dehaeze21_activ_dampin_rota.../journal/paper.org
2021-08-27 18:48:24 +02:00

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Title Page   ignore

Introduction

<<sec:introduction>>

Needs for sensitive equipment   ignore

There is an increasing need to reduce the undesirable vibration of sensitive equipment in many different fields such as in aerospace industry cite:hanieh03_activ_stewar,hauge04_sensor_contr_space_based_six,souleille18_concep_activ_mount_space_applic, semi conductor industry cite:yoshioka01_activ_microv_isolat_system_hi, microscopy cite:lan08_activ_vibrat_isolat_long_range,fleming15_low_order_dampin_track_contr, gravitational wave detectors cite:matichard15_seism_isolat_advan_ligo and particles accelerators cite:collette10_activ_quadr_stabil_futur_linear_partic_collid,dehaeze18_sampl_stabil_for_tomog_exper.

A common method to reduce vibration is to mount the sensitive equipment on a suspended platform which attenuates the vibrations above the frequency of the suspension modes cite:reilly06_critic,poel10_explor_activ_hard_mount_vibrat. \par

Use of active damping   ignore

In order to further decrease the residual vibrations, active damping can be used for reducing the magnification of the response in the vicinity of the resonances cite:collette11_review_activ_vibrat_isolat_strat.

Many active damping techniques have been developed over the years such as Positive Position Feedback (PPF) cite:lin06_distur_atten_precis_hexap_point,fanson90_posit_posit_feedb_contr_large_space_struc, Integral Force Feedback (IFF) cite:preumont91_activ and Direct Velocity Feedback (DVF) cite:karnopp74_vibrat_contr_using_semi_activ_force_gener,serrand00_multic_feedb_contr_isolat_base_excit_vibrat,preumont02_force_feedb_versus_accel_feedb. \par

IFF Description   ignore

In cite:preumont92_activ_dampin_by_local_force, the IFF control scheme has been proposed, where a force sensor, a force actuator and an integral controller are used to directly augment the damping of a mechanical system. When the force sensor is collocated with the actuator, the open-loop transfer function has alternating poles and zeros which facilitate to guarantee the stability of the closed loop system cite:preumont02_force_feedb_versus_accel_feedb. It was latter shown that this property holds for multiple collated actuator/sensor pairs cite:preumont08_trans_zeros_struc_contr_with. \par

Comparison of IFF with other techniques   ignore

The main advantages of IFF over other active damping techniques are the guaranteed stability even in presence of flexible dynamics, good performances and robustness properties cite:preumont02_force_feedb_versus_accel_feedb. \par

IFF Improvements   ignore

Several improvements of the classical IFF have been proposed, such as adding a feed-through term to increase the achievable damping cite:teo15_optim_integ_force_feedb_activ_vibrat_contr or adding an high pass filter to recover the loss of compliance at low frequency cite:chesne16_enhan_dampin_flexib_struc_using_force_feedb. Recently, an $\mathcal{H}_\infty$ optimization criterion has been used to derive optimal gains for the IFF controller cite:zhao19_optim_integ_force_feedb_contr. \par

Problem with Gyroscopic effects   ignore

However, when the platform is rotating, gyroscopic effects alter the system dynamics and IFF cannot be applied as is. The purpose of this paper is to study how the IFF strategy can be adapted to deal with these gyroscopic effects. \par

Paper's structure   ignore

The paper is structured as follows. Section ref:sec:dynamics presents a simple model of a rotating suspended platform that will be used throughout this study. Section ref:sec:iff explains how the unconditional stability of IFF is lost due to gyroscopic effects induced by the rotation. Section ref:sec:iff_hpf suggests a simple modification of the control law such that damping can be added to the suspension modes in a robust way. Section ref:sec:iff_kp proposes to add springs in parallel with the force sensors to regain the unconditional stability of IFF. Section ref:sec:comparison compares both proposed modifications to the classical IFF in terms of damping authority and closed-loop system behavior.

Dynamics of Rotating Platforms

<<sec:dynamics>>

Model of a Rotating Platform   ignore

In order to study how the rotation affects the use of IFF, a model of a suspended platform on top of a rotating stage is used. Figure ref:fig:system represents a schematic of the model which is the simplest in which gyroscopic forces can be studied.

/tdehaeze/dehaeze21_activ_dampin_rotat_platf_using/src/branch/master/journal/figs/fig01.pdf

The rotating stage is supposed to be ideal, meaning it induces a perfect rotation $\theta(t) = \Omega t$ where $\Omega$ is the rotational speed in $\si{\radian\per\s}$.

