Distance-Regular Graphs

“…Then as m ≥ k ≥ 71, by Equation (12), we obtain c 3 ≤ 0.2166k. It implies |u 4 | ≥ 0.3344 by Equation (7). Consider the intersection matrix L, and we see that k 2 + θ 2 ≤ tr(L 2 ) ≤ k 2 + 6k + 4c 5 k − c 2 5 , which implies c 5 ≥ 0.1440k.…”

Section: Distance-regular Graphs With Relatively Small θ Minmentioning

confidence: 82%

“…For more background, see [4] and [7]. All the graphs considered in this paper are finite, undirected and simple.…”

Section: Preliminariesmentioning

confidence: 99%

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Non-Bipartite Distance-Regular Graphs with a Small Smallest Eigenvalue

Qiao

Jing

Koolen³

2019

Electron. J. Combin.

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In 2017, Qiao and Koolen showed that for any fixed integer D ≥ 3, there are only finitely many such graphs with θ min ≤ −αk, where 0 < α < 1 is any fixed number. In this paper, we will study non-bipartite distance-regular graphs with relatively small θ min compared with k. In particular, we will show that if θ min is relatively close to −k, then the odd girth g must be large. Also we will classify the non-bipartite distance-regular graphs with θ min ≤ D−1 D for D = 4, 5.

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“…We assume that the reader is familiar with the basic facts of the group theory, the theory of strongly regular graphs and the theory of distance-regular graphs. We refer the reader to [8,20] for relevant background reading in the group theory, to [3,23] for the theory of strongly regular graphs, and to [5,12] for the theory of distance-regular graphs.…”

Section: Introductionmentioning

confidence: 99%