The A_{2n}^{(2)} Rogers-Ramanujan identities

The famous Rogers-Ramanujan and Andrews--Gordon identities are embedded in a doubly-infinite family of Rogers-Ramanujan-type identities labelled by positive integers m and n. For fixed m and n the product side corresponds to a specialised character of the affine Kac-Moody algebra A_{2n}^{(2)} at level m, and is expressed as a product of n^2 theta functions of modulus 2m+2n+1, or by level-rank duality, as a product of m^2 theta functions. Rogers-Ramanujan-type identities for even moduli, corresponding to the affine Lie algebras C_n^{(1)} and D_{n+1}^{(2)}, are also proven.
Comment: 26 pages. Two new theorems have been added to the paper (Theorems 1.5 and 4.1), giving new Rogers-Ramanujan identities for the affine Lie algebra A_{n-1}^{(1)}