The suspended platform consists of two orthogonal actuators each represented by three elements in parallel: a spring with a stiffness $k$ in $\si{\newton\per\meter}$, a dashpot with a damping coefficient $c$ in $\si{\newton\per(\meter\per\second)^{-1}}$ and an ideal force source $F_u, F_v$. A payload with a mass $m$ in $\si{\kilo\gram}$, representing the sensitive equipment, is mounted on the (rotating) suspended platform.

Two reference frames are used: an inertial frame $(\vec{i}_x, \vec{i}_y, \vec{i}_z)$ and a uniform rotating frame $(\vec{i}_u, \vec{i}_v, \vec{i}_w)$ rigidly fixed on top of the rotating stage with $\vec{i}_w$ aligned with the rotation axis. The position of the payload is represented by $(d_u, d_v, 0)$ expressed in the rotating frame.

Equations of Motion   ignore

To obtain the equations of motion for the system represented in Figure ref:fig:system, the Lagrangian equations are used:

\begin{equation} \frac{d}{dt} \left( \frac{\partial L}{\partial \dot{q}_i} \right) + \frac{\partial D}{\partial \dot{q}_i} - \frac{\partial L}{\partial q_i} = Q_i \end{equation}

with $L = T - V$ the Lagrangian, $T$ the kinetic coenergy, $V$ the potential energy, $D$ the dissipation function, and $Q_i$ the generalized force associated with the generalized variable $\begin{bmatrix}q_1 & q_2\end{bmatrix} = \begin{bmatrix}d_u & d_v\end{bmatrix}$. The equation of motion corresponding to the constant rotation along $\vec{i}_w$ is disregarded as this motion is considered to be imposed by the rotation stage.

\begin{equation} \begin{aligned} T &= \frac{1}{2} m \left( ( \dot{d}_u - \Omega d_v )^2 + ( \dot{d}_v + \Omega d_u )^2 \right), \\ V &= \frac{1}{2} k \big( {d_u}^2 + {d_v}^2 \big), \ Q_1 = F_u, \\ D &= \frac{1}{2} c \big( \dot{d}_u{}^2 + \dot{d}_v{}^2 \big), \ Q_2 = F_v \end{aligned} \end{equation}

Substituting Eq. eqref:eq:energy_functions_lagrange into Eq. eqref:eq:lagrangian_equations for both generalized coordinates gives two coupled differential equations eqref:eq:eom_coupled_1 and eqref:eq:eom_coupled_2.

\begin{subequations} \begin{align} m \ddot{d}_u + c \dot{d}_u + ( k - m \Omega^2 ) d_u &= F_u + 2 m \Omega \dot{d}_v \label{eq:eom_coupled_1} \\ m \ddot{d}_v + c \dot{d}_v + ( k \underbrace{-\,m \Omega^2}_{\text{Centrif.}} ) d_v &= F_v \underbrace{-\,2 m \Omega \dot{d}_u}_{\text{Coriolis}} \label{eq:eom_coupled_2} \end{align} \end{subequations}

The uniform rotation of the system induces two gyroscopic effects as shown in Eq. eqref:eq:eom_coupled:

  • Centrifugal forces: that can been seen as an added negative stiffness $- m \Omega^2$ along $\vec{i}_u$ and $\vec{i}_v$
  • Coriolis Forces: that adds coupling between the two orthogonal directions.

One can verify that without rotation ($\Omega = 0$) the system becomes equivalent to two uncoupled one degree of freedom mass-spring-damper systems.

Transfer Functions in the Laplace domain   ignore

To study the dynamics of the system, the differential equations of motions eqref:eq:eom_coupled are converted into the Laplace domain and the $2 \times 2$ transfer function matrix $\mathbf{G}_d$ from $\begin{bmatrix}F_u & F_v\end{bmatrix}$ to $\begin{bmatrix}d_u & d_v\end{bmatrix}$ in Eq. eqref:eq:Gd_mimo_tf is obtained. Its elements are shown in Eq. eqref:eq:Gd_indiv_el.

\begin{equation} \begin{bmatrix} d_u \\ d_v \end{bmatrix} = \mathbf{G}_d \begin{bmatrix} F_u \\ F_v \end{bmatrix} \end{equation} \begin{subequations} \begin{align} & \mathbf{G}_{d}(1,1) = \mathbf{G}_{d}(2,2) = \dots \nonumber \\ & \quad {\frac{ms^2 + cs + k - m \Omega^2}{\left( m s^2 + cs + k - m \Omega^2 \right)^2 + \left( 2 m \Omega s \right)^2}} \\ & \mathbf{G}_{d}(1,2) = -\mathbf{G}_{d}(1,2) = \dots \nonumber \\ & \quad {\frac{2 m \Omega s}{\left( m s^2 + cs + k - m \Omega^2 \right)^2 + \left( 2 m \Omega s \right)^2}} \end{align} \end{subequations}

