On the poles of topological zeta functions
Abstract
We study the topological zeta function Ztop,f(s) associated to a polynomial f with complex coefficients. This is a rational function in one variable and we want to determine the numbers that can occur as a pole of some topological zeta function; by definition these poles are negative rational numbers. We deal with this question in any dimension. Denote Pn := s0 | ∃ f in C[x1,..., xn] : Ztop,f(s) has a pole in s0. We show that -(n-1)/2-1/i | i in Z>1 is a subset of Pn; for n=2 and n=3, the last two authors proved before that these are exactly the poles less then -(n-1)/2. As main result we prove that each rational number in the interval [-(n-1)/2,0) is contained in Pn.
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