L-functions of Symmetric Products of the Kloosterman Sheaf over Z
Abstract
The classical n-variable Kloosterman sums over the finite field Fp give rise to a lisse Ql-sheaf Kln+1 on Gm, Fp= P1 Fp-\0,∞\, which we call the Kloosterman sheaf. Let Lp( Gm, Fp, Symk Kln+1, s) be the L-function of the k-fold symmetric product of Kln+1. We construct an explicit virtual scheme X of finite type over Spec Z such that the p-Euler factor of the zeta function of X coincides with Lp( Gm, Fp, Symk Kln+1, s). We also prove similar results for k Kln+1 and k Kln+1.
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