In this paper we consider a class of optimal control problems that have continuous-time nonlinear dynamics and nonconvex control constraints. We propose a convex relaxation of the nonconvex control constraints, and prove that the optimal solution to the relaxed problem is the globally optimal solution to the original problem with nonconvex control constraints. This lossless convexification enables a computationally simpler problem to be solved instead of the original problem. We demonstrate the approach in simulation with a planetary soft landing problem involving a nonlinear gravity field
In this thesis, we consider several types of optimal control problems with constraints on the state ...
In this paper an algorithm is proposed for solving continuous linear optimal control systems with st...
In this paper we present a weak maximum principle for optimal control problems involving mixed const...
Abstract — Planetary soft landing is one of the benchmark problems of optimal control theory and is ...
AbstractRelaxed controls induce convexity of the velocity sets in optimal control problems, permitti...
Abstract. The problem of maximizing a nonsmooth convex function over an arbitrary set is considered....
Thesis (Ph.D.)--University of Washington, 2021The topic of this dissertation centers around Successi...
The purpose of this paper is to consider a control system of nonlinear evolution hemivariational ine...
Non-convex discrete-time optimal control problems in, e.g., water or power systems, typically involv...
This note discusses the concepts of convex control systems and convex optimal control problems. We s...
For a class of infinite-dimensional minimization problems with nonlinear equality constraints, an it...
International audienceWe consider the undiscounted infinite horizon optimal control problem under st...
This paper addresses an approximate version of the optimal control problem with non-convex state con...
Thesis (Ph.D.)--University of Washington, 2021Future aerospace vehicles, and other autonomous system...
textThis dissertation begins with an introduction to finite-dimensional optimization and optimal con...
In this thesis, we consider several types of optimal control problems with constraints on the state ...
In this paper an algorithm is proposed for solving continuous linear optimal control systems with st...
In this paper we present a weak maximum principle for optimal control problems involving mixed const...
Abstract — Planetary soft landing is one of the benchmark problems of optimal control theory and is ...
AbstractRelaxed controls induce convexity of the velocity sets in optimal control problems, permitti...
Abstract. The problem of maximizing a nonsmooth convex function over an arbitrary set is considered....
Thesis (Ph.D.)--University of Washington, 2021The topic of this dissertation centers around Successi...
The purpose of this paper is to consider a control system of nonlinear evolution hemivariational ine...
Non-convex discrete-time optimal control problems in, e.g., water or power systems, typically involv...
This note discusses the concepts of convex control systems and convex optimal control problems. We s...
For a class of infinite-dimensional minimization problems with nonlinear equality constraints, an it...
International audienceWe consider the undiscounted infinite horizon optimal control problem under st...
This paper addresses an approximate version of the optimal control problem with non-convex state con...
Thesis (Ph.D.)--University of Washington, 2021Future aerospace vehicles, and other autonomous system...
textThis dissertation begins with an introduction to finite-dimensional optimization and optimal con...
In this thesis, we consider several types of optimal control problems with constraints on the state ...
In this paper an algorithm is proposed for solving continuous linear optimal control systems with st...
In this paper we present a weak maximum principle for optimal control problems involving mixed const...