Some approximation problems in semi-algebraic geometry

Abstract

In this paper we deal with a best approximation of a vector with respect to a closed semi-algebraic set C in the space Rn endowed with a semi-algebraic norm . Under additional assumptions on we prove semi-algebraicity of the set of points of unique approximation and other sets associated with the distance to C. For C irreducible algebraic we study the critical point correspondence and introduce the - distance degree, generalizing the notion appearing in DHOST for the Euclidean norm. We discuss separately the case of the p norm (p>1).