Birational invariance of motivic zeta functions of K-trivial varieties, and obstructions to smooth fillings

Abstract

The motivic zeta function of a smooth and proper C((t))-variety X with trivial canonical bundle is a rational function with coefficients in an appropriate Grothendieck ring of complex varieties, which measures how X degenerates at t=0. In analogy with Igusa's monodromy conjecture for p-adic zeta functions of hypersurface singularities, we expect that the poles of the motivic zeta function of X correspond to monodromy eigenvalues on the cohomology of X. In this paper, we prove that the motivic zeta function and the monodromy conjecture are preserved under birational equivalence, which extends the range of known cases. As a further application, we explain how the motivic zeta function acts as an obstruction to the existence of a smooth filling for X at t=0.