On the forcing spectrum of generalized Petersen graphs P(n,2)

Abstract

The forcing number of a perfect matching M of a graph G is the smallest cardinality of subsets of M that are contained in no other perfect matchings of G. The forcing spectrum of G is the collection of forcing numbers of all perfect matchings of G. In this paper, we classify the perfect matchings of a generalized Petersen graph P(n,2) in two types, and show that the forcing spectrum is the union of two integer intervals. For n 34, it is [ n 12 +1, n+3 7 +δ (n)] [ n+2 6 , n 4 ], where δ (n)=1 if n 3 (mod 7), and δ (n)=0 otherwise.