Bounds on the number of connected components for tropical prevarieties

Abstract

For a tropical prevariety in Rn given by a system of k tropical polynomials in n variables with degrees at most d, we prove that its number of connected components is less than k+7n-1 3n · d3nk+n+1. On a number of 0-dimensional connected components a better bound k+4n 3n · dnk+n+1 is obtained, which extends the Bezout bound due to B.~Sturmfels from the the case k=n to an arbitrary k n. Also we show that the latter bound is close to sharp, in particular, the number of connected components can depend on k.