Geometric interpretation of First Betti numbers of smooth functions orbits

Abstract

Let M be a 2-disk or a cylinder, and f be a smooth function on M with constant values at ∂ M, devoid of critical points in ∂ M, and exhibiting a property wherein for every critical point z of f there is a local presentation of f near z that is a homogeneous polynomial without multiple factors. We consider V to be either the boundary ∂ M (in the case of a 2-disk) or one of its boundary components (in the case of a cylinder) and S'(f, V) to consist of diffeomorphisms preserving f, isotopic to the identity relative to V. We establish a correspondence: the first Betti number of the f-orbit is shown to be equal to the number of orbits resulting from the action of S'(f,V) on the internal edges of the Kronrod-Reeb graph associated with f.

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