Can polylogarithms at algebraic points be linearly independent?

Abstract

Let r,m be positive integers. Let 0 x <1 be a rational number. Let s(x,z) be the s-th Lerch function Σk=0∞zk+1(k+x+1)s with s=1,2,… ,r. When x=0, this is the polylogarithmic function. Let α1,… ,αm be pairwise distinct algebraic numbers with 0<|αj|<1 (1 j m). In this article, we state a linear independence criterion over algebraic number fields of all the rm+1 numbers : 1(x,α1),2(x,α1),…, r(x,α1),1(x,α2),2(x,α2),…, r(x,α2),…,1(x,αm),2(x,αm),…, r(x,αm) and 1. This is the first result that gives a sufficient condition for the linear independence of values of the r Lerch functions 1(x,z),2(x,z),…, r(x,z) at m distinct algebraic points without any assumption for r and m, even for the case x=0, the polylogarithms. We give an outline of our proof and explain basic idea.