On square factors and critical factors of k-bonacci words on infinite alphabet

Abstract

For any integer k>2, the infinite k-bonacci word W(k), on the infinite alphabet is defined as the fixed point of the morphism k:N→ N2 N, where equation* k(ki+j) = \ arrayll (ki)(ki+j+1) & if j = 0,·s ,k-2, (ki+j+1)& if j =k-1. array . equation* The finite k-bonacci word W(k)n is then defined as the prefix of W(k) whose length is the (n+k)-th k-bonacci number. We obtain the structure of all square factors occurring in W(k). Moreover, we prove that the critical exponent of W(k) is 3-32k-1. Finally, we provide all critical factors of W(k).