State Complexity of Shifts of the Fibonacci Word

Abstract

The Fibonacci infinite word f = (fi)i ≥ 0 = 01001010·s is one of the most celebrated objects in combinatorics on words. There is a simple 5-state automaton that, given i in lsd-first Zeckendorf representation, computes its i'th term fi, and a 2-state automaton for msd-first. In this paper we consider the state complexity of the automaton generating the shifted sequence (fi+c)i ≥ 0, and show that it is O( c) for both msd-first and lsd-first input. This is close to the information-theoretic minimum for an aperiodic sequence. The techniques involve a mixture of state complexity techniques and Diophantine approximation.

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