Essential dimension of inseparable field extensions

Abstract

Let k be a base field, K be a field containing k and L/K be a field extension of degree n. The essential dimension ed(L/K) over k is a numerical invariant measuring "the complexity" of L/K. Of particular interest is τ(n) = max ed(L/K) | L/K is a separable extension of degree n, also known as the essential dimension of the symmetric group Sn. The exact value of τ(n) is known only for n ≤ 7. In this paper we assume that k is a field of characteristic p > 0 and study the essential dimension of inseparable extensions L/K. Here the degree n = [L:K] is replaced by a pair (n, e) which accounts for the size of the separable and the purely inseparable parts of L/K respectively, and τ(n) is replaced by τ(n, e) = max ed(L/K) | L/K is a field extension of type (n, e). The symmetric group Sn is replaced by a certain group scheme Gn,e over k. This group is neither finite nor smooth; nevertheless, computing its essential dimension turns out to be easier than computing the essential dimension of Sn. Our main result is a simple formula for τ(n, e).