Efficient simplicial replacement of semi-algebraic sets

Abstract

We prove that for any ≥ 0, there exists an algorithm which takes as input a description of a semi-algebraic subset S ⊂ Rk given by a quantifier-free first order formula φ in the language of the reals, and produces as output a simplicial complex , whose geometric realization, || is -equivalent to S. The complexity of our algorithm is bounded by (sd)kO(), where s is the number of polynomials appearing in the formula φ, and d a bound on their degrees. For fixed , this bound is singly exponential in k. In particular, since -equivalence implies that the homotopy groups up to dimension of || are isomorphic to those of S, we obtain a reduction (having singly exponential complexity) of the problem of computing the first homotopy groups of S to the combinatorial problem of computing the first homotopy groups of a finite simplicial complex of size bounded by (sd)kO().