Computing in the Fischer–Griess Monster Individual Grant Review GR/R95265/01
نویسنده
چکیده
The theory of finite groups is of central importance in mathematics, and finds wide applications in all the physical sciences and elsewhere. In essence it is the deep study of symmetry in all its innumerable manifestations, and so has applications in all situations where symmetry occurs. The building blocks of finite groups are the ‘simple’ groups, analogous to the prime numbers in number theory, which are socalled because they cannot be broken down into smaller pieces. The study of ‘simple’ groups, however, just like the study of prime numbers, turns out to be not simple at all.
منابع مشابه
ar X iv : m at h - ph / 0 60 80 01 v 1 3 1 Ju l 2 00 6 1 Modular Invariants and Fischer - Griess Monster 1
We show interesting relations between extremal partition functions of a family of conformal field theories and dimensions of the irreducible representations of the Fischer-Griess Monster sporadic group. We argue that these relations can be interpreted as an extension of Monster moonshine.
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We present a family of conformal field theories (or candidates for CFTs) that is build on extremal partition functions. Spectra of these theories can be decomposed into the irreducible representations of the Fischer-Griess Monster sporadic group. Interesting periodicities in the coefficients of extremal partition functions are observed and interpreted as a possible extension of Monster moonshin...
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