Strings from linear recurrences and permutations: a Gray code

Abstract

Each positive increasing integer sequence \an\n≥ 0 can serve as a numeration system to represent each non-negative integer by means of suitable coefficient strings. We analyse the case of k-generalized Fibonacci sequences leading to the binary strings avoiding 1k. We prove a bijection between the set %Fn(k) of strings of length n and the set of permutations of Sn+1(321,312,23…(k+1)1). Finally, basing on a known Gray code for those strings, we define a Gray code for Sn+1(321,312,23…(k+1)1), where two consecutive permutations differ by an adjacent transposition.