Diophantine property in the group of affine transformations of the line
Abstract
We investigate the Diophantine property of a pair of elements in the group of affine transformations of the line. We say that a pair of elements g1,g2 in this group is Diophantine if there is a number A such that a product of length l of elements of the set g1,g2,g1-1,g2-1 is either the unit element or of distance at least A-l from the unit element. We prove that the set of non-Diophantine pairs in a certain one parameter family is of Hausdorff dimension 0.
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