Some congruences involving central q-binomial coefficients

Abstract

Motivated by recent works of Sun and Tauraso, we prove some variations on the Green-Krammer identity involving central q-binomial coefficients, such as Σk=0n-1(-1)kq-k+1 22k kq (n5) q- n4/5 n(q), where (np) is the Legendre symbol and n(q) is the nth cyclotomic polynomial. As consequences, we deduce that Σk=03a m-1 qk2k kq & 0 (1-q3a)/(1-q), Σk=05a m-1(-1)kq-k+1 22k kq & 0 (1-q5a)/(1-q), for a,m≥ 1, the first one being a partial q-analogue of the Strauss-Shallit-Zagier congruence modulo powers of 3. Several related conjectures are proposed.