On the rational approximation to p-adic Thue--Morse numbers

Abstract

Let p be a prime number and an irrational p-adic number. Its multiplicative irrationality exponent μ× () is the supremum of the real numbers μ× for which the inequality |b - a|p ≤ | a b |- μ× / 2 has infinitely many solutions in nonzero integers a, b. We show that μ× () can be expressed in terms of a new exponent of approximation attached to a sequence of rational numbers defined in terms of . We establish that μ× ( t, p) = 3, where t, p is the p-adic number 1 - p - p2 + p3 - p4 + …, whose sequence of digits is given by the Thue--Morse sequence over \-1, 1\.

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