Figurate numbers and sums of powers of integers

Abstract

Recently, Marko and Litvinov (ML) conjectured that, for all positive integers n and p, the p-th power of n admits the representation np = Σ =0p-1 (-1)l cp, Fnp-, where Fnp- is the n-th hyper-tetrahedron number of dimension p- and cp, denotes the number of (p -)-dimensional facets formed by cutting the p-dimensional cube 0 ≤ x1, x2, …, xp ≤ n-1. In this paper we show that the ML conjecture is true for every natural number p. Our proof relies on the fact that the validity of the ML conjecture necessarily implies that cp, = (p-)! S(p, p-), where S(p,p-) are the Stirling numbers of the second kind. Furthermore, we provide a number of equivalent formulas expressing the sum of powers Σi=1n ip as a linear combination of figurate numbers.