On the resolvent degree of PSU(3,q)
Abstract
Resolvent degree (RD) is an invariant of finite groups in terms of the complexity of their algebraic actions. We address the problem of bounding RD(G) for all finite simple groups using the methods established by G\'omez-Gonz\'ales-Sutherland-Wolfson in terms of RD≤ dC-versality and special points. We give upper bounds on RD(PSU(3,q)) and RD(PSU(2, q)) in terms of classical invariant theory. In the PSU(3,q) case, stability of low-degree invariants permit an asymptotic bound on RD growing in q.
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