An explicit Baker type lower bound of exponential values

Abstract

Let I denote an imaginary quadratic field or the field Q of rational numbers and ZI its ring of intergers. We shall prove an explicit Baker type lower bound for ZI-linear form of the numbers equation1 1,\ eα1,...,\ eαm, m 2, equation where α0=0, α1,...,αm, are m+1 different numbers from the field I. Our work gives gives some improvements to the existing explicit versions of of Baker's work about exponential values at rational points. In particilar, dependences on m are improved.