Divisibility of some binomial sums
arXiv:1808.03213
Abstract
With help of $q$-congruence, we prove the divisibility of some binomial sums. For example, for any integers $Ï,n\geq 2$, $$\sum_{k=0}^{n-1}(4k+1) \binom{2k}{k}^Ï\cdot (-4)^{Ï(n-1-k)} \equiv 0\pmod{2^{Ï-2}n\binom{2n}{n}}.$$
This is a very preliminary, which maybe contains some minor mistakes