A framework of Rogers-Ramanujan identities and their arithmetic properties

Abstract

The two Rogers-Ramanujan q-series \[ Σn=0∞qn(n+σ)(1-q)·s (1-qn), \] where σ=0,1, play many roles in mathematics and physics. By the Rogers-Ramanujan identities, they are essentially modular functions. Their quotient, the Rogers-Ramanujan continued fraction, has the special property that its singular values are algebraic integral units. We find a framework which extends the Rogers-Ramanujan identities to doubly-infinite families of q-series identities. If a∈\1,2\ and m,n≥ 1, then we have \[ Σλ λ1≤ m qa|λ| P2λ(1,q,q2,…;qn) ="infinite product modular function", \] where the Pλ(x1,x2,…;q) are Hall-Littlewood polynomials. These q-series are specialized characters of affine Kac--Moody algebras. Generalizing the Rogers-Ramanujan continued fraction, we prove in the case of A2n(2) that the relevant q-series quotients are integral units.