A random approach to the multibonacci sequence

Abstract

This paper presents a random approach to the multibonacci sequence. We generalise the model introduced by Benjamin, Levin, Mahlburg, and Quinn, which is based on a random tiling method using dominoes and squares that leads to the Fibonacci sequence, and which was extended to the tribonacci case in a previous work by the authors. Our approach employs tiling with linear k-ominoes, k=1,…,s, combined with specific colouring, to generate a weighted multibonacci sequence. For a natural random variable~X defined by this model, we establish the distribution of X in terms of multibonacci numbers and compute E[X] = 2s+1-3.