To simplify the analysis, the undamped natural frequency $\omega_0$ and the damping ratio $\xi$ are used as in Eq. eqref:eq:xi_and_omega.

\begin{equation} \omega_0 = \sqrt{\frac{k}{m}} \text{ in } \si{\radian\per\second}, \quad \xi = \frac{c}{2 \sqrt{k m}} \end{equation}

The elements of transfer function matrix $\mathbf{G}_d$ are now describe by Eq. eqref:eq:Gd_w0_xi_k.

\begin{subequations} \begin{align} \mathbf{G}_{d}(1,1) &= {\scriptstyle \frac{\frac{1}{k} \left( \frac{s^2}{{\omega_0}^2} + 2 \xi \frac{s}{\omega_0} + 1 - \frac{{\Omega}^2}{{\omega_0}^2} \right)}{\left( \frac{s^2}{{\omega_0}^2} + 2 \xi \frac{s}{\omega_0} + 1 - \frac{{\Omega}^2}{{\omega_0}^2} \right)^2 + \left( 2 \frac{\Omega}{\omega_0} \frac{s}{\omega_0} \right)^2}} \\ \mathbf{G}_{d}(1,2) &= {\scriptstyle \frac{\frac{1}{k} \left( 2 \frac{\Omega}{\omega_0} \frac{s}{\omega_0} \right)}{\left( \frac{s^2}{{\omega_0}^2} + 2 \xi \frac{s}{\omega_0} + 1 - \frac{{\Omega}^2}{{\omega_0}^2} \right)^2 + \left( 2 \frac{\Omega}{\omega_0} \frac{s}{\omega_0} \right)^2}} \end{align} \end{subequations}

For all further numerical analysis in this study, we consider $\omega_0 = \SI{1}{\radian\per\second}$, $k = \SI{1}{\newton\per\meter}$ and $\xi = 0.025 = \SI{2.5}{\percent}$. Even though no system with such parameters will be encountered in practice, conclusions can be drawn relative to these parameters such that they can be generalized to any other set of parameters.

System Dynamics and Campbell Diagram   ignore

The poles of $\mathbf{G}_d$ are the complex solutions $p$ of Eq. eqref:eq:poles.

\begin{equation} \left( \frac{p^2}{{\omega_0}^2} + 2 \xi \frac{p}{\omega_0} + 1 - \frac{{\Omega}^2}{{\omega_0}^2} \right)^2 + \left( 2 \frac{\Omega}{\omega_0} \frac{p}{\omega_0} \right)^2 = 0 \end{equation}

Supposing small damping ($\xi \ll 1$), two pairs of complex conjugate poles are obtained as shown in Eq. eqref:eq:pole_values.

\begin{subequations} \begin{align} p_{+} &= - \xi \omega_0 \left( 1 + \frac{\Omega}{\omega_0} \right) \pm j \omega_0 \left( 1 + \frac{\Omega}{\omega_0} \right) \\ p_{-} &= - \xi \omega_0 \left( 1 - \frac{\Omega}{\omega_0} \right) \pm j \omega_0 \left( 1 - \frac{\Omega}{\omega_0} \right) \end{align} \end{subequations}

The real and complex parts of these two pairs of complex conjugate poles are represented in Figure ref:fig:campbell_diagram as a function of the rotational speed $\Omega$. As the rotational speed increases, $p_{+}$ goes to higher frequencies and $p_{-}$ goes to lower frequencies. The system becomes unstable for $\Omega > \omega_0$ as the real part of $p_{-}$ is positive. Physically, the negative stiffness term $-m\Omega^2$ induced by centrifugal forces exceeds the spring stiffness $k$.

In the rest of this study, rotational speeds smaller than the undamped natural frequency of the system are assumed ($\Omega < \omega_0$).

file:figs/fig02a.pdf file:figs/fig02b.pdf
<<fig:campbell_diagram_real>> Real Part <<fig:campbell_diagram_imag>> Imaginary Part

Looking at the transfer function matrix $\mathbf{G}_d$ in Eq. eqref:eq:Gd_w0_xi_k, one can see that the two diagonal (direct) terms are equal and that the two off-diagonal (coupling) terms are opposite. The bode plot of these two terms are shown in Figure ref:fig:plant_compare_rotating_speed for several rotational speeds $\Omega$. These plots confirm the expected behavior: the frequency of the two pairs of complex conjugate poles are further separated as $\Omega$ increases. For $\Omega > \omega_0$, the low frequency pair of complex conjugate poles $p_{-}$ becomes unstable.

file:figs/fig03a.pdf file:figs/fig03b.pdf
<<fig:plant_compare_rotating_speed_direct>> Direct Terms <<fig:plant_compare_rotating_speed_coupling>> Coupling Terms

Decentralized Integral Force Feedback

<<sec:iff>>

Force Sensors and Control Architecture   ignore

In order to apply IFF to the rotating system, force sensors are added in series with the two actuators (Figure ref:fig:system_iff). As this study focuses on decentralized control, two identical controllers $K_F$ are used to feedback each of the sensed force to its associated actuator and no attempt is made to counteract the interactions in the system. The control diagram is schematically shown in Figure ref:fig:control_diagram_iff.

