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Peter Rowley
UMIST
Commuting involution graphs
Friday 14th, March 12:05-12:55pm,
Stephen Roberts.
For a group G, and X a subset of
G, let \mathcal C(G,X) denote the
graph whose vertex set is X with two (distinct)
vertices x and y joined by an edge
whenever they are commuting elements of G. If
X just consists of involutions we call
C(G,X) a commuting involution graph. In
this lecture we shall further assume that X is a
G conjugacy class. We discuss recent results
for various choices of G and X, including
the case where G\cong Sym(n), the symmetric
group of degree n.
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