Connections between two classes of generalized Fibonacci numbers squared and permanents of (0,1) Toeplitz matrices

Abstract

By considering the tiling of an N-board (a linear array of N square cells of unit width) with new types of tile that we refer to as combs, we give a combinatorial interpretation of the product of two consecutive generalized Fibonacci numbers sn (where sn=Σi=1q vi sn-mi, s0=1, sn<0=0, where vi and mi are positive integers and m1<·s<mq) each raised to an arbitrary non-negative integer power. A (w,g;m)-comb is a tile composed of m rectangular sub-tiles of dimensions w×1 separated by gaps of width g. The interpretation is used to give combinatorial proof of new convolution-type identities relating sn2 for the cases q=2, vi=1, m1=M, m2=m+1 for M=0,m to the permanent of a (0,1) Toeplitz matrix with 3 nonzero diagonals which are -2, M-1, and m above the leading diagonal. When m=1 these identities reduce to ones connecting the Padovan and Narayana's cows numbers.