/tdehaeze/dehaeze21_activ_dampin_rotat_platf_using/src/branch/master/journal/figs/fig04.pdf

/tdehaeze/dehaeze21_activ_dampin_rotat_platf_using/src/branch/master/journal/figs/fig05.pdf

Plant Dynamics   ignore

The forces $\begin{bmatrix}f_u & f_v\end{bmatrix}$ measured by the two force sensors represented in Figure ref:fig:system_iff are described by Eq. eqref:eq:measured_force.

\begin{equation} \begin{bmatrix} f_{u} \\ f_{v} \end{bmatrix} = \begin{bmatrix} F_u \\ F_v \end{bmatrix} - (c s + k) \begin{bmatrix} d_u \\ d_v \end{bmatrix} \end{equation}

The transfer function matrix $\mathbf{G}_{f}$ from actuator forces to measured forces in Eq. eqref:eq:Gf_mimo_tf can be obtained by inserting Eq. eqref:eq:Gd_w0_xi_k into Eq. eqref:eq:measured_force. Its elements are shown in Eq. eqref:eq:Gf_indiv_el.

\begin{equation} \begin{bmatrix} f_{u} \\ f_{v} \end{bmatrix} = \mathbf{G}_{f} \begin{bmatrix} F_u \\ F_v \end{bmatrix} \end{equation} \begin{subequations} \label{eq:Gf} \begin{align} & \mathbf{G}_{f}(1,1) = \mathbf{G}_{f}(2,2) = \dots \nonumber \\ & \quad {\scriptstyle \frac{\left( \frac{s^2}{{\omega_0}^2} - \frac{\Omega^2}{{\omega_0}^2} \right) \left( \frac{s^2}{{\omega_0}^2} + 2 \xi \frac{s}{\omega_0} + 1 - \frac{{\Omega}^2}{{\omega_0}^2} \right) + \left( 2 \frac{\Omega}{\omega_0} \frac{s}{\omega_0} \right)^2}{\left( \frac{s^2}{{\omega_0}^2} + 2 \xi \frac{s}{\omega_0} + 1 - \frac{{\Omega}^2}{{\omega_0}^2} \right)^2 + \left( 2 \frac{\Omega}{\omega_0} \frac{s}{\omega_0} \right)^2} } \label{eq:Gf_diag_tf} \\ & \mathbf{G}_{f}(1,2) = -\mathbf{G}_{f}(2,1) = \dots \nonumber \\ & \quad {\scriptstyle \frac{- \left( 2 \xi \frac{s}{\omega_0} + 1 \right) \left( 2 \frac{\Omega}{\omega_0} \frac{s}{\omega_0} \right)}{\left( \frac{s^2}{{\omega_0}^2} + 2 \xi \frac{s}{\omega_0} + 1 - \frac{{\Omega}^2}{{\omega_0}^2} \right)^2 + \left( 2 \frac{\Omega}{\omega_0} \frac{s}{\omega_0} \right)^2} } \label{eq:Gf_off_diag_tf} \end{align} \end{subequations}

The zeros of the diagonal terms of $\mathbf{G}_f$ in Eq. eqref:eq:Gf_diag_tf are computed, and neglecting the damping for simplicity, two complex conjugated poles $z_{c}$ are obtained in Eq. eqref:eq:iff_zero_cc, and two real zeros $z_{r}$ in Eq. eqref:eq:iff_zero_real.

\begin{subequations} \begin{align} z_c &= \pm j \omega_0 \sqrt{\frac{1}{2} \sqrt{8 \frac{\Omega^2}{{\omega_0}^2} + 1} + \frac{\Omega^2}{{\omega_0}^2} + \frac{1}{2} } \label{eq:iff_zero_cc} \\ z_r &= \pm \omega_0 \sqrt{\frac{1}{2} \sqrt{8 \frac{\Omega^2}{{\omega_0}^2} + 1} - \frac{\Omega^2}{{\omega_0}^2} - \frac{1}{2} } \label{eq:iff_zero_real} \end{align} \end{subequations}

It is interesting to see that the frequency of the pair of complex conjugate zeros $z_c$ in Eq. eqref:eq:iff_zero_cc always lies between the frequency of the two pairs of complex conjugate poles $p_{-}$ and $p_{+}$ in Eq. eqref:eq:pole_values.

