B'

Abstract

Let n 2 be an integer and α1, …, αn be non-zero algebraic numbers. Let b1, … , bn be integers with bn = 0, and set B = \3, |b1|, … , |bn|\. For j =1, …, n, set h* (αj) = \h(αj), 1\, where h denotes the (logarithmic) Weil height. Assume that the quantity = b1 α1 + ·s + bn αn is nonzero. A typical lower bound of || given by Baker's theory of linear forms in logarithms takes the shape || - c(n, D) \, h* (α1) ·s h* (αn) B, where c(n,D) is positive, effectively computable and depends only on n and on the degree D of the field generated by α1, … , αn. However, in certain special cases and in particular when |bn| = 1, this bound can be improved to || - c(n, D) \, h* (α1) ·s h* (αn) Bh* (αn). The term B / h* (αn) in place of B originates in works of Feldman and Baker and is a key tool for improving, in an effective way, the upper bound for the irrationality exponent of a real algebraic number of degree at least 3 given by Liouville's theorem. We survey various applications of this refinement to exponents of approximation evaluated at algebraic numbers, to the S-part of some integer sequences, and to Diophantine equations. We conclude with some new results on arithmetical properties of convergents to real numbers.