Urysohn in action: separating semialgebraic sets by polynomials

A classical result from topology called Uryshon's lemma asserts the existence of a continuous separator of two disjoint closed sets in a sufficiently regular topological space. In this work we make a search for this separator constructive and efficient in the context of real algebraic geometry. Namely, given two compact disjoint basic semialgebraic sets which are contained in an $n$-dimensional box, we provide an algorithm that computes a separating polynomial greater than or equal to 1 on the first set and less than or equal to 0 on the second one.

Domaines

Optimisation et contrôle [math.OC]

Victor Magron : Connectez-vous pour contacter le contributeur

https://laas.hal.science/hal-03712510

Soumis le : lundi 4 juillet 2022-07:23:34

Dernière modification le : vendredi 26 avril 2024-13:18:47

Dates et versions

hal-03712510 , version 1 (04-07-2022)

Identifiants

HAL Id : hal-03712510 , version 1
ARXIV : 2207.00570

Citer

Milan Korda, Jean-Bernard Lasserre, Alexey Lazarev, Victor Magron, Simone Naldi. Urysohn in action: separating semialgebraic sets by polynomials. 2022. ⟨hal-03712510⟩

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