'eps', true, 'width', 'wide', 'height', 'tall');
#+end_src #+end_src
#+name: fig:simscape_model_decoupled_plant_jacobian #+name: fig:simscape_model_decoupled_plant_jacobian
#+caption: Decoupled Plant using the Jacobian #+caption: Stewart Platform Plant from forces (resp. torques) applied by the legs to the acceleration (resp. angular acceleration) of the platform as well as all the coupling terms between the two (non-diagonal terms of the transfer function matrix)
#+RESULTS: #+RESULTS:
[[file:figs/simscape_model_decoupled_plant_jacobian.png]] [[file:figs/simscape_model_decoupled_plant_jacobian.png]]
** Diagonal Controller ** Diagonal Controller
<<sec:stewart_diagonal_control>> <<sec:stewart_diagonal_control>>
The controller $K$ is a diagonal controller consisting a low pass filters with a crossover frequency $\omega_c$ and a DC gain $C_g$. The controller $K_c$ is a diagonal controller consisting a low pass filters with a crossover frequency $\omega_c$ and a DC gain $C_g$.
#+begin_src matlab #+begin_src matlab
wc = 2*pi*0.1; % Crossover Frequency [rad/s] wc = 2*pi*0.1; % Crossover Frequency [rad/s]
@ -1138,7 +1237,8 @@ The Jacobian is used to convert forces in the cartesian frame to forces applied
#+begin_src latex :file centralized_control.pdf :tangle no :exports results #+begin_src latex :file centralized_control.pdf :tangle no :exports results
\begin{tikzpicture} \begin{tikzpicture}
\node[block={2cm}{1.5cm}] (G) {$G$}; \node[block={2cm}{1.5cm}] (G) {$\begin{bmatrix}G_d\\G\end{bmatrix}$};
\node[above] at (G.north) {$\bm{G}$};
\node[block, below right=0.6 and -0.5 of G] (K) {$K_c$}; \node[block, below right=0.6 and -0.5 of G] (K) {$K_c$};
\node[block, below left= 0.6 and -0.5 of G] (J) {$J^{-T}$}; \node[block, below left= 0.6 and -0.5 of G] (J) {$J^{-T}$};
@ -1218,7 +1318,7 @@ Let's first verify the stability of the closed-loop systems:
#+RESULTS: #+RESULTS:
: ans = : ans =
: logical : logical
: 0 : 1
The obtained transmissibility in Open-loop, for the centralized control as well as for the SVD control are shown in Figure [[fig:stewart_platform_simscape_cl_transmissibility]]. The obtained transmissibility in Open-loop, for the centralized control as well as for the SVD control are shown in Figure [[fig:stewart_platform_simscape_cl_transmissibility]].
@ -1233,21 +1333,16 @@ The obtained transmissibility in Open-loop, for the centralized control as well
plot(freqs, abs(squeeze(freqresp(G( 'Ax', 'Dwx')/s^2, freqs, 'Hz'))), 'DisplayName', 'Open-Loop'); plot(freqs, abs(squeeze(freqresp(G( 'Ax', 'Dwx')/s^2, freqs, 'Hz'))), 'DisplayName', 'Open-Loop');
plot(freqs, abs(squeeze(freqresp(G_cen('Ax', 'Dwx')/s^2, freqs, 'Hz'))), 'DisplayName', 'Centralized'); plot(freqs, abs(squeeze(freqresp(G_cen('Ax', 'Dwx')/s^2, freqs, 'Hz'))), 'DisplayName', 'Centralized');
plot(freqs, abs(squeeze(freqresp(G_svd('Ax', 'Dwx')/s^2, freqs, 'Hz'))), 'DisplayName', 'SVD'); plot(freqs, abs(squeeze(freqresp(G_svd('Ax', 'Dwx')/s^2, freqs, 'Hz'))), 'DisplayName', 'SVD');
set(gca,'ColorOrderIndex',1)
plot(freqs, abs(squeeze(freqresp(G( 'Ay', 'Dwy')/s^2, freqs, 'Hz'))), 'HandleVisibility', 'off');
plot(freqs, abs(squeeze(freqresp(G_cen('Ay', 'Dwy')/s^2, freqs, 'Hz'))), 'HandleVisibility', 'off');
plot(freqs, abs(squeeze(freqresp(G_svd('Ay', 'Dwy')/s^2, freqs, 'Hz'))), 'HandleVisibility', 'off');
hold off; hold off;
set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log'); set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log');
