Stability of closedness of semi-algebraic sets under continuous semi-algebraic mappings

Abstract

Given a closed semi-algebraic set X ⊂ Rn and a continuous semi-algebraic mapping G X Rm, it will be shown that there exists an open dense semi-algebraic subset U of L(Rn, Rm), the space of all linear mappings from Rn to Rm, such that for all F ∈ U, the image (F + G)(X) is a closed (semi-algebraic) set in Rm. To do this, we study the tangent cone at infinity C∞ X and the set E∞ X ⊂ C∞ X of (unit) exceptional directions at infinity of X. Specifically we show that the set E∞ X is nowhere dense in C∞ X Sn - 1.