Iterated integrals, multiple zeta values and Selberg integrals
Number Theory
2023-02-24 v4
Abstract
Classical multiple zeta values can be viewed as iterated integrals of the differentials tdt,1−tdt from 0 to 1. In this paper, we reprove Brown's theorem: For ai,bi,cij∈Z, the iterated integral of the form 0<t1<⋯<tN<1∫⋯∫i∏tiai(1−ti)bii<j∏(tj−ti)cijdt1⋯dtN is a Q-linear combination of multiple zeta values of weight ≤N if convergent. What is more, we show that if pi(t),1≤i≤N, are in a Q[t,1/t,1/(1−t)]-algebra generated by multiple polylogarithms and their dual, and if qij(t),1≤i<j≤N, are in a Q[t,1/t]-algebra generated by logarithm, then the iterated integral 0<t1<⋯<tN<1∫⋯∫i∏pi(ti)i<j∏qij(tj−ti)dt1⋯dtN is a Q-linear combination of multiple zeta values. As an application of our main results, we show that the coefficients of the Taylor expansions of the Selberg integrals ∫⋯∫0<t1<⋯<tN<1fi∏tiαi(1−ti)βii<j∏(tj−ti)γijdt1⋯dtN (with respect to αi,βi,γij) at the integral points in some product of right half complex plane are Q-linear combinations of multiple zeta values for any f∈Q[ti,ti−1,(ti−tj)−1∣1≤i≤N,1≤i<j≤N]. This statement generalizes Terasoma's original result.
Cite
@article{arxiv.2007.00172,
title = {Iterated integrals, multiple zeta values and Selberg integrals},
author = {Jiangtao Li},
journal= {arXiv preprint arXiv:2007.00172},
year = {2023}
}
Comments
15 pages