On Minimal Critical Exponent of Balanced Sequences

We study the threshold between avoidable and unavoidable repetitions in infinite balanced sequences over finite alphabets. The conjecture stated by Rampersad, Shallit and Vandomme says that the minimal critical exponent of balanced sequences over the alphabet of size d greater than or equal to 5 equals (d-2)/(d-3) . This conjecture is known to hold for d in {5,6,7,8,9,10}. We refute this conjecture by showing that the picture is different for bigger alphabets. We prove that critical exponents of balanced sequences over an alphabet of size d greater than or equal to 11 are lower bounded by (d-1)/(d-2) and this bound is attained for all even numbers d greater than or equal to 12. According to this result, we conjecture that the least critical exponent of a balanced sequence over d letters is (d-1)/(d-2) for all d greater than or equal to 11