Quasi-Whittaker modules for the Schr\"odinger algebra

Abstract

In this paper, we construct a new class of modules for the Schr\"odinger algebra , called quasi-Whittaker module. Different from [ZC], the quasi-Whittaker module is not induced by the Borel subalgebra of the Schr\"odinger algebra related with the triangular decomposition, but its Heisenberg subalgebra . We prove that, for a simple -module V, V is a quasi-Whittaker module if and only if V is a locally finite -module; Furthermore, we classify the simple quasi-Whittaker modules by the elements with the action similar to the center elements in U() and their quasi-Whittaker vectors. Finally, we characterize arbitrary quasi-Whittaker modules.