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In mathematics, the Griess algebra is a commutative non-associative algebra on a real vector space of dimension 196884 that has the Monster group M as its automorphism group. It is named after mathematician R. L. Griess, who constructed it in 1980 and subsequently used it in 1982 to construct M. The Monster fixes (vectorwise) a 1-space in this algebra and acts absolutely irreducibly on the 196883-dimensional orthogonal complement of this 1-space. (The Monster preserves the standard inner product on the 196884-space.)

Griess's construction was later simplified by Jacques Tits and John H. Conway.

The Griess algebra is the same as the degree 2 piece of the monster vertex algebra, and the Griess product is one of the vertex algebra products.

Conway, John Horton (1985), "A simple construction for the Fischer-Griess monster group", Inventiones Mathematicae, 79 (3): 513–540, Bibcode:1985InMat..79..513C, doi:10.1007/BF01388521, ISSN 0020-9910, MR 0782233
R. L. Griess Jr, The Friendly Giant, Inventiones Mathematicae 69 (1982), 1-102

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 ==References==
-*{{Citation | last1=Conway | first1=John Horton | author1-link=John Horton Conway | title=A simple construction for the Fischer-Griess monster group | doi=10.1007/BF01388521 |mr=782233 | year=1985 | journal=[[Inventiones Mathematicae]] | issn=0020-9910 | volume=79 | issue=3 | pages=513–540}}
+*{{Citation | last1=Conway | first1=John Horton | author1-link=John Horton Conway | title=A simple construction for the Fischer-Griess monster group | doi=10.1007/BF01388521 |mr=782233 | year=1985 | journal=[[Inventiones Mathematicae]] | issn=0020-9910 | volume=79 | issue=3 | pages=513–540| bibcode=1985InMat..79..513C }}
 *R. L. Griess Jr, ''The Friendly Giant'', Inventiones Mathematicae  69 (1982), 1-102