On multisets, interpolated multiple zeta values and limit laws

Abstract

In this work we discuss a parameter σ on weighted k-element multisets of [n]= \1,… ,n\. The sums of weighted k-multisets are related to k-subsets, k-multisets, as well as special instances of truncated interpolated multiple zeta values. We study properties of this parameter using symbolic combinatorics. We rederive and extend certain identities for ζtn(\m\k). Moreover, we introduce random variables on the k-element multisets and derive their distributions, as well as limit laws for k or n tending to infinity.