On Orthogonal Double Covers of Graphs

A transformation which allows us to obtain an orthogonal double cover of a graph G from any permutation of the edge set of G is described. This transformation is used together with existence results for self-orthogonal latin squares, to give a simple proof of a conjecture of Chung and West.     

Distance-Regular Graphs with Strongly Regular Subconstituents

In [3] Cameron et al. classified strongly regular graphs with strongly regular subconstituents. Here we prove a theorem which implies that distance-regular graphs with strongly regular subconstituents are precisely the Taylor graphs and graphs with a ₁ = 0 and a _i {0,1} for i = 2,...,d.     

Distance-Regular Graphs of Valency 6 and a1 = 1

We give a complete classification of distance-regular graphs of valency 6 and a₁ = 1.     

Antipodal distance-regular graphs of diameter four and five

An antipodal distance-regular graph of diameter four or five is a covering graph of a connected strongly regular graph. We give existence conditions for these graphs and show for some types of strongly regular graphs that no nontrivial covers exist. © 1999 John Wiley & Sons, Inc. J Combin Designs 7: 69–77, 1999     

On Distance-Regular Graphs with Height Two

Let be a distance-regular graph with diameter at least three and height h = 2, where . Suppose that for every in and in _d(), the induced subgraph on _d() ₂() is a clique. Then is isomorphic to the Johnson graph J(8, 3).     

A Characterization of Distance-Regular Graphs with Diameter Three

We characterize the distance-regular graphs with diameter three by giving an expression for the number of vertices at distance two from each given vertex, in terms of the spectrum of the graph.     

On Distance-Regular Graphs with Height Two, II

Let be a distance-regular graph with diameter and height , where . Suppose that for every in and every in , the induced subgraph on is isomorphic to a complete multipartite graph with . Then and is isomorphic to the Johnson graph .     

On Subgraphs in Distance-Regular Graphs

Terwilliger [15] has given the diameter bound d (s – 1)(k – 1) + 1 for distance-regular graphs with girth 2s and valency k. We show that the only distance-regular graphs with even girth which reach this bound are the hypercubes and the doubled Odd graphs. Also we improve this bound for bipartite distance-regular graphs. Weichsel [17] conjectures that the only distance-regular subgraphs of a hypercube are the even polygons, the hypercubes and the doubled Odd graphs and proves this in the case of girth 4. We show that the only distance-regular subgraphs of a hypercube with girth 6 are the doubled Odd graphs. If the girth is equal to 8, then its valency is at most 12.     

Taut Distance-Regular Graphs of Odd Diameter

Let denote a bipartite distance-regular graph with diameter D 4, valency k 3, and distinct eigenvalues ₀ > ₁ > ··· > _D. Let M denote the Bose-Mesner algebra of . For 0 i D, let E _i denote the primitive idempotent of M associated with _i . We refer to E ₀ and E _D as the trivial idempotents of M. Let E, F denote primitive idempotents of M. We say the pair E, F is taut whenever (i) E, F are nontrivial, and (ii) the entry-wise product E F is a linear combination of two distinct primitive idempotents of M. We show the pair E, F is taut if and only if there exist real scalars , such that _{i + 1 i + 1} – _{i – 1 i – 1} = _i ( _{i + 1} – _{i – 1}) + _i ( _{i + 1} – _{i – 1}) + (1 i D – 1)where ₀, ₁, ..., _D and ₀, ₁, ..., _D denote the cosine sequences of E, F, respectively. We define to be taut whenever has at least one taut pair of primitive idempotents but is not 2-homogeneous in the sense of Nomura and Curtin. Assume is taut and D is odd, and assume the pair E, F is taut. We show

On Orthogonal Double Covers of Graphs

An orthogonal double cover (ODC) is a collection of n spanning subgraphs(pages) of the complete graph K _n such that they cover every edge of the completegraph twice and the intersection of any two of them contains exactly one edge. If all the pages are isomorphic tosome graph G, we speak of an ODC by G. ODCs have been studied for almost 25 years, and existenceresults have been derived for many graph classes. We present an overview of the current state of research alongwith some new results and generalizations. As will be obvious, progress made in the last 10 years is in many waysrelated to the work of Ron Mullin. So it is natural and with pleasure that we dedicate this article to Ron, on theoccasion of his 65th birthday.     

Orthogonal Double Covers of Complete Graphs by Caterpillars of Diameter 5

An orthogonal double cover (ODC) of the complete graph K_n by a graph G is a collection = {G_i|i = 1,2, . . . ,n} of spanning subgraphs of K_n, all isomorphic to G, with the property that every edge of K_n belongs to exactly two members of and any two distinct members of share exactly one edge. A caterpillar of diameter five is a tree arising from a path with six vertices by attaching pendant vertices to some or each of its vertices of degree two. We show that for any caterpillar of diameter five there exists an ODC of the complete graph K_n.     

Distance-Regular Graphs Related to the Quantum Enveloping Algebra of sl(2)

We investigate a connection between distance-regular graphs and U _q(sl(2)), the quantum universal enveloping algebra of the Lie algebra sl(2). Let be a distance-regular graph with diameter d 3 and valency k 3, and assume is not isomorphic to the d-cube. Fix a vertex x of , and let (x) denote the Terwilliger algebra of with respect to x. Fix any complex number q {0, 1, –1}. Then is generated by certain matrices satisfying the defining relations of U _q(sl(2)) if and only if is bipartite and 2-homogeneous.     

