Some divisibility properties of binomial and q-binomial coefficients

Abstract

We first prove that if a has a prime factor not dividing b then there are infinitely many positive integers n such that an+bn an is not divisible by bn+1. This confirms a recent conjecture of Z.-W. Sun. Moreover, we provide some new divisibility properties of binomial coefficients: for example, we prove that 12n 3n and 12n 4n are divisible by 6n-1, and that 330n 88n is divisible by 66n-1, for all positive integers n. As we show, the latter results are in fact consequences of divisibility and positivity results for quotients of q-binomial coefficients by q-integers, generalizing the positivity of q-Catalan numbers. We also put forward several related conjectures.