On homotopy types of limits of semi-algebraic sets and additive complexity of polynomials

Abstract

We prove that the number of distinct homotopy types of limits of one-parameter semi-algebraic families of closed and bounded semi-algebraic sets is bounded singly exponentially in the additive complexity of any quantifier-free first order formula defining the family. As an important consequence, we derive that the number of distinct homotopy types of semi-algebraic subsets of Rk defined by a quantifier-free first order formula , where the sum of the additive complexities of the polynomials appearing in is at most a, is bounded by 2(k+a)O(1). This proves a conjecture made by Basu and Vorobjov [On the number of homotopy types of fibres of a definable map, J. Lond. Math. Soc. (2) 2007, 757--776].