Q-analogues of the Fibo-Stirling numbers

Abstract

Let Fn denote the nth Fibonacci number relative to the initial conditions F0=0 and F1=1. Bach, Paudyal, and Remmel introduced Fibonacci analogues of the Stirling numbers called Fibo-Stirling numbers of the first and second kind. These numbers serve as the connection coefficients between the Fibo-falling factorial basis \(x)_F,n:n ≥ 0\ and the Fibo-rising factorial basis \(x)_F,n:n ≥ 0\ which are defined by (x)_F,0 = (x)_F,0 = 1 and for k ≥ 1, (x)_F,k = x(x-F1) ·s (x-Fk-1) and (x)_F,k = x(x+F1) ·s (x+Fk-1). We gave a general rook theory model which allowed us to give combinatorial interpretations of the Fibo-Stirling numbers of the first and second kind. There are two natural q-analogues of the falling and rising Fibo-factorial basis. That is, let [x]q = qx-1q-1. Then we let [x]_q,F,0 = [x]_q,F,0 = [x]_q,F,0 = [x]_q,F,0=1 and, for k > 0, we let [x]_q,F,k = [x]q [x-F1]q ·s [x-Fk-1]q, [x]_q,F,k= [x]q ([x]q-[F1]q) ·s ([x]q-[Fk-1]q), [x]_q,F,k= [x]q [x+F1]q ·s [x+Fk-1]q, and [x]_q,F,k= [x]q ([x]q+[F1]q) ·s ([x]q+[Fk-1]q). In this paper, we show we can modify the rook theory model of Bach, Paudyal, and Remmel to give combinatorial interpretations for the two different types q-analogues of the Fibo-Stirling numbers which arise as the connection coefficients between the two different q-analogues of the Fibonacci falling and rising factorial bases. abstract