Polynomial invariants and moduli of generic two-dimensional commutative algebras

Abstract

Let V be a two-dimensional vector space over a field F of characteristic not 2 or 3. We show there is a canonical surjection from the set of suitably generic commutative algebra structures on V modulo the action of GL(V) onto the plane F2. In these coordinates, which are quotients of invariant quartic polynomials, properties such as associativity and the existence of zero divisors are described by simple algebraic conditions. The map is a bijection over the complement of a degenerate elliptic curve and over we give an explicit parametrisation of the fibre in terms of Galois extensions of F. Algebras in -1() are exactly those which admit non-trivial automorphisms. We show how can be lifted to a map from the SL(V)-moduli space to an algebraic hypersurface ' in a four-dimensional vector space whose equation is essentially the classical Eisenstein equation for the covariants of a binary cubic. This map is the restriction of a surjective map from the set of stable commutative algebras on V modulo the action of SL(V) onto '.