Normally Regular Digraphs

A normally regular digraph with parameters $(v,k,\lambda,\mu)$ is a directed graph on $v$ vertices whose adjacency matrix $A$ satisfies the equation $AA^t=k I+\lambda (A+A^t)+\mu(J-I-A-A^t)$. This means that every vertex has out-degree $k$, a pair of non-adjacent vertices have $\mu$ common out-neighbours, a pair of vertices connected by an edge in one direction have $\lambda$ common out-neighbours and a pair of vertices connected by edges in both directions have $2\lambda-\mu$ common out-neighbours. We often assume that two vertices can not be connected in both directions. We prove that the adjacency matrix of a normally regular digraph is normal. A connected $k$-regular digraph with normal adjacency matrix is a normally regular digraph if and only if all eigenvalues other than $k$ are on one circle in the complex plane. We prove several non-existence results, structural characterizations, and constructions of normally regular digraphs. In many cases these graphs are Cayley graphs of abelian groups and the construction is then based on a generalization of difference sets. We also show connections to other combinatorial objects: strongly regular graphs, symmetric 2-designs and association schemes.

[1]  Leif K. Jørgensen,et al.  Non-existence of Directed Strongly regular Graphs , 2003, Discret. Math..

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

[3]  Shirley Dex,et al.  JR 旅客販売総合システム(マルス)における運用及び管理について , 1991 .

[4]  R. W. Goldbach,et al.  The Structure of Imprimitive Non-symmetric 3-Class Association Schemes , 1996, Eur. J. Comb..

[5]  Dieter Jungnickel,et al.  Two infinite families of failed symmetric designs , 2003, Discret. Math..

[6]  R. W. Goldbach,et al.  A Primitive Non-symmetric 3-Class Association Scheme on 36 Elements with p111 = 0 Exists and is Unique , 1994, Eur. J. Comb..

[7]  Robert A. Liebler,et al.  Certain distance-regular digraphs and related rings of characteristic 4 , 1988, J. Comb. Theory, Ser. A.

[8]  Peter Rowlinson On 4-Cycles and 5-Cycles in Regular Tournaments , 1986 .

[9]  Hanfried Lenz,et al.  Design theory , 1985 .

[10]  K. B. Reid,et al.  Doubly Regular Tournaments are Equivalent to Skew Hadamard Matrices , 1972, J. Comb. Theory, Ser. A.

[11]  Edward Spence,et al.  A Family of Difference Sets , 1977, J. Comb. Theory, Ser. A.

[12]  Leif K. Jørgensen,et al.  Normally Regular Digraphs, Association Schemes and Related combinatorial Structures , 2014 .

[13]  J. Singer A theorem in finite projective geometry and some applications to number theory , 1938 .

[14]  Hadi Kharaghani,et al.  Doubly regular digraphs and symmetric designs , 2003, J. Comb. Theory, Ser. A.

[15]  Yan-Quan Feng,et al.  Deza digraphs , 2006, Eur. J. Comb..

[16]  Noboru Ito,et al.  Automorphism groups of DRADs , 1989 .

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

[18]  Charles Delorme,et al.  On bipartite graphs of diameter 3 and defect 2 , 2009, J. Graph Theory.

[19]  R. W. Goldbach,et al.  Feasibility conditions for non-symmetric 3-class association schemes , 1996, Discret. Math..

[20]  Siu Lun Ma,et al.  A survey of partial difference sets , 1994, Des. Codes Cryptogr..

[21]  R. M. Damerell Distance-transitive and distance-regular digraphs , 1981, J. Comb. Theory, Ser. B.

[22]  Noboru Ito Doubly regular asymmetric digraphs , 1988, Discret. Math..

[23]  F. C. Piper COMBINATORIAL THEORY (second edition) (Wiley‐Interscience Series in Discrete Mathematics) , 1987 .

[24]  Leif K. Jørgensen,et al.  Schur rings and non-symmetric association schemes on 64 vertices , 2010, Discret. Math..

[25]  On Hadamard tournaments , 1990 .

[26]  Noboru Ito On spectra of doubly regular asymmetric digraphs ofRH-type , 1989, Graphs Comb..

[27]  Noboru Ito,et al.  Doubly regular asymmetric digraphs with rank 5 automorphism groups , 1989 .

[28]  Alex Pogel,et al.  Ordinary graphs and subplane partitions , 2004, Discret. Math..

[29]  Leif K. Jørgensen,et al.  Algorithmic Approach to Non-symmetric 3-class Association Schemes , 2009, Algorithmic Algebraic Combinatorics and Gröbner Bases.

[30]  Kaishun Wang,et al.  Four-class skew-symmetric association schemes , 2011, J. Comb. Theory, Ser. A.