Semi-algebraic description of the closure of the image of a semi-algebraic set under a polynomial

Abstract

Given a polynomial f and a semi-algebraic set S, we provide a symbolic algorithm to find the equations and inequalities defining a semi-algebraic set Q which is identical to the closure of the image of S under f, i.e., equation Q=f(S)\,. equation Consequently, every polynomial optimization problem whose optimum value is finite has an equivalent form with attained optimum value, i.e., equation t∈ Q t =∈fx∈ S f(x) equation whenever the right-hand side is finite. Given d as the upper bound on the degrees of f and polynomials defining S, we prove that our method requires O(dO(n)) arithmetic operations to produce polynomials of degrees at most dO(n) defining f(S).