Hilbert's 13th Problem for Algebraic Groups

Abstract

The algebraic form of Hilbert's 13th Problem asks for the resolvent degree rd(n) of the general polynomial f(x) = xn + a1 xn-1 + … + an of degree n, where a1, …, an are independent variables. The resolvent degree is the minimal integer d such that every root of f(x) can be obtained in a finite number of steps, starting with C(a1, …, an) and adjoining algebraic functions in ≤ d variables at each step. Recently Farb and Wolfson defined the resolvent degree rdk(G) of any finite group G and any base field k of characteristic 0. In this setting rd(n) = rd C(Sn), where Sn denotes the symmetric group. In this paper we define rdk(G) for every algebraic group G over an arbitrary field k, investigate the dependency of this quantity on k and show that rdk(G) ≤ 5 for any field k and any connected group G. The question of whether rdk(G) can be bigger than 1 for any field k and any algebraic group G over k (not necessarily connected) remains open.