Dual pairs in the Pin-group and duality for the corresponding spinorial representation

Abstract

In this paper, we give a complete picture of Howe correspondence for the setting (O(E, b), Pin(E, b), ), where O(E, b) is an orthogonal group (real or complex), Pin(E, b) is the two-fold Pin-covering of O(E, b), and is the spinorial representation of Pin(E, b). More precisely, for a dual pair (G, G') in O(E, b), we determine explicitly the nature of its preimages (G, G') in Pin(E, b), and prove that apart from some exceptions, (G, G') is always a dual pair in Pin(E, b); then we establish the Howe correspondence for with respect to (G, G').