Preprint

Inserted: 7 jul 2023
Last Updated: 7 jul 2023

Year: 2023

Abstract:

The paper is concerned with a class of optimization problems for moving sets $t\mapsto\Omega(t)\subset\mathbb{R}^2$, motivated by the control of invasive biological populations. Assuming that the initial contaminated set $\Omega_0$ is convex, we prove that a strategy is optimal if an only if at each given time $t\in [0,T]$ the control is active along the portion of the boundary $\partial \Omega(t)$ where the curvature is maximal. In particular, this implies that $\Omega(t)$ is convex for all $t\geq 0$. The proof relies on the analysis of a one-step constrained optimization problem, obtained by a time discretization.

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• optsetcontrol-21.pdf