Local fusion graphs and sporadic simple groups

John Ballantyne; Peter Rowley

doi:10.37236/4298

Local fusion graphs and sporadic simple groups

Research output: Contribution to journal › Article › peer-review

Abstract

For a group G with G-conjugacy class of involutions X, the local fusion graph F(G,X) has X as its vertex set, with distinct vertices x and y joined by an edge if, and only if, the product xy has odd order. Here we show that, with only three possible exceptions, for all pairs (G,X) with G a sporadic simple group or the automorphism group of a sporadic simple group, F(G,X) has diameter 2.

Original language	English
Article number	P3.18
Number of pages	13
Journal	The Electronic Journal of Combinatorics
Volume	22
Issue number	3
DOIs	https://doi.org/10.37236/4298
Publication status	Published - 31 Jul 2015

Keywords

Local Fusion Graph
Sporadic Simple Group
Diameter

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10.37236/4298

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abstract = "For a group G with G-conjugacy class of involutions X, the local fusion graph F(G,X) has X as its vertex set, with distinct vertices x and y joined by an edge if, and only if, the product xy has odd order. Here we show that, with only three possible exceptions, for all pairs (G,X) with G a sporadic simple group or the automorphism group of a sporadic simple group, F(G,X) has diameter 2.",

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AB - For a group G with G-conjugacy class of involutions X, the local fusion graph F(G,X) has X as its vertex set, with distinct vertices x and y joined by an edge if, and only if, the product xy has odd order. Here we show that, with only three possible exceptions, for all pairs (G,X) with G a sporadic simple group or the automorphism group of a sporadic simple group, F(G,X) has diameter 2.

KW - Local Fusion Graph

KW - Sporadic Simple Group

KW - Diameter

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DO - 10.37236/4298

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Local fusion graphs and sporadic simple groups

Abstract

Keywords

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