Mixed zeta functions and application to some lattice points problems
Abstract
We consider zeta functions: Z(f ;P ;s)=Σ ∈ n f(m1,..., mn) P(m1,..., mn)-s/d where P ∈ [X1,..., Xn] has degree d and f is a function arithmetic in origin, e.g. a multiplicative function. In this paper, I study the meromorphic continuation of such series beyond an a priori domain of absolute convergence when f and P satisfy properties one typically meets in applications. As a result, I prove an explicit asymptotic for a general class of lattice point problems subject to arithmetic constraints.
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