Classical groups
Finite groups
Group schemes
Topological groups
Lie groups
Super-Lie groups
Higher groups
Cohomology and Extensions
Related concepts
exceptional structures, exceptional isomorphisms
exceptional finite rotation groups:
and Kac-Moody groups:
exceptional Jordan superalgebra,
The Conway groups, , are three of the sporadic finite simple groups. A fourth group, , is the group of automorphisms of the Leech lattice with respect to addition and inner product. This latter group is not simple, but is the quotient group of by its center of order 2. The other two simple Conway groups are subgroups of .
The simple Conway groups are three of the seven members of the ‘second generation’ of the Happy Family of 20 simple subquotients of the Monster group.
The Conway group is the group of automorphisms of a super VOA of the unique chiral N=1 super vertex operator algebra of central charge without fields of conformal weight
(Duncan 05, see also Paquette-Persson-Volpato 17, p. 9)
See also at moonshine.
See also
John F. Duncan, Super-moonshine for Conway’s largest sporadic group (arXiv:math/0502267)
Natalie Paquette, Daniel Persson, Roberto Volpato, BPS Algebras, Genus Zero, and the Heterotic Monster (arXiv:1701.05169)
Last revised on May 20, 2019 at 11:18:45. See the history of this page for a list of all contributions to it.