Linear independence of values of logarithms revisited

Abstract

Let m 2 be an integer, K an algebraic number field and α∈ K \0,-1\ with sufficiently small absolute value. In this article, we provide a new lower bound for linear form in 1,log(1+α),…,logm-1(1+α) with algebraic integer coefficients in both complex and p-adic cases (see Theorem 2.1 and Theorem 2.4). Especially, in the complex case, our result is a refinement of the result of Nesterenko-Waldschmidt on the lower bound of linear form in certain values of power of logarithms. The main integrant is based on Hermite-Mahler's Pad\'e approximation of exponential and logarithm functions.