For non-null rotational speeds, the two real zeros $z_r$ in Eq. eqref:eq:iff_zero_real induce a non-minimum phase behavior. This can be seen in the Bode plot of the diagonal terms (Figure ref:fig:plant_iff_compare_rotating_speed) where the low frequency gain is no longer zero while the phase stays at $\SI{180}{\degree}$.

The low frequency gain of $\mathbf{G}_f$ increases with the rotational speed $\Omega$ as shown in Eq. eqref:eq:low_freq_gain_iff_plan.

\begin{equation} \lim_{\omega \to 0} \left| \mathbf{G}_f (j\omega) \right| = \begin{bmatrix} \frac{\Omega^2}{{\omega_0}^2 - \Omega^2} & 0 \\ 0 & \frac{\Omega^2}{{\omega_0}^2 - \Omega^2} \end{bmatrix} \end{equation}

This can be explained as follows: a constant force $F_u$ induces a small displacement of the mass $d_u = \frac{F_u}{k - m\Omega^2}$, which increases the centrifugal force $m\Omega^2d_u = \frac{\Omega^2}{{\omega_0}^2 - \Omega^2} F_u$ which is then measured by the force sensors.

/tdehaeze/dehaeze21_activ_dampin_rotat_platf_using/src/branch/master/journal/figs/fig06.pdf

Decentralized Integral Force Feedback with Pure Integrators   ignore

<<sec:iff_pure_int>> The two IFF controllers $K_{F}$ consist of a pure integrator as shown in Eq. eqref:eq:Kf_pure_int where $g$ is a scalar representing the gain of the controller.

\begin{equation} \begin{aligned} \mathbf{K}_{F}(s) &= \begin{bmatrix} K_{F}(s) & 0 \\ 0 & K_{F}(s) \end{bmatrix} \\ K_{F}(s) &= g \cdot \frac{1}{s} \end{aligned} \end{equation}

In order to see how the IFF controller affects the poles of the closed loop system, a Root Locus plot (Figure ref:fig:root_locus_pure_iff) is constructed as follows: the poles of the closed-loop system are drawn in the complex plane as the controller gain $g$ varies from $0$ to $\infty$ for the two controllers $K_{F}$ simultaneously. As explained in cite:preumont08_trans_zeros_struc_contr_with,skogestad07_multiv_feedb_contr, the closed-loop poles start at the open-loop poles (shown by $\tikz[baseline=-0.6ex] \node[cross out, draw=black, minimum size=1ex, line width=2pt, inner sep=0pt, outer sep=0pt] at (0, 0){};$) for $g = 0$ and coincide with the transmission zeros (shown by $\tikz[baseline=-0.6ex] \draw[line width=2pt, inner sep=0pt, outer sep=0pt] (0,0) circle[radius=3pt];$) as $g \to \infty$. The direction of increasing gain is indicated by arrows $\tikz[baseline=-0.6ex] \draw[-{Stealth[round]},line width=2pt] (0,0) -- (0.3,0);$.

/tdehaeze/dehaeze21_activ_dampin_rotat_platf_using/src/branch/master/journal/figs/fig07.pdf

Whereas collocated IFF is usually associated with unconditional stability cite:preumont91_activ, this property is lost due to gyroscopic effects as soon as the rotational speed in non-null. This can be seen in the Root Locus plot (Figure ref:fig:root_locus_pure_iff) where poles corresponding to the controller are bound to the right half plane implying closed-loop system instability.

Physically, this can be explained like so: at low frequency, the loop gain is very large due to the pure integrator in $K_{F}$ and the finite gain of the plant (Figure ref:fig:plant_iff_compare_rotating_speed). The control system is thus canceling the spring forces which makes the suspended platform no able to hold the payload against centrifugal forces, hence the instability.

In order to apply decentralized IFF to rotating platforms, two solutions are proposed to deal with this instability problem. The first one consists of slightly modifying the control law (Section ref:sec:iff_hpf) while the second one consists of adding springs in parallel with the force sensors (Section ref:sec:iff_kp).

Integral Force Feedback with High Pass Filter

<<sec:iff_hpf>>

Modification of the Control Law   ignore

As was explained in the previous section, the instability comes in part from the high gain at low frequency caused by the pure integrators.

In order to limit the low frequency controller gain, an High Pass Filter (HPF) can be added to the controller as shown in Eq. eqref:eq:IFF_LHF.

\begin{equation} K_{F}(s) = g \cdot \frac{1}{s} \cdot \underbrace{\frac{s/\omega_i}{1 + s/\omega_i}}_{\text{HPF}} = g \cdot \frac{1}{s + \omega_i} \end{equation}

This is equivalent as to slightly shifting the controller pole to the left along the real axis.

