Quantum toroidal $\mathfrak{gl}_1$ algebra : plane partitions
arXiv:1110.5310 · doi:10.1215/21562261-1625217
Abstract
In third paper of the series we construct a large family of representations of the quantum toroidal $\gl_1$ algebra whose bases are parameterized by plane partitions with various boundary conditions and restrictions. We study the corresponding formal characters. As an application we obtain a Gelfand-Zetlin type basis for a class of irreducible lowest weight $\gl_\infty$-modules.
Latex, 38 pages