Essential dimension of double covers of symmetric and alternating groups

Abstract

I. Schur studied double covers n and n of symmetric groups n and alternating groups n, respectively. Representations of these groups are closely related to projective representations of n and n; there is also a close relationship between these groups and spinor groups. We study the essential dimension (n) and (n). We show that over a base field of characteristic ≠ 2, (n) and (n) grow exponentially with n, similar to (n). On the other case, in characteristic 2, they grow sublinearly, similar to (n) and (n). We give an application of our result in good characteristic to the theory of trace forms.