Spectra of Extended Double Cover Graphs

The construction of the extended double cover was introduced by N. Alon [1] in 1986. For a simple graph G with vertex set V = {v ₁, v ₂, ..., v _n }, the extended double cover of G, denoted G ^*, is the bipartite graph with bipartition (X, Y) where X = {x ₁, x ₂, ..., x _n } and Y = {y ₁, y ₂, ..., y _n }, in which x _i and y _j are adjacent iff i = j or v _i and v _j are adjacent in G.In this paper we obtain formulas for the characteristic polynomial and the spectrum of G ^* in terms of the corresponding information of G. Three formulas are derived for the number of spanning trees in G ^* for a connected regular graph G. We show that while the extended double covers of cospectral graphs are cospectral, the converse does not hold. Some results on the spectra of the nth iterared double cover are also presented.     

Constructions of Quad-Rooted Double Covers

A collection of spanning subgraphs of K_n is called an orthogonal double cover if (i) every edge of K_n belongs to exactly two of the G_is and (ii) any two distinct G_is intersect in exactly one edge. Chung and West [3] conjectured that there exists an orthogonal double cover of K_n for all n, in which each G_i has maximum degree 2, and proved this result for n in six of the residue classes modulo 12. In [6], Gronau, Mullin and Schellenberg solved the conjecture. In addition to solving the conjecture, they went on to consider a problem for n 5 mod 6 such that each spanning subgraph G_i consists of the vertex-disjoint union of an isolated vertex, a quadrilateral, and triangles. They proved that for any n 2 mod 3 and n {8, 11, 38, 41, 44, 47, 50, 53, 59, 62, 71, 83, 86, 89, 95, 101, 107, 113, 122, 131, 143, 146, 149, 158, 164, 167, 173, 176, 179, 218, 242, 248, 287}, there exists a quad-rooted double cover of order n. In this note, we improve their result by showing that such designs exist for any n 2 mod 3 and n {8, 11, 38, 41, 44, 50, 53, 62, 71}.     

近三角剖分图的均衡二重少圈覆盖

近三角剖分图是一连通平面图，其内面均为三角形而其外面可能不是．令Ｇ为一具有ｎ个节点的近三角剖分图，Ｃ为 Ｇ的一个小圈二重覆盖（ＳＣＤＣ）^［２］．令(?)则Ｃ₀。称为Ｇ的均衡小圈二重覆盖．本文将证明：若Ｇ为外平面图，则 δ（Ｃ₀）≤ ２；否则δ（Ｃ₀）≤４。     

具有较小直径的三类图的对极色数

对一个连通图G,令d(u,v)表示G中两个顶点间u和v之间的距离,d表示G的直径.G的一个对极染色指的是从G的顶点集到正整数集(颜色集)的一个映射c,使得对G的任意两个不同的顶点u和v满足d(u,v)+|c(u)-c(v)|≥d.由c映射到G的顶点的最大颜色称为c的值,记作ac(c),而对G的所有对极染色c,ac(c)的最小值称为G的对极色数,记作ac(G).本文确定了轮图、齿轮图以及双星图三类图的对极色数,这些图都具有较小的直径d.     

具有广义可行性余弦序列的E1(。)Ed型距离正则图

给出了具有广义可行性余弦序列的E1(?)Ed型距离正则图的特征,并计算了这类图的交叉数.     

On the p-Ranks of the Adjacency Matrices of Distance-Regular Graphs

Let be a distance-regular graph with adjacency matrix A. Let I be the identity matrix and J the all-1 matrix. Let p be a prime. We study the p-rank of the matrices A + bJ – cI for integral b, c and the p-rank of corresponding matrices of graphs cospectral with .Using the minimal polynomial of A and the theory of Smith normal forms we first determine which p-ranks of A follow directly from the spectrum and which, in general, do not. For the p-ranks that are not determined by the spectrum (the so-called relevant p-ranks) of A the actual structure of the graph can play a rôle, which means that these p-ranks can be used to distinguish between cospectral graphs.We study the relevant p-ranks for some classes of distance-regular graphs and try to characterize distance-regular graphs by their spectrum and some relevant p-rank.     

Covers of Point-Hyperplane Graphs

A cover of the non-incident point-hyperplane graph of projective dimension 3 for fields of characteristic 2 is constructed. For fields of even order larger than 2, this leads to an elementary construction of the non-split extension of SL₄( )by ⁶.     

The Parameters of Bipartite Q-polynomial Distance-Regular Graphs

Let denote a bipartite distance-regular graph with diameter D 3 and valency k 3. Suppose ₀, ₁, ..., _D is a Q-polynomial ordering of the eigenvalues of . This sequence is known to satisfy the recurrence _{i – 1} – _i + _{i + 1} = 0 (0 > i > D), for some real scalar . Let q denote a complex scalar such that q + q ^–1 = . Bannai and Ito have conjectured that q is real if the diameter D is sufficiently large.We settle this conjecture in the bipartite case by showing that q is real if the diameter D 4. Moreover, if D = 3, then q is not real if and only if ₁ is the second largest eigenvalue and the pair (, k) is one of the following: (1, 3), (1, 4), (1, 5), (1, 6), (2, 4), or (2, 5). We observe that each of these pairs has a unique realization by a known bipartite distance-regular graph of diameter 3.