On a real analogue of Bezout inequality and the number of connected components of sign conditions

Abstract

Let R be a real closed field and Q1, …, Q ∈ R[X1, …,Xk] such that for each i, 1 ≤ i ≤ , deg (Qi) ≤ di. For 1 ≤ i ≤ , denote by Qi = \Q1, …, Qi \, Vi the real variety defined by Qi, and ki an upper bound on the real dimension of Vi (by convention V0 = Rk and k0 = k). Suppose also that \[ 2 ≤ d1 ≤ d2 ≤ 1k + 1 d3 ≤ 1(k + 1)2 d4 ≤ ·s ≤ 1(k + 1) - 3 d - 1 ≤ 1(k + 1) - 2 d, \] and that ≤ k. We prove that the number of semi-algebraically connected components of V is bounded by \[ O (k)2 k (Π1 ≤ j < djkj - 1 - kj ) dk - 1. \] This bound can be seen as a weak extension of the classical Bezout inequality (which holds only over algebraically closed fields and is false over real closed fields) to varieties defined over real closed fields. Additionally, if P ⊂ R[X1, …, Xk] is a finite family of polynomials with deg (P) ≤ d for all P ∈ P, card( P) = s, and d ≤ 1k + 1 d, we prove that the number of semi-algebraically connected components of the realizations of all realizable sign conditions of the family P restricted to V is bounded by \[ O (k)2 k (s d)k (Π1 ≤ j ≤ djkj - 1 - kj ). \]