Pascal Triangle and Restricted Words

Abstract

We continue to investigate combinatorial properties of functions fm and cm considered in our previous papers. They depend on an initial arithmetic function f0. In this paper, the values of f0 are the binomial coefficients. We first consider the case when the values of f0 are the binomial coefficients from a row of the Pascal triangle. The values of f0 consider next are the binomial coefficients from a diagonal of the Pascal triangle. In two final cases, the values of f0 are the central binomial coefficients and its adjacent neighbors. In each case, we derive an explicit formula for c1(n,k) and give its interpretation in terms of restricted words. In the first two cases, we also consider the functions fm and cm, for (m>0).