Thursday, September 13, 2012

1209.2674 (Gary McConnell)

An entropic partial order on a parabolic quotient of S6    [PDF]

Gary McConnell
Let m and n be any integers with n>m>=2. Using just the entropy function it is possible to define a partial order on S_mn (the symmetric group on mn letters) modulo a subgroup isomorphic to S_m x S_n. We explore this partial order in the case m=2, n=3, where thanks to the outer automorphism the quotient space is actually isomorphic to a parabolic quotient of S_6. Furthermore we show that in this case it has a fairly simple algebraic description in terms of elements of the group ring.
View original: http://arxiv.org/abs/1209.2674

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