English

Minimal model fusion rules from 2-groups

q-alg 2008-02-03 v1 High Energy Physics - Theory Quantum Algebra

Abstract

The fusion rules for the (p,q)(p,q)-minimal model representations of the Virasoro algebra are shown to come from the group G=\boZ2p+q5G = \boZ_2^{p+q-5} in the following manner. There is a partition G=P1...PNG = P_1 \cup ...\cup P_N into disjoint subsets and a bijection between {P1,...,PN}\{P_1,...,P_N\} and the sectors {S1,...,SN}\{S_1,...,S_N\} of the (p,q)(p,q)-minimal model such that the fusion rules SiSj=kD(Si,Sj,Sk)SkS_i * S_j = \sum_k D(S_i,S_j,S_k) S_k correspond to PiPj=kT(i,j)PkP_i * P_j = \sum_{k\in T(i,j)} P_k where T(i,j)={kaPi,bPj,a+bPk}T(i,j) = \{k|\exists a\in P_i,\exists b\in P_j, a+b\in P_k\}.

Cite

@article{arxiv.q-alg/9601004,
  title  = {Minimal model fusion rules from 2-groups},
  author = {Fusun Akman and Alex J. Feingold and Michael D. Weiner},
  journal= {arXiv preprint arXiv:q-alg/9601004},
  year   = {2008}
}

Comments

8 pages, amstex, v2.1, uses fonts msam, msbm, no figures, tables constructed using macros: cellular and related files are included. This paper will be submitted to Communications in Math. Physics. A compressed dvi file is available at ftp://math.binghamton.edu/pub/alex/fusionrules.dvi.Z , and compressed postscript at ftp://math.binghamton.edu/pub/alex/fusionrules.ps.Z