Greedy approximations by signed harmonic sums and the Thue--Morse sequence

Abstract

Given a real number τ, we study the approximation of τ by signed harmonic sums σN(τ) := Σn ≤ Nsn(τ)/n, where the sequence of signs (sN(τ))N ∈N is defined "greedily" by setting sN+1(τ) := +1 if σN(τ) ≤ τ, and sN+1(τ) := -1 otherwise. Precisely, we compute the limit points and the decay rate of the sequence (σN(τ)-τ)N ∈ N. Moreover, we give an accurate description of the behavior of the sequence of signs (sN(τ))N∈N, highlighting a surprising connection with the Thue--Morse sequence.