An A2 Bailey tree and A2(1) Rogers-Ramanujan-type identities

Abstract

The A2 Bailey chain of Andrews, Schilling and the author is extended to a four-parameter A2 Bailey tree. As main application of this tree, we prove the Kanade-Russell conjecture for a three-parameter family of Rogers-Ramanujan-type identities related to the principal characters of the affine Lie algebra A2(1). Combined with known q-series results, this further implies an A2(1)-analogue of the celebrated Andrews-Gordon q-series identities. We also use the A2 Bailey tree to prove a Rogers-Selberg-type identity for the characters of the principal subspaces of A2(1) indexed by arbitrary level-k dominant integral weights λ. This generalises a result of Feigin, Feigin, Jimbo, Miwa and Mukhin for λ=k0.