Growth rate for the expected value of a generalized random Fibonacci sequence

Abstract

A random Fibonacci sequence is defined by the relation gn = | gn-1 +/- gn-2 |, where the +/- sign is chosen by tossing a balanced coin for each n. We generalize these sequences to the case when the coin is unbalanced (denoting by p the probability of a +), and the recurrence relation is of the form gn = |λ gn-1 +/- gn-2 |. When λ >=2 and 0 < p <= 1, we prove that the expected value of gn grows exponentially fast. When λ = λk = 2 cos(π/k) for some fixed integer k>2, we show that the expected value of gn grows exponentially fast for p>(2-λk)/4 and give an algebraic expression for the growth rate. The involved methods extend (and correct) those introduced in a previous paper by the second author.