This modification of the IFF controller is typically done to avoid saturation associated with the pure integrator cite:preumont91_activ,marneffe07_activ_passiv_vibrat_isolat_dampin_shunt_trans. This is however not the case in this study as it will become clear in the next section.

Feedback Analysis   ignore

The loop gains, $K_F(s)$ times the direct dynamics $f_u/F_u$, with and without the added HPF are shown in Figure ref:fig:loop_gain_modified_iff. The effect of the added HPF limits the low frequency gain as expected.

The Root Locus plots for the decentralized IFF with and without the HPF are displayed in Figure ref:fig:root_locus_modified_iff. With the added HPF, the poles of the closed loop system are shown to be stable up to some value of the gain $g_\text{max}$ in Eq. eqref:eq:gmax_iff_hpf.

\begin{equation} g_{\text{max}} = \omega_i \left( \frac{{\omega_0}^2}{\Omega^2} - 1 \right) \end{equation}

It is interesting to note that $g_{\text{max}}$ also corresponds to the controller gain at which the low frequency loop gain (Figure ref:fig:loop_gain_modified_iff) reaches one.

/tdehaeze/dehaeze21_activ_dampin_rotat_platf_using/src/branch/master/journal/figs/fig08.pdf

/tdehaeze/dehaeze21_activ_dampin_rotat_platf_using/src/branch/master/journal/figs/fig09.pdf

Optimal Control Parameters   ignore

Two parameters can be tuned for the modified controller in Eq. eqref:eq:IFF_LHF: the gain $g$ and the pole's location $\omega_i$. The optimal values of $\omega_i$ and $g$ are here considered as the values for which the damping of all the closed-loop poles are simultaneously maximized.

In order to visualize how $\omega_i$ does affect the attainable damping, the Root Locus plots for several $\omega_i$ are displayed in Figure ref:fig:root_locus_wi_modified_iff. It is shown that even though small $\omega_i$ seem to allow more damping to be added to the suspension modes, the control gain $g$ may be limited to small values due to Eq. eqref:eq:gmax_iff_hpf.

/tdehaeze/dehaeze21_activ_dampin_rotat_platf_using/src/branch/master/journal/figs/fig10.pdf

In order to study this trade off, the attainable closed-loop damping ratio $\xi_{\text{cl}}$ is computed as a function of $\omega_i/\omega_0$. The gain $g_{\text{opt}}$ at which this maximum damping is obtained is also displayed and compared with the gain $g_{\text{max}}$ at which the system becomes unstable (Figure ref:fig:mod_iff_damping_wi).

/tdehaeze/dehaeze21_activ_dampin_rotat_platf_using/src/branch/master/journal/figs/fig11.pdf

Three regions can be observed:

  • $\omega_i/\omega_0 < 0.02$: the added damping is limited by the maximum allowed control gain $g_{\text{max}}$
  • $0.02 < \omega_i/\omega_0 < 0.2$: the attainable damping ratio is maximized and is reached for $g \approx 2$
  • $0.2 < \omega_i/\omega_0$: the added damping decreases as $\omega_i/\omega_0$ increases.

Integral Force Feedback with Parallel Springs

<<sec:iff_kp>>

Stiffness in Parallel with the Force Sensor   ignore

In this section additional springs in parallel with the force sensors are added to counteract the negative stiffness induced by the gyroscopic effects. Such springs are schematically shown in Figure ref:fig:system_parallel_springs where $k_a$ is the stiffness of the actuator and $k_p$ the stiffness in parallel with the actuator and force sensor.

Amplified piezoelectric stack actuators can be used for such purpose where a part of the piezoelectric stack is used as an actuator while the rest is used as a force sensor cite:souleille18_concep_activ_mount_space_applic. The parallel stiffness $k_p$ then corresponds to the mechanical amplification structure.

/tdehaeze/dehaeze21_activ_dampin_rotat_platf_using/src/branch/master/journal/figs/fig12.pdf

Effect of the Parallel Stiffness on the Plant Dynamics   ignore

The forces measured by the two force sensors represented in Figure ref:fig:system_parallel_springs are described by Eq. eqref:eq:measured_force_kp.

\begin{equation} \begin{bmatrix} f_{u} \\ f_{v} \end{bmatrix} = \begin{bmatrix} F_u \\ F_v \end{bmatrix} - (c s + k_a) \begin{bmatrix} d_u \\ d_v \end{bmatrix} \end{equation}

In order to keep the overall stiffness $k = k_a + k_p$ constant, thus not modifying the open-loop poles as $k_p$ is changed, a scalar parameter $\alpha$ ($0 \le \alpha < 1$) is defined to describe the fraction of the total stiffness in parallel with the actuator and force sensor as in Eq. eqref:eq:kp_alpha.

