On the essential dimension of an algebraic group whose connected component is a torus

Abstract

Let p be a prime integer, k be a p-closed field of characteristic ≠ p, T be a torus defined over k, F be a finite p-group, and 1 T G F 1 be an exact sequence of algebraic groups. Extending earlier work of N. Karpenko and A. Merkurjev, R. L\"otscher, M. MacDonald, A. Meyer, and the first author showed that \[(V) - (G) ≤slant ed(G; p) ≤slant (W) - (G),\] where V and W range over the p-faithful and p-generically free k-representations of G, respectively. They conjectured that the upper bound is, in fact, sharp. This conjecture has remained open for some time. We prove it in the case, where F is diagonalizable.