Classifying complete C-subalgebras of C[[t]]

Abstract

We address the problem of classifying complete C-subalgebras of C[[t]]. A discrete invariant for this classification problem is the semigroup of orders of the elements in a given C-subalgebra. Hence we can define the space R of all C-subalgebras of C[[t]] with semigroup . After relating this space to