A Geodesic Stratification of Two-dimensional Semi-algebraic Sets

Abstract

Given any arbitrary semi-algebraic set X, any two points in X may be joined by a piecewise C2 path γ of shortest length. Suppose A is a semi-algebraic stratification of X such that each component of γ A is either a singleton or a real analytic geodesic segment in A, the question is whether γ A has at most finitely many such components. This paper gives a semi-algebraic stratification, in particular a cell decomposition, of a real semi-algebraic set in the plane whose open cells have this finiteness property. This provides insights for high dimensional stratifications of semi-algebraic sets in connection with geodesics.