Jacobsthal numbers in generalised Petersen graphs

Abstract

We prove that the number of 1-factorisations of a generalised Petersen graph of the type GP(3k,k) is equal to the kth Jacobsthal number J(k) if k is odd, and equal to 4J(k), when k is even. Moreover, we verify the list colouring conjecture for GP(3k,k).