The hierarchical product of graphs

A new operation on graphs is introduced and some of its properties are studied. We call it hierarchical product, because of the strong (connectedness) hierarchy of the vertices in the resulting graphs. In fact, the obtained graphs turn out to be subgraphs of the cartesian product of the corresponding factors. Some well-known properties of the cartesian product, such as reduced mean distance and diameter, simple routing algorithms and some optimal communication protocols are inherited by the hierarchical product. We also address the study of some algebraic properties of the hierarchical product of two or more graphs. In particular, the spectrum of the binary hypertree T"m (which is the hierarchical product of several copies of the complete graph on two vertices) is fully characterized; turning out to be an interesting example of graph with all its eigenvalues distinct. Finally, some natural generalizations of the hierarchic product are proposed.

[1]  Jae Dong Noh,et al.  Exact scaling properties of a hierarchical network model. , 2002, Physical review. E, Statistical, nonlinear, and soft matter physics.

[2]  Gordon F. Royle,et al.  Algebraic Graph Theory , 2001, Graduate texts in mathematics.

[3]  Pierre Fraigniaud,et al.  Methods and problems of communication in usual networks , 1994, Discret. Appl. Math..

[4]  D. Cvetkovic,et al.  Spectra of Graphs: Theory and Applications , 1997 .

[5]  Albert-László Barabási,et al.  Hierarchical organization in complex networks. , 2003, Physical review. E, Statistical, nonlinear, and soft matter physics.

[6]  Chris D. Godsil,et al.  ALGEBRAIC COMBINATORICS , 2013 .

[7]  Miguel Angel Fiol,et al.  The local spectra of regular line graphs , 2010, Discret. Math..

[8]  M. H. Schultz,et al.  Topological properties of hypercubes , 1988, IEEE Trans. Computers.

[9]  Mark E. J. Newman,et al.  The Structure and Function of Complex Networks , 2003, SIAM Rev..

[10]  A. Schwenk COMPUTING THE CHARACTERISTIC POLYNOMIAL OF A GRAPH. , 1974 .

[11]  J. Silvester Determinants of block matrices , 2000, The Mathematical Gazette.

[12]  B. Kahng,et al.  Geometric fractal growth model for scale-free networks. , 2001, Physical review. E, Statistical, nonlinear, and soft matter physics.

[13]  A. Barabasi,et al.  Hierarchical Organization of Modularity in Metabolic Networks , 2002, Science.

[14]  Michael Doob,et al.  Spectra of graphs , 1980 .

[15]  Willem H. Haemers,et al.  Spectra of Graphs , 2011 .

[16]  Lali Barrière,et al.  The generalized hierarchical product of graphs , 2009, Discret. Math..