Dielectrophoretic Particle: Difference between revisions

Dielectrophoretic Particle
State dimension:	1
Differential states:	2
Discrete control functions:	2

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Revision as of 15:04, 24 November 2025

The Dielectrophoretic Particle problem is a classical time-optimal control benchmark for microfluidic particle manipulation. This description is taken from [1].

It models the motion of a particle under a dielectrophoretic force, where the control voltage applied to electrodes directly influences the particle trajectory. Both the particle position and an auxiliary state related to its dipole moment, as well as the control voltage, are decision variables. The objective is to transfer the particle from an initial position to a target position in minimal time, while satisfying bounds on the control input and maintaining the auxiliary state dynamics.

Mathematical formulation

$\begin{array}{lll} \min_{t_{f}, u} & t_{f} \\ subject to \\ \dot{x_{0}} (t) & = & x_{1} (t) \cdot u (t) + α \cdot u (t)^{2}, \\ \dot{x_{1}} (t) & = & - c \cdot x_{1} (t) + u (t), \\ x_{0} (0) & = & x_{0}, \\ x_{1} (0) & = & 0, \\ x_{0} (t_{f}) & = & x_{f}, \\ t_{f} & \geq & 0, \\ u (t) & \in & [- 1, 1] \forall t \in [0, t_{f}] \end{array}$

Parameters

These fixed values are used within the model:

Symbol	Value	Description
$x_{0}$	1	Initial particle position
$x_{f}$	2	Final particle position
$α$	-0.75	Nonlinear coefficient
$c$	1	Damping coefficient

Reference Solutions

Here is one local solution to the above control problem.

Reference solution plots
States and discretized control for a local optimum. The control $t_{f}$ represents the scaling of the time interval, where the base time interval is [0,5].

Miscellaneous and Further Reading

This formulation and a detailed description can be found in [1].

References

[1] Caillau, J.-B., Cots, O., Gergaud, J., & Martinon, P. OptimalControlProblems.jl: a collection of optimal control problems with ODE's in Julia. https://github.com/control-toolbox/OptimalControlProblems.jl/blob/main/ext/Descriptions/dielectrophoretic_particle.md

@@ Line 19: / Line 19: @@
 \quad \dot{x_0}(t) & = & x_1(t) \cdot u(t) + \alpha \cdot u(t)^2,\\
 \quad \dot{x_1}(t) & = & -c \cdot x_1(t) + u(t), \\
-\quad x(0) &=& x_0, \\
+\quad x_0(0) &=& x_0, \\
-\quad y(0) &=& 0, \\
+\quad x_1(0) &=& 0, \\
-\quad x(t_f) &=& x_f, \\
+\quad x_0(t_f) &=& x_f, \\
 \quad t_f & \geq & 0, \\
 \quad u(t) & \in & [-1, 1] \ \quad \forall t \in [0,t_f]