On singularity properties of convolutions of algebraic morphisms -- the general case (with an appendix joint with Gady Kozma)

Abstract

Let K be a field of characteristic zero, X and Y be smooth K-varieties, and let G be a algebraic K-group. Given two algebraic morphisms :X→ G and :Y→ G, we define their convolution *:X× Y G by *(x,y)=(x)·(y). We then show that this operation yields morphisms with improved smoothness properties. More precisely, we show that for any morphism :X→ G which is dominant when restricted to each absolutely irreducible component of X, by convolving it with itself finitely many times, one can obtain a flat morphism with reduced fibers of rational singularities, generalizing the main result of our previous paper. Uniform bounds on families of morphisms are given as well. Moreover, as a key analytic step, we also prove the following result in motivic integration; if \fQp:Qpn→C\p∈primes is a collection of functions which is motivic in the sense of Denef-Pas, and fQp is L1 for any p large enough, then in fact there exists ε>0 such that fQp is L1+ε for any p large enough.