A-D-E Polynomial and Rogers--Ramanujan Identities
Abstract
We conjecture polynomial identities which imply Rogers--Ramanujan type identities for branching functions associated with the cosets ( G(1))-1 ( G(1))1 / ( G(1)), with G=An-1 (≥ 2), Dn-1 (≥ 2), E6,7,8 (=2). In support of our conjectures we establish the correct behaviour under level-rank duality for G=An-1 and show that the A-D-E Rogers--Ramanujan identities have the expected q 1- asymptotics in terms of dilogarithm identities. Possible generalizations to arbitrary cosets are also discussed briefly.
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