Proof of Sun's conjectures on hyperbolic cosine series via the Eisenstein--Lambert method
Abstract
We prove two conjectures of Zhi-Wei Sun concerning hyperbolic cosine Lambert series. The first one is the evaluation, for integers m≥ 0, of \[ Sm=Σn=1∞( n2m(πn)-1 -(22m+1-(-1)m(m+1)/22m+1+4)n2m(2πn)-1 +22m+2n2m(4πn)-1 ). \] We prove that \[ S0=112, S1=12π2, Sm=0 (m>1). \] The second one is the quadratic identity \[ Σn=1∞ ( 4((πn)-1)2 -55((2πn)-1)2 +16((4πn)-1)2 ) = 77-234/π72. \] The proof uses an elementary level-four identity for Lambert series and its consequences for Eisenstein series. After differentiating this identity and evaluating it at i/2, the first conjecture follows from the modular transformation law for E2m, with the cases m=0 and m=1 treated separately by the quasimodular transformation law for E2. The second conjecture follows by rewriting the corresponding squared-kernel series as (E4+10E2-11)/360 and evaluating only the resulting linear combinations of E2 and E4 at i/2, i, and 2i.
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