Two q-analogues of Euler's formula ζ(2)=π2/6
Abstract
It is well known that ζ(2)=π2/6 as discovered by Euler. In this paper we present the following two q-analogues of this celebrated formula: Σk=0∞qk(1+q2k+1)(1-q2k+1)2=Πn=1∞(1-q2n)4(1-q2n-1)4 and Σk=0∞q2k-(-1)kk/2(1-q2k+1)2 =Πn=1∞(1-q2n)2(1-q4n)2(1-q2n-1)2(1-q4n-2)2, where q is any complex number with |q|<1. We also give a q-analogue of the identity ζ(4)=π4/90, and pose a problem on q-analogues of Euler's formula for ζ(2m)\ (m=3,4,…).
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