Representations of shifted twisted quantum affine algebras

Abstract

In this paper, we introduce and study shifted twisted quantum affine algebras which provide a twisted counterpart of the theory of shifted quantum affine algebras. The shifted twisted quantum affine algebra qμ+,μ-() is obtained from the Drinfeld current presentation of twisted quantum loop algebras by shifting the Cartan--Drinfeld currents ϕi(z) according to a coweight pair (μ+,μ-). We prove that it admits a triangular decomposition and that, up to isomorphism, they depend only on the total shift μ=μ+ + μ-. For each shift μ, we define a category Oμ of representations of qμ() = q0,μ() and prove a rationality theorem for the Cartan currents: on every weight space, the two currents ϕi+(z) and ϕi-(z) are expansions of the same rational operator-valued function, whose degree is prescribed by αi(μ). As a consequence, we classify the simple objects of Oμ by rational -weights of the corresponding degrees. We then construct a deformed Drinfeld coproduct and use it to define a fusion product on the direct sum Osh of the categories Oμ. This fusion product is compatible with q-characters. We also classify finite-dimensional simple modules in Osh in terms of dominant rational -weights, with a separate treatment of type A2n(2). Finally, we construct restriction representations relating representations of twisted quantum affine Borel algebras to representations of shifted twisted quantum affine algebras, and establish a q-characters formula for simple finite-dimensional representations of shifted twisted quantum affine algebras in terms of the q-characters of the corresponding simple representations of the twisted quantum affine Borel algebra q().