On the set of local extrema of a subanalytic function

Abstract

Let F be a category of subanalytic subsets of real analytic manifolds that is closed under basic set-theoretical and basic topological operations. Let M be a real analytic manifold and denote F(M) the family of the subsets of M that belong to F. Let f:X R be a subanalytic function on a subset X∈ F(M) such that the inverse image under f of each interval of R belongs to F(M). Let Max(f) be the set of local maxima of f and consider Maxλ(f):= Max(f)\f=λ\ for each λ∈ R. If f is continuous, then Max(f)=λ∈ R Maxλ(f)∈ F(M) if and only if the family \ Maxλ(f)\λ∈ R is locally finite in M. If we erase continuity condition, there exist subanalytic functions f:X M such that Max(f)∈ F(M), but the family \ Maxλ(f)\λ∈ R is not locally finite in M or such that Max(f) is connected but it is not even subanalytic. If F is the category of subanalytic sets and f:X R is a subanalytic map f that maps relatively compact subsets of M contained in X to bounded subsets of R, then Max(f)∈ F(M) and the family \ Maxλ(f)\λ∈ R is locally finite in M. If the category F contains the intersections of algebraic sets with real analytic submanifolds and X∈ F(M) is not closed in M, there exists a continuous subanalytic function f:X R with graph belonging to F(M× R) such that inverse images under f of the intervals of R belong to F(M) but Max(f) does not belong to F(M).