Osaka Kyoiku University Researcher Information
日本語 | English
理数情報教育系
基本情報
- 所属
- 大阪教育大学 理数情報教育系 教授
- 学位
- (BLANK)(Osaka Kyoiku University)修士(教育学)(大阪教育大学)(BLANK)(Osaka University)博士(理学)(大阪大学)
- 研究者番号
- 90294181
- J-GLOBAL ID
- 200901064255237256
- researchmap会員ID
- 6000008567
経歴
2-
2014年4月
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2007年4月
学歴
3-
1992年4月 - 1995年7月
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1990年4月 - 1992年3月
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1985年4月 - 1989年3月
MISC
44-
Graphs and Combinatorics 28(4) 449-467 2012年7月In this paper we study a distance-regular graph Γ of diameter d ≥ 3 which satisfies the following two conditions: (a) For any integer i with 1 ≤ i ≤ d - 1 and for any pair of vertices at distance i in Γ there exists a strongly closed subgraph of diameter i containing them (b) There exists a strongly closed subgraph Δ which is completely regular in Γ. It is known that if Δ has diameter 1, then Γ is a regular near polygon. We prove that if a strongly closed subgraph Δ of diameter j with 2 ≤ j ≤ d - 1 is completely regular of covering radius d - j in Γ, then Γ is either a Hamming graph or a dual polar graph. © 2011 Springer.
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GRAPHS AND COMBINATORICS 26(2) 147-162 2010年3月Let Gamma be a Delsarte set graph with an intersection number c(2) (i.e., a distance-regular graph with a set C of Delsarte cliques such that each edge lies in a positive constant number n(C) of Delsarte cliques in C). We showed in Bang et al. (J Combin 28:501-506, 2007) that if psi(1) > 1 then c(2) >= 2 psi(1) where psi(1) := vertical bar Gamma(1)(x)boolean AND C vertical bar for x is an element of V(Gamma) and C aDelsarte clique satisfying d(x, C) = 1. In this paper, we classify Gamma with the case c(2) = 2 psi(1) > 2. As a consequence of this result, we show that if c(2) <= 5 and psi(1) > 1 then Gamma is either a Johnson graph or a folded Johnson graph (J) over bar (4s, 2s) with s >= 3.
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EUROPEAN JOURNAL OF COMBINATORICS 30(4) 893-907 2009年5月In this paper we study a distance-regular graph Gamma of diameter d >= 4 such that for any given pair of vertices at distance d - 1 there exists a strongly closed subgraph of diameter d - 1 containing them. We prove several inequalities for intersection numbers of Gamma. We show that if the equalities hold in some of these inequalities, then Gamma is either the Odd graph, the doubled Odd graph, the doubled Grassmann graph, the Hamming graph or the dual polar graph. (C) 2008 Elsevier Ltd. All rights reserved.
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GRAPHS AND COMBINATORICS 25(1) 65-79 2009年5月Let Gamma be a distance-regular graph of diameter d >= 3 with c(2) > 1. Let m be an integer with 1 <= m <= d - 1. We consider the following conditions: (SC)(m) : For any pair of vertices at distance m there exists a strongly closed subgraph of diameter m containing them. (BB)(m) : Let(x, y, z) be a triple of vertices with partial derivative(Gamma)(x, y) = 1 and partial derivative(Gamma)(x, z) = partial derivative(Gamma)(y, z) = m. Then B(x, z) = B(y, z). (CA)(m) : Let (x, y, z) be a triple of vertices with partial derivative(Gamma)(x, y) = 2, partial derivative(Gamma)(x, z) = partial derivative(Gamma)(y, z) = m and vertical bar C(z, x) boolean AND C(z, y)vertical bar >= 2. Then C(x, z) boolean OR A(x, z) = C(y, z) boolean OR A(y, z). In [12] we have shown that the condition (SC)(m) holds if and only if both of the conditions (BB)(i) and (CA)(i) hold for i = 1, ..., m. In this paper we show that if a(1) = 0 < a(2) and the condition (BB)(i) holds for i = 1, ..., m, then the condition (CA)(i) holds for i = 1, ..., m. In particular, the condition (SC)(m) holds. Applying this result we prove that a distance-regular graph with classical parameters (d, b, alpha, beta) such that c(2) > 1 and a(1) = 0 < a(2) satisfies the condition (SC)(i) for i = 1, ..., d - 1. In particular, either (b, alpha, beta) = (-2, -3, -1 - (-2)(d)) or (b, alpha, beta) = (-3, -2, -1+(-3)(d)/2) holds.
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GRAPHS AND COMBINATORICS 24(6) 537-550 2008年11月Let Gamma be a distance-regular graph of diameter d >= 3 with c(2) > 1. Let m be an integer with 1 <= m <= d - 1. We consider the following conditions: (SC)(m) : For any pair of vertices at distance m there exists a strongly closed subgraph of diameter m containing them. (BB)(m) : Let (x, y, z) be a triple of vertices with partial derivative(Gamma) (x, y) = 1 and partial derivative(Gamma) (x, z) = partial derivative(Gamma) (y, z) = m. Then B(x, z) = B(y, z). (CA)(m) : Let (x, y, z) be a triple of vertices with partial derivative(Gamma) (x, y) = 2, partial derivative(Gamma) (x, z) = partial derivative(Gamma) (y, z) = m and |C(z, x) boolean AND C(z, y)| >= 2. Then C(x, z) boolean OR A(x, z) = C(y, z) boolean OR A(y, z). Suppose that the condition (SC)(m) holds. Then it has been known that the condition (BB)(i) holds for all i with 1 <= i <= m. Similarly we can show that the condition (CA)(i) holds for all i with 1 <= i <= m. In this paper we prove that if the conditions (BB)(i) and (CA)(i) hold for all i with 1 <= i <= m, then the condition (SC)(m) holds. Applying this result we give a sufficient condition for the existence of a dual polar graph as a strongly closed subgraph in Gamma.