\begin{equation} k_p = \alpha k, \quad k_a = (1 - \alpha) k \end{equation}

After the equations of motion derived and transformed in the Laplace domain, the transfer function matrix $\mathbf{G}_k$ in Eq. eqref:eq:Gk_mimo_tf is computed. Its elements are shown in Eq. eqref:eq:Gk_diag and eqref:eq:Gk_off_diag.

\begin{equation} \begin{bmatrix} f_u \\ f_v \end{bmatrix} = \mathbf{G}_k \begin{bmatrix} F_u \\ F_v \end{bmatrix} \end{equation} \begin{subequations} \begin{align} & \mathbf{G}_{k}(1,1) = \mathbf{G}_{k}(2,2) = \dots \nonumber \\ & \quad {\scriptstyle \frac{\big( \frac{s^2}{{\omega_0}^2} - \frac{\Omega^2}{{\omega_0}^2} + \alpha \big) \big( \frac{s^2}{{\omega_0}^2} + 2 \xi \frac{s}{\omega_0} + 1 - \frac{{\Omega}^2}{{\omega_0}^2} \big) + \big( 2 \frac{\Omega}{\omega_0} \frac{s}{\omega_0} \big)^2}{\big( \frac{s^2}{{\omega_0}^2} + 2 \xi \frac{s}{\omega_0} + 1 - \frac{{\Omega}^2}{{\omega_0}^2} \big)^2 + \big( 2 \frac{\Omega}{\omega_0} \frac{s}{\omega_0} \big)^2} } \label{eq:Gk_diag} \\ & \mathbf{G}_{k}(1,2) = -\mathbf{G}_{k}(2,1) = \dots \nonumber \\ & \quad {\scriptscriptstyle \frac{- \left( 2 \xi \frac{s}{\omega_0} + 1 - \alpha \right) \left( 2 \frac{\Omega}{\omega_0} \frac{s}{\omega_0} \right)}{\left( \frac{s^2}{{\omega_0}^2} + 2 \xi \frac{s}{\omega_0} + 1 - \frac{{\Omega}^2}{{\omega_0}^2} \right)^2 + \left( 2 \frac{\Omega}{\omega_0} \frac{s}{\omega_0} \right)^2} } \label{eq:Gk_off_diag} \end{align} \end{subequations}

Comparing $\mathbf{G}_k$ in Eq. eqref:eq:Gk with $\mathbf{G}_f$ in Eq. eqref:eq:Gf shows that while the poles of the system are kept the same, the zeros of the diagonal terms have changed. The two real zeros $z_r$ in Eq. eqref:eq:iff_zero_real that were inducing a non-minimum phase behavior are transformed into two complex conjugate zeros if the condition in Eq. eqref:eq:kp_cond_cc_zeros holds.

\begin{equation} \alpha > \frac{\Omega^2}{{\omega_0}^2} \quad \Leftrightarrow \quad k_p > m \Omega^2 \end{equation}

Thus, if the added parallel stiffness $k_p$ is higher than the negative stiffness induced by centrifugal forces $m \Omega^2$, the dynamics from actuator to its collocated force sensor will show minimum phase behavior. This is confirmed by the Bode plot in Figure ref:fig:plant_iff_kp.

Figure ref:fig:root_locus_iff_kp shows the Root Locus plots for $k_p = 0$, $k_p < m \Omega^2$ and $k_p > m \Omega^2$ when $K_F$ is a pure integrator as in Eq. eqref:eq:Kf_pure_int. It is shown that if the added stiffness is higher than the maximum negative stiffness, the poles of the closed-loop system are bounded on the (stable) left half-plane, and hence the unconditional stability of IFF is recovered.

/tdehaeze/dehaeze21_activ_dampin_rotat_platf_using/src/branch/master/journal/figs/fig13.pdf

/tdehaeze/dehaeze21_activ_dampin_rotat_platf_using/src/branch/master/journal/figs/fig14.pdf

Optimal Parallel Stiffness   ignore

Even though the parallel stiffness $k_p$ has no impact on the open-loop poles (as the overall stiffness $k$ is kept constant), it has a large impact on the transmission zeros. Moreover, as the attainable damping is generally proportional to the distance between poles and zeros cite:preumont18_vibrat_contr_activ_struc_fourt_edition, the parallel stiffness $k_p$ is foreseen to have a large impact on the attainable damping.

To study this effect, Root Locus plots for several parallel stiffnesses $k_p > m \Omega^2$ are shown in Figure ref:fig:root_locus_iff_kps. The frequencies of the transmission zeros of the system are increasing with an increase of the parallel stiffness $k_p$ and the associated attainable damping is reduced. Therefore, even though the parallel stiffness $k_p$ should be larger than $m \Omega^2$ for stability reasons, it should not be taken too large as this would limit the attainable damping.

