A baby step-giant step roadmap algorithm for general algebraic sets

Abstract

Let R be a real closed field and D ⊂ R an ordered domain. We give an algorithm that takes as input a polynomial Q ∈ D[X1,…,Xk], and computes a description of a roadmap of the set of zeros, Zer(Q,Rk), of Q in Rk. The complexity of the algorithm, measured by the number of arithmetic operations in the ordered domain D, is bounded by dO(k k), where d = deg(Q) 2. As a consequence, there exist algorithms for computing the number of semi-algebraically connected components of a real algebraic set, Zer(Q,Rk), whose complexity is also bounded by dO(k k), where d = deg(Q) 2. The best previously known algorithm for constructing a roadmap of a real algebraic subset of Rk defined by a polynomial of degree d has complexity dO(k2).