Generalized Hirota Equations and Representation Theory. I. The case of SL(2) and SLq(2)"
Abstract
This paper begins investigation of the concept of ``generalized τ-function'', defined as a generating function of all the matrix elements of a group element g ∈ G in a given highest-weight representation of a universal enveloping algebra G. In the generic situation, the time-variables correspond to the elements of maximal nilpotent subalgebras rather than Cartanian elements. Moreover, in the case of quantum groups such τ-``functions'' are not c-numbers but take their values in non-commutative algebras (of functions on the quantum group G). Despite all these differences from the particular case of conventional τ-functions of integrable (KP and Toda lattice) hierarchies (which arise when G is a Kac-Moody (1-loop) algebra of level k=1), these generic τ-functions also satisfy bilinear Hirota-like equations, which can be deduced from manipulations with intertwining operators. The most important applications of the formalism should be to k>1 Kac-Moody and multi-loop algebras, but this paper contains only illustrative calculations for the simplest case of ordinary (0-loop) algebra SL(2) and its quantum counterpart SLq(2), as well as for the system of fundamental representations of SL(n).
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