Di-Forcing Polynomials for Cyclic Ladder Graphs CL n

The cyclic ladder graph C L n is the Cartesian product of cycles C n and paths P 2 , that is C L n = C n × P 2 , ( n ≥ 3 ) . The di-forcing polynomial of C L n is a binary enumerative polynomial of all perfect matching forcing and anti-forcing numbers. In this paper, we derive recursive formulas for the di-forcing polynomial of cyclic ladder graph C L n by classifying and counting the matching cases of the associated edges of a given vertex, from which we obtain the number of perfect matching, the forcing and anti-forcing polynomials, and the generating function and by computing some di-forcing polynomials of the lower order C L n .