A Refinement in Čech Cohomology of Coron's Necessary Condition

Abstract

Coron established a homological obstruction to continuous feedback stabilization of nonlinear control systems x=f(x,u) with f ∈ C(Ω,Rn) and f(0,0)=0, showing that local asymptotic stabilizability implies the induced homomorphism f* satisfies f*(Hn-1(Σε))=Hn-1(Sn-1), where Σε:=((BεRn(0)×BεRm(0)) Ω) f-1(0). In this paper, we refine Coron's necessary condition using Čech cohomology and the Vietoris-Begle mapping theorem. Specifically, we prove that the closed version of Σε must be a Čech cohomology (n-1)-sphere and that the restriction of f to this subset induces an isomorphism on its Čech cohomology groups in all degrees. This strengthens Coron's condition from a constraint on the top class to a full cohomological rigidity statement.