arXiv:1101.0440 Abstract | arXiv Analytics

arXiv:1101.0440 [math.CO]Abstract References Reviews Resources

Geometric distance-regular graphs without 4-claws

Published 2011-01-03Version 1

A non-complete \drg $\Gamma$ is called geometric if there exists a set $\mathcal{C}$ of Delsarte cliques such that each edge of $\Gamma$ lies in a unique clique in $\mathcal{C}$. In this paper, we determine the non-complete distance-regular graphs satisfying $\max \{3, 8/3}(a_1+1)\}<k<4a_1+10-6c_2$. To prove this result, we first show by considering non-existence of 4-claws that any non-complete distance-regular graph satisfying $\max \{3, \8/3}(a_1+1)\}<k<4a_1+10-6c_2$ is a geometric \drg with smallest eigenvalue -3. Moreover, we classify the geometric \drg s with smallest eigenvalue -3. As an application, 7 feasible intersection arrays in the list of \cite[Chapter 14]{bcn} are ruled out.

Categories: math.CO, math.SP

Subjects: 05E30, 05C50, 05C75

Keywords: geometric distance-regular graphs, smallest eigenvalue, non-complete distance-regular graph satisfying, unique clique, non-complete distance-regular graphs satisfying

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