Evaluating lattice sums via telescoping on SL+(2, Z): a short proof of Σ 1|x|2|y|2|x+y|2=π4 and Zagier's identity

Abstract

We study lattice sums Σ 1(\|x\|\|y\|\|x+y\|)s taken over SL+(2, Z), i.e.\ the set of pairs (x,y) of primitive lattice vectors in Z≥ 02 with (x, y) = 1. We prove convergence of these and similar (determinant weighted) sums and introduce a new telescoping method on SL+(2, Z) that yields, in particular, Σ(x,y)∈ SL+(2, Z) 1\|x\|2\,\|y\|2\,\|x+y\|2=π4, and a short proof of Zagier's identity D1,1,1=2E(z,3)+π3ζ(3).

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