On k-abelian Equivalence and Generalized Lagrange Spectra

Abstract

We study the set of k-abelian critical exponents of all Sturmian words. It has been proven that in the case k = 1 this set coincides with the Lagrange spectrum. Thus the sets obtained when k > 1 can be viewed as generalized Lagrange spectra. We characterize these generalized spectra in terms of the usual Lagrange spectrum and prove that when k > 1 the spectrum is a dense non-closed set. This is in contrast with the case k = 1, where the spectrum is a closed set containing a discrete part and a half-line. We describe explicitly the least accumulation points of the generalized spectra. Our geometric approach allows the study of k-abelian powers in Sturmian words by means of continued fractions.