Some new examples of summation of divergent series from the viewpoint of distributions

Abstract

Let \a1, a2,…, an,…\ be a sequence of complex numbers which has at most polynomial growth and satisfies an extra assumption. In this paper, inspired by a recent work of Sasane, we give an explanation of the sum a1+2a2+3a3+·s+nan+·s, and more generally, for any k∈N, the sum 1ka1+2ka2+3ka3+·s+nkan+·s, from the viewpoint of distributions. As applications, we explain the following summation formulas equation* aligned 1k-2k+3k-·s&=-Ek(0)2, \\ 1k+2k+3k+·s&=-Bk+1k+1, \\ ε11k+ε22k+ε33k+·s&=-Bk+1(ε)k+1, aligned equation* where Ek(0), Bk and Bk(ε) are the Euler polynomials at 0, the Bernoulli numbers and the Apostol--Bernoulli numbers, respectively.