Exciting recent developments at the interface of optimization and control have shown that several fundamental problems in dynamics and control, such as stability, collision avoidance, robust performance, and controller synthesis can be addressed by a synergy of classical tools from Lyapunov theory and modern computational techniques from algebraic optimization. In this paper, we give a brief overview of our recent research efforts (with various coauthors) to (i) enhance the scalability of the algorithms in this field, and (ii) understand their worst case performance guarantees as well as fundamental limitations. Our results are tersely surveyed and challenges/opportunities that lie ahead are stated
Abstract. For a given asymptotically stable linear dynamic system it is often of interest to determi...
Although control Lyapunov functions (CLFs) provide a mature framework for the synthesis of stabilizi...
A wide variety of problems in systems and control theory can be cast or recast as convex problems th...
This thesis settles a number of questions related to computational complexity and algebraic, semidef...
In this paper we consider the stability and performance problem of nonlinear systems using a Lyapuno...
This paper addresses the generation of complete abstractions of polynomial dynamical systems by time...
International audienceWe study large-scale, continuous-time linear time-invariant control systems wi...
Optimization is among the richest modeling languages in science. In statistics and machine learning,...
The use of Lyapunov's direct method in obtaining regions of asymptotic stability of non-linear auton...
The paper proposes a control-theoretic framework for verification of numerical software systems, and...
International audienceIn a previous work, a theoretical framework of diffusive realization for state...
Motivated by the fact that the gradient-based optimization algorithms can be studied from the perspe...
Remarkable progress has been made in both theory and applications of all important areas of control....
Stability analysis of polynomial differential equations is a central topic in nonlinear dynamics and...
Abstract: We investigate linear programming relaxations to synthesize Lyapunov functions that es-tab...
Abstract. For a given asymptotically stable linear dynamic system it is often of interest to determi...
Although control Lyapunov functions (CLFs) provide a mature framework for the synthesis of stabilizi...
A wide variety of problems in systems and control theory can be cast or recast as convex problems th...
This thesis settles a number of questions related to computational complexity and algebraic, semidef...
In this paper we consider the stability and performance problem of nonlinear systems using a Lyapuno...
This paper addresses the generation of complete abstractions of polynomial dynamical systems by time...
International audienceWe study large-scale, continuous-time linear time-invariant control systems wi...
Optimization is among the richest modeling languages in science. In statistics and machine learning,...
The use of Lyapunov's direct method in obtaining regions of asymptotic stability of non-linear auton...
The paper proposes a control-theoretic framework for verification of numerical software systems, and...
International audienceIn a previous work, a theoretical framework of diffusive realization for state...
Motivated by the fact that the gradient-based optimization algorithms can be studied from the perspe...
Remarkable progress has been made in both theory and applications of all important areas of control....
Stability analysis of polynomial differential equations is a central topic in nonlinear dynamics and...
Abstract: We investigate linear programming relaxations to synthesize Lyapunov functions that es-tab...
Abstract. For a given asymptotically stable linear dynamic system it is often of interest to determi...
Although control Lyapunov functions (CLFs) provide a mature framework for the synthesis of stabilizi...
A wide variety of problems in systems and control theory can be cast or recast as convex problems th...