English

Optimally Controlled Moving Sets with Geographical Constraints

Optimization and Control 2025-02-11 v1

Abstract

The paper is concerned with a family of geometric evolution problems, modeling the spatial control of an invasive population within a region VR2V\subset \R^2 bounded by geographical barriers. If no control is applied, the contaminated set Ω(t)V\Omega(t)\subset V expands with unit speed in all directions. By implementing a control, a region of area MM can be cleared up per unit time. Given an initial set Ω(0)=Ω0V\Omega(0)=\Omega_0\subseteq V, three main problems are studied: (1) Existence of an admissible strategy tΩ(t)t\mapsto\Omega(t) which eradicates the contamination in finite time, so that Ω(T)=\Omega(T)=\emptyset for some T>0T>0. (2) Optimal strategies that achieve eradication in minimum time. (3) Strategies that minimize the average area of the contaminated set on a given time interval [0,T][0,T]. For these optimization problems, a sufficient condition for optimality is proved, together with several necessary conditions. Based on these conditions, optimal set-valued motions tΩ(t)t\mapsto \Omega(t) are explicitly constructed in a number of cases. \end{abstract}

Keywords

Cite

@article{arxiv.2502.05968,
  title  = {Optimally Controlled Moving Sets with Geographical Constraints},
  author = {Alberto Bressan and Elsa M. Marchini and Vasile Staicu},
  journal= {arXiv preprint arXiv:2502.05968},
  year   = {2025}
}
R2 v1 2026-06-28T21:37:50.867Z