On Katz's (A,B)-exponential sums

Abstract

We deduce Katz's theorems for (A,B)-exponential sums over finite fields using -adic cohomology and a theorem of Denef-Loeser, removing the hypothesis that A+B is relatively prime to the characteristic p. In some degenerate cases, the Betti number estimate is improved using toric decomposition and Adolphson-Sperber's bound for the degree of L-functions. Applying the facial decomposition theorem in W1, we prove that the universal family of (A,B)-polynomials is generically ordinary for its L-function when p is in certain arithmetic progression.