Sums of infinite series involving the Dirichlet lambda function
Abstract
The Dirichlet lambda function λ(s) is defined for Re(s) > 1 by \[ λ(s) = Σn=0∞ 1(2n+1)s. \] This function was initially studied by Euler on the real line, where he denoted it by N(s). In this paper, by applying the partial fraction decomposition of π (π x) and explicit evaluations of the integrals \[ ∫012 x2m-1 (2lπ x) dx and ∫012 xm-1 (π x) dx, \] for positive integers l and m, we derive closed-form expressions for several classes of infinite series involving λ(s). We also demonstrate that the values λ(k) for even integers k ≥ 2 arise as constant terms in the Fourier expansions of Eisenstein series associated with the congruence subgroup \[ 0(2) := \ pmatrix a & b c & d pmatrix ∈ SL2(Z) : c 0 2 \. \]
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