Whittaker modules for the twisted affine Nappi-Witten Lie algebra $\widehat{H}_{4}[τ]$

Abstract: The Whittaker module $M_{\psi}$ and its quotient Whittaker module $L_{\psi, \xi}$ for the twisted affine Nappi-Witten Lie algebra $\widehat{H}{4}[\tau]$ are studied. For nonsingular type, it is proved that if $\xi\neq 0$, then $L{\psi,\xi}$ is irreducible and any irreducible Whittaker $\widehat{H}{4}[\tau]$-module of type $\psi$ with ${\bf k}$ acting as a non-zero scalar $\xi$ is isomorphic to $L{\psi,\xi}$. Furthermore, for $\xi=0$, all Whittaker vectors of $L_{\psi, 0}$ are completely determined. For singular type, the Whittaker vectors of $L_{\psi, \xi}$ with $\xi \neq 0$ are fully characterized.