Proof of a conjecture involving Sun polynomials

Abstract

The Sun polynomials gn(x) are defined by align* gn(x)=Σk=0nn k22k kxk. align* We prove that, for any positive integer n, there hold align* &1nΣk=0n-1(4k+3)gk(x) ∈Z[x],\\ &Σk=0n-1(8k2+12k+5)gk(-1) 0n. align* The first one confirms a recent conjecture of Z.-W. Sun, while the second one partially answers another conjecture of Z.-W. Sun. We give three different proofs of the former. One of them depends on the following congruence: m+n-2 m-1n m2n n 0m+n m,n≥slant 1.