On Disjoint hypercubes in Fibonacci cubes

Abstract

The Fibonacci cube of dimension n, denoted as \n, is the subgraph of n-cube Q\n induced by vertices with no consecutive 1's. We study the maximum number of disjoint subgraphs in \n isomorphic to Q\k, and denote this number by q\k(n). We prove several recursive results for q\k(n), in particular we prove that q\k(n) = q\k-1(n-2) + q\k(n-3). We also prove a closed formula in which q\k(n) is given in terms of Fibonacci numbers, and finally we give the generating function for the sequence \q\k(n)\\n=0 ∞.