The exotic inverted Kloosterman sum

Abstract

Let B be a product of finitely many finite fields containing Fq, : Fq Q* a nontrivial additive character, and : B* Q* a multiplicative character. Katz introduced the so-called exotic inverted Kloosterman sum eqnarray* EIK( Fq, a):=Σx∈ B* \\ TrB/ Fq(x) =0\\ NB/ Fq(x)=a (x)(1TrB/ Fq(x)), \ \ a∈ Fq*. eqnarray* We estimate this sum using -adic cohomology theory. Our main result is that, up to a trivial term, the associated exotic inverted Kloosterman sheaf is lisse of rank at most 2(n+1) and mixed of weight at most n, where n+1 = FqB. Up to a trivial main term, this gives the expected square root cancellation.

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