This is confirmed by the Figure ref:fig:opt_damp_alpha where the attainable closed-loop damping ratio $\xi_{\text{cl}}$ and the associated optimal control gain $g_\text{opt}$ are computed as a function of $\alpha$.

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/tdehaeze/dehaeze21_activ_dampin_rotat_platf_using/src/branch/master/journal/figs/fig16.pdf

Comparison and Discussion

<<sec:comparison>>

Introduction   ignore

In order to overcome the instability issue of the classical IFF strategy when applied to rotating platforms, two modifications of IFF have been proposed in Sections ref:sec:iff_hpf and ref:sec:iff_kp. These two methods are now compared in terms of added damping, closed-loop compliance and transmissibility.

For the following comparisons, the cut-off frequency for the HPF is set to $\omega_i = 0.1 \omega_0$ and the stiffness of the parallel springs is set to $k_p = 5 m \Omega^2$ (corresponding to $\alpha = 0.05$). These values are chosen based on the discussion about optimal parameters.

Comparison of the Attainable Damping   ignore

Figure ref:fig:comp_root_locus shows the Root Locus plots for the two proposed IFF modifications. While the two pairs of complex conjugate open-loop poles are identical for both techniques, the transmission zeros are not. This means that the closed-loop behavior of both systems will differ when large control gains are used.

One can observe that the closed loop poles corresponding to the system with added springs (in red) are bounded to the left half plane implying unconditional stability. This is not the case for the system where the controller is augmented with an HPF (in blue).

It is interesting to note that the maximum added damping is very similar for both techniques and is reached for the same control gain $g_\text{opt} \approx 2 \omega_0$.

/tdehaeze/dehaeze21_activ_dampin_rotat_platf_using/src/branch/master/journal/figs/fig17.pdf

Comparison Transmissibility and Compliance   ignore

The two proposed techniques are now compared in terms of closed-loop transmissibility and compliance.

The transmissibility is here defined as the transfer function from a displacement of the rotating stage along $\vec{i}_x$ to the displacement of the payload along the same direction. It is used to characterize how much vibration is transmitted through the suspended platform to the payload.

The compliance describes the displacement response of the payload to external forces applied to it. This is a useful metric when disturbances are directly applied to the payload. It is here defined as the transfer function from external forces applied on the payload along $\vec{i}_x$ to the displacement of the payload along the same direction.

The two techniques are also compared with passive damping (Figure ref:fig:system) where the damping coefficient $c$ is tuned to critically damp the resonance when the rotating speed is null as shown in Eq. eqref:eq:critical_damp.

\begin{equation} c_\text{crit} = 2 \sqrt{k m} \end{equation}

Very similar results are obtained for the two proposed IFF modifications in terms of transmissibility (Figure ref:fig:comp_transmissibility) and compliance (Figure ref:fig:comp_compliance). It is also confirmed that these two techniques can significantly damp the suspension modes.

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/tdehaeze/dehaeze21_activ_dampin_rotat_platf_using/src/branch/master/journal/figs/fig19.pdf

On can see in Figure ref:fig:comp_transmissibility that the problem of the degradation of the transmissibility at high frequency when using passive damping techniques is overcome by the use of IFF.

The addition of the HPF or the use of the parallel stiffness also permits to limit the degradation of the compliance as compared with classical IFF (Figure ref:fig:comp_compliance).

Conclusion

<<sec:conclusion>>

Due to gyroscopic effects, decentralized IFF with pure integrators was shown to be unstable when applied to rotating platforms. Two modifications of the classical IFF control have been proposed to overcome this issue.

The first modification concerns the controller and consists of adding an high pass filter to the pure integrators. This is equivalent as to moving the controller pole to the left along the real axis. This allows the closed loop system to be stable up to some value of the controller gain.

The second proposed modification concerns the mechanical system. Additional springs are added in parallel with the actuators and force sensors. It was shown that if the stiffness $k_p$ of the additional springs is larger than the negative stiffness $m \Omega^2$ induced by centrifugal forces, the classical decentralized IFF regains its unconditional stability property.

While having very different implementations, both proposed modifications are very similar when it comes to the attainable damping and the obtained closed loop system behavior.

Future work will focus on the experimental validation of the proposed IFF modifications.

Data Availability

Matlab cite:matlab20 was used for this study. The source code is available under a MIT License and archived in Zenodo cite:dehaeze20_activ_dampin_rotat_posit_platf.

Acknowledgments

This research benefited from a FRIA grant (grant number: FC 31597) from the French Community of Belgium. This paper is based on a paper previously presented at the ISMA conference cite:dehaeze20_activ_dampin_rotat_platf_integ_force_feedb.

References   ignore

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