Matching preclusion for direct product of regular graphs

Abstract Let G be a graph with an even number of vertices. The matching preclusion number of G , denoted by m p ( G ) , is the minimum number of edges whose deletion leaves the resulting graph without a perfect matching. G is maximally matched if m p ( G ) is equal to the minimum degree of G and is super matched if every optimal matching preclusion set of G consists of edges incident to a single vertex. In this paper, we focus on matching preclusion for direct product of graphs. For any two graphs G and H , we denote their direct product by G × H and show m p ( G × H ) ⩾ m p ( G ) m p ( H ) , which implies that the direct product of two maximally matched graphs is also maximally matched. Furthermore, for any two regular graphs with at least three vertices, we show that if at least one of them is maximally matched, then their direct product is super matched, and as a consequence, their strong product is also super matched.

[1]  Eddie Cheng,et al.  Matching preclusion and Conditional Matching preclusion for Augmented Cubes , 2010, J. Interconnect. Networks.

[2]  Christos Faloutsos,et al.  Kronecker Graphs: An Approach to Modeling Networks , 2008, J. Mach. Learn. Res..

[3]  Marsha F. Foregger Hamiltonian decompositions of products of cycles , 1978, Discret. Math..

[4]  Bostjan Bresar,et al.  Edge-connectivity of strong products of graphs , 2007, Discuss. Math. Graph Theory.

[5]  Qiuli Li,et al.  Matching preclusion for cube-connected cycles , 2015, Discret. Appl. Math..

[6]  Heping Zhang,et al.  Matching preclusion for vertex-transitive networks , 2016, Discret. Appl. Math..

[7]  P. Paulraja,et al.  On some topological indices of the tensor products of graphs , 2012, Discret. Appl. Math..

[8]  Eddie Cheng,et al.  Matching preclusion and conditional matching preclusion problems for the folded Petersen cube , 2015, Theor. Comput. Sci..

[9]  Xianyue Li,et al.  Matching preclusion for balanced hypercubes , 2012, Theor. Comput. Sci..

[10]  Eddie Cheng,et al.  Matching preclusion and conditional matching preclusion for bipartite interconnection networks I: Sufficient conditions , 2012, Networks.

[11]  Eddie Cheng,et al.  Matching preclusion and conditional matching preclusion problems for tori and related Cartesian products , 2012, Discret. Appl. Math..

[12]  Simon Spacapan Connectivity of Strong Products of Graphs , 2010, Graphs Comb..

[13]  Heping Zhang,et al.  Matching preclusion and conditional edge-fault Hamiltonicity of binary de Bruijn graphs , 2017, Discret. Appl. Math..

[14]  Huiqing Liu,et al.  The (conditional) matching preclusion for burnt pancake graphs , 2013, Discret. Appl. Math..

[15]  Heping Zhang,et al.  Maximally matched and super matched regular graphs , 2016, Int. J. Comput. Math. Comput. Syst. Theory.

[16]  W. Imrich,et al.  Handbook of Product Graphs, Second Edition , 2011 .

[17]  Heping Zhang,et al.  Upper bounds on the bondage number of the strong product of a graph and a tree , 2018, Int. J. Comput. Math..

[18]  Jing Li,et al.  Matching preclusion for k-ary n-cubes , 2010, Discret. Appl. Math..

[19]  Simon Spacapan A characterization of the edge connectivity of direct products of graphs , 2013, Discret. Math..

[20]  Y. Diao,et al.  TUTTE POLYNOMIALS OF TENSOR PRODUCTS OF SIGNED GRAPHS AND THEIR APPLICATIONS IN KNOT THEORY , 2007, math/0702328.

[21]  Eddie Cheng,et al.  Matching preclusion and conditional matching preclusion for regular interconnection networks , 2012, Discret. Appl. Math..

[22]  Yves Métivier,et al.  Some Remarks on the Kronecker Product of Graphs , 1998, Inf. Process. Lett..