Mathematics – Number Theory
Scientific paper
2010-08-19
Int. J. Number Theory 7 (2011), 1959-1976
Mathematics
Number Theory
14 pages, to appear in Int. J. Number Theory
Scientific paper
10.1142/S1793042111004812
We study divisibility properties of certain sums and alternating sums involving binomial coefficients and powers of integers. For example, we prove that for all positive integers $n_1,..., n_m$, $n_{m+1}=n_1$, and any nonnegative integer $r$, there holds {align*} \sum_{k=0}^{n_1}\epsilon^k (2k+1)^{2r+1}\prod_{i=1}^{m} {n_i+n_{i+1}+1\choose n_i-k} \equiv 0 \mod (n_1+n_m+1){n_1+n_m\choose n_1}, {align*} and conjecture that for any nonnegative integer $r$ and positive integer $s$ such that $r+s$ is odd, $$ \sum_{k=0}^{n}\epsilon ^k (2k+1)^{r}({2n\choose n-k}-{2n\choose n-k-1})^{s} \equiv 0 \mod{{2n\choose n}}, $$ where $\epsilon=\pm 1$.
Guo Victor J. W.
Zeng Jiang
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