Whittaker modules for the twisted affine Nappi-Witten Lie algebra H4[τ]
Abstract
The Whittaker module M and its quotient Whittaker module L, for the twisted affine Nappi-Witten Lie algebra H4[τ] are studied. For nonsingular type, it is proved that if ≠ 0, then L, is irreducible and any irreducible Whittaker H4[τ]-module of type with k acting as a non-zero scalar is isomorphic to L,. Furthermore, for =0, all Whittaker vectors of L, 0 are completely determined. For singular type, the Whittaker vectors of L, with ≠ 0 are fully characterized.
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