A Tauberian Theorem for -adic Sheaves on A1

Abstract

Let K∈ L1( R) and let f∈ L∞( R) be two functions on R. The convolution (K f)(x)=∫ RK(x-y)f(y)dy can be considered as an average of f with weight defined by K. Wiener's Tauberian theorem says that under suitable conditions, if x ∞(K f)(x)=x ∞ (K A)(x) for some constant A, then x ∞f(x)=A. We prove the following -adic analogue of this theorem: Suppose K,F, G are perverse -adic sheaves on the affine line A over an algebraically closed field of characteristic p (p=). Under suitable conditions, if (K F)|η∞ (K G)|η∞, then F|η∞ G|η∞, where η∞ is the spectrum of the local field of A at ∞.