Do perfect powers repel partition numbers?

Abstract

In 2013 Zhi-Wei Sun conjectured that p(n) is never a power of an integer when n>1. We confirm this claim in many cases. We also observe that integral powers appear to repel the partition numbers. If k>1 and k(n) is the distance between p(n) and the nearest kth power, then for every d≥ 0 we conjecture that there are at most finitely many n for which k(n)≤ d. More precisely, for every >0, we conjecture that Mk(d):=\n \ : \ k(n)≤ d\=o( d). In k-power aspect with d fixed, we also conjecture that if k is sufficiently large, then Mk(d)= \ n \ : \ p(n)-1≤ d\. In other words, 1 generally appears to be the closest kth power among the partition numbers.