Laizhong Song, Xinhua Xiong
Published 2010-03-02, updated 2010-04-27Version 3
Let $a(n)$ defined by $\sum_{n=1}^{\infty}a(n)q^n := \prod_{n=1}^{\infty}\frac{1}{(1-q^{3n})(1-q^n)^3}.$ In this note, we prove that for every non-negative integer $n$, a(15n+6) \equiv 0\pmod{5}, a(15n+12) \equiv 0\pmod{5}. As a corollary, we obtained some results of Ono
Congruences involving $\binom{2k}k^2\binom{4k}{2k}m^{-k}$
Congruences involving $\binom{4k}{2k}$ and $\binom{3k}k$
Congruences involving generalized central trinomial coefficients
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