The size of k-th order generalized Fibonacci cubes

Abstract

Let k≥2. Then the k-th order Fibonacci cube (k)n is the subgraph of the hypercube Qn induced by vertices without k consecutive 1s. The case k=2 corresponds to the classic Fibonacci cube n. There are three kinds of calculation formulas of the size of n: the iteration form |E(n)|=|E(n-1)|+|E(n-2)|+Fn (Hsu, 1993), %iteration form the convolution form |E(n)|=Σi=1nFiFn-i+1 (Klavzar, 2005) %convolution form and the linear form |E(n)|=nFn+1+2(n+1)Fn5 (Munarini et al., 2001). %linear form Belbachir and Ould-Mohamed (2020) studied the iteration and convolution formulas of the size of (3)n. Very recently, Mollard (2025) deduced the iteration formula of the size of (k)n for k≥2. In this paper, we give the the formulas of convolution and linear forms of |E((k)n)| for all k≥2. Specifically, we obtain the formula of |E((k)n)| in terms of convolved k-th order Fibonacci numbers and the formula of |E((k)n)| of linear expression of k consecutive k-th order Fibonacci numbers.