Minimal polynomial descriptions of polyhedra and special semialgebraic sets

Abstract

We show that a d-dimensional polyhedron S in d can be represented by d-polynomial inequalities, that is, S = \x ∈ d : p0(x) 0, >..., pd-1(x) 0 \, where p0,...,pd-1 are appropriate polynomials. Furthermore, if an elementary closed semialgebraic set S is given by polynomials q1,...,qk and for each x ∈ S at most s of these polynomials vanish in x, then S can be represented by s+1 polynomials (and by s polynomials under the extra assumption that the number of points x ∈ S in which s qi's vanish is finite).