ylabel('$D_x/D_{w,x}$, $D_y/D_{w, y}$'); set(gca, 'XTickLabel',[]); ylabel('$D_x/D_{w,x}$, $D_y/D_{w, y}$'); set(gca, 'XTickLabel',[]);
legend('location', 'southwest'); legend('location', 'southwest');
% ax2 = nexttile; ax2 = nexttile;
% hold on;
% plot(freqs, abs(squeeze(freqresp(G( 'Ay', 'Dwy')/s^2, freqs, 'Hz'))));
% plot(freqs, abs(squeeze(freqresp(G_cen('Ay', 'Dwy')/s^2, freqs, 'Hz'))));
% plot(freqs, abs(squeeze(freqresp(G_svd('Ay', 'Dwy')/s^2, freqs, 'Hz'))));
% hold off;
% set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log');
% ylabel('Transmissibility - $D_y/D_{w,y}$'); xlabel('Frequency [Hz]');
ax3 = nexttile;
hold on; hold on;
plot(freqs, abs(squeeze(freqresp(G( 'Az', 'Dwz')/s^2, freqs, 'Hz')))); plot(freqs, abs(squeeze(freqresp(G( 'Az', 'Dwz')/s^2, freqs, 'Hz'))));
plot(freqs, abs(squeeze(freqresp(G_cen('Az', 'Dwz')/s^2, freqs, 'Hz')))); plot(freqs, abs(squeeze(freqresp(G_cen('Az', 'Dwz')/s^2, freqs, 'Hz'))));
@ -1256,25 +1351,20 @@ The obtained transmissibility in Open-loop, for the centralized control as well
set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log'); set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log');
ylabel('$D_z/D_{w,z}$'); set(gca, 'XTickLabel',[]); ylabel('$D_z/D_{w,z}$'); set(gca, 'XTickLabel',[]);
ax4 = nexttile; ax3 = nexttile;
hold on; hold on;
plot(freqs, abs(squeeze(freqresp(G( 'Arx', 'Rwx')/s^2, freqs, 'Hz')))); plot(freqs, abs(squeeze(freqresp(G( 'Arx', 'Rwx')/s^2, freqs, 'Hz'))));
plot(freqs, abs(squeeze(freqresp(G_cen('Arx', 'Rwx')/s^2, freqs, 'Hz')))); plot(freqs, abs(squeeze(freqresp(G_cen('Arx', 'Rwx')/s^2, freqs, 'Hz'))));
plot(freqs, abs(squeeze(freqresp(G_svd('Arx', 'Rwx')/s^2, freqs, 'Hz')))); plot(freqs, abs(squeeze(freqresp(G_svd('Arx', 'Rwx')/s^2, freqs, 'Hz'))));
set(gca,'ColorOrderIndex',1)
plot(freqs, abs(squeeze(freqresp(G( 'Ary', 'Rwy')/s^2, freqs, 'Hz'))));
plot(freqs, abs(squeeze(freqresp(G_cen('Ary', 'Rwy')/s^2, freqs, 'Hz'))));
plot(freqs, abs(squeeze(freqresp(G_svd('Ary', 'Rwy')/s^2, freqs, 'Hz'))));
hold off; hold off;
set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log'); set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log');
ylabel('$R_x/R_{w,x}$, $R_y/R_{w,y}$'); xlabel('Frequency [Hz]'); ylabel('$R_x/R_{w,x}$, $R_y/R_{w,y}$'); xlabel('Frequency [Hz]');
% ax5 = nexttile; ax4 = nexttile;
% hold on;
% plot(freqs, abs(squeeze(freqresp(G( 'Ary', 'Rwy')/s^2, freqs, 'Hz'))));
% plot(freqs, abs(squeeze(freqresp(G_cen('Ary', 'Rwy')/s^2, freqs, 'Hz'))));
% plot(freqs, abs(squeeze(freqresp(G_svd('Ary', 'Rwy')/s^2, freqs, 'Hz'))));
% hold off;
% set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log');
% ylabel('Transmissibility - $R_y/R_{w,y}$'); xlabel('Frequency [Hz]');
ax6 = nexttile;
hold on; hold on;
plot(freqs, abs(squeeze(freqresp(G( 'Arz', 'Rwz')/s^2, freqs, 'Hz')))); plot(freqs, abs(squeeze(freqresp(G( 'Arz', 'Rwz')/s^2, freqs, 'Hz'))));
plot(freqs, abs(squeeze(freqresp(G_cen('Arz', 'Rwz')/s^2, freqs, 'Hz')))); plot(freqs, abs(squeeze(freqresp(G_cen('Arz', 'Rwz')/s^2, freqs, 'Hz'))));
@ -1283,7 +1373,7 @@ The obtained transmissibility in Open-loop, for the centralized control as well
set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log'); set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log');
ylabel('$R_z/R_{w,z}$'); xlabel('Frequency [Hz]'); ylabel('$R_z/R_{w,z}$'); xlabel('Frequency [Hz]');
linkaxes([ax1,ax2,ax3,ax4,ax5,ax6],'xy'); linkaxes([ax1,ax2,ax3,ax4],'xy');
xlim([freqs(1), freqs(end)]); xlim([freqs(1), freqs(end)]);
ylim([1e-5, 1e2]); ylim([1e-5, 1e2]);
#+end_src #+end_src