Generating function identities for ζ(2n+2), ζ(2n+3) via the WZ method

Abstract

Using the WZ method we present simpler proofs of Koecher's, Leshchiner's and Bailey-Borwein-Bradley's identities for generating functions of the sequences \ζ(2n+2)\n 0, \ζ(2n+3)\n 0. By the same method we give several new representations for these generating functions yielding faster convergent series for values of the Riemann zeta function.