Fock space representation of the circle quantum group

Abstract

In [arXiv:1711.07391] we have defined quantum groups U(sl(R)) and U(sl(S1)), which can be interpreted as continuous generalizations of the quantum groups of the Kac-Moody Lie algebras of finite, respectively affine type A. In the present paper, we define the Fock space representation FR of the quantum group U(sl(R)) as the vector space generated by real pyramids (a continuous generalization of the notion of partition). In addition, by using a variant of the "folding procedure" of Hayashi-Misra-Miwa, we define an action of U(sl(S1)) on FR.