Constructions of cospectral graphs with different zero forcing numbers

Several researchers have recently explored various graph parameters that can or cannot be characterized by the spectrum of a matrix associated with a graph. In this paper we show that several NP-hard zero forcing numbers are not characterized by the spectra of several types of associated matrices with a graph. In particular, we consider standard zero forcing, positive semidefinite zero forcing, and skew zero forcing, and provide constructions of infinite families of pairs of cospectral graphs which have different values for these numbers. We explore several methods for obtaining these cospectral graphs including using graph products, graph joins, and graph switching. Among these, we provide a construction involving regular adjacency-cospectral graphs; the regularity of this construction also implies cospectrality with respect to several other matrices including the Laplacian, signless Laplacian, and normalized Laplacian. We also provide a construction where pairs of cospectral graphs can have an arbitrarily large difference between their zero forcing numbers.

[1]  Gorjan Alagic,et al.  #p , 2019, Quantum information & computation.

[2]  Willem H. Haemers,et al.  On NP-hard graph properties characterized by the spectrum , 2020, Discret. Appl. Math..

[3]  Willem H. Haemers,et al.  Distance regularity and the spectrum of graphs , 1996 .

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

[5]  Fatemeh Alinaghipour Taklimi Zero Forcing Sets for Graphs , 2013, 1311.7672.

[6]  Michael William Newman,et al.  The Laplacian spectrum of graphs , 2001 .

[7]  Willem H. Haemers,et al.  Cospectral regular graphs with and without a perfect matching , 2015, Discret. Math..

[9]  Willem H. Haemers,et al.  Graphs cospectral with distance-regular graphs , 1995 .

[10]  Ashkan Aazami,et al.  Hardness results and approximation algorithms for some problems on graphs , 2008 .

[11]  Aida Abiad,et al.  On the Wiener index, distance cospectrality and transmission-regular graphs , 2017, Discret. Appl. Math..

[12]  Ashkan Aazami,et al.  Domination in graphs with bounded propagation: algorithms, formulations and hardness results , 2008, J. Comb. Optim..

[13]  Shaun M. Fallat,et al.  Zero forcing parameters and minimum rank problems , 2010, 1003.2028.

[14]  Willem H. Haemers Cospectral Pairs of Regular Graphs with Different Connectivity , 2020, Discuss. Math. Graph Theory.

[15]  Benny Sudakov,et al.  The Zero Forcing Number of Graphs , 2017, SIAM J. Discret. Math..

[16]  P. Alam,et al.  H , 1887, High Explosives, Propellants, Pyrotechnics.

[17]  W. Haemers,et al.  Which graphs are determined by their spectrum , 2003 .

[18]  이화영 X , 1960, Chinese Plants Names Index 2000-2009.

[19]  Kate J. Lorenzen,et al.  Graphs that are cospectral for the distance Laplacian , 2018, 1812.05734.

[20]  Brendan D. McKay,et al.  Practical graph isomorphism, II , 2013, J. Symb. Comput..

[21]  B. McKay,et al.  Constructing cospectral graphs , 1982 .

[22]  Boting Yang,et al.  On the Complexity of the Positive Semidefinite Zero Forcing Number , 2014 .

[23]  Hong-Jian Lai,et al.  Generalized cospectral graphs with and without Hamiltonian cycles , 2020 .

[24]  Boris Brimkov,et al.  An exact algorithm for the minimum rank of a graph , 2019, 1912.00158.