Maximal entries of elements in certain matrix monoids

Abstract

Let Lu=bmatrix1 & 0\ & 1bmatrix and Rv=bmatrix1 & v\\0 & 1bmatrix be matrices in SL2( Z) with u, v≥ 1. Since the monoid generated by Lu and Rv is free, we can associate a depth to each element based on its product representation. In the cases where u=v=2 and u=v=3, Bromberg, Shpilrain, and Vdovina determined the depth n matrices containing the maximal entry for each n≥ 1. By using ideas from our previous work on (u,v)-Calkin-Wilf trees, we extend their results for any u, v≥ 1 and in the process we recover the Fibonacci and some Lucas sequences. As a consequence we obtain bounds which guarantee collision resistance on a family of hashing functions based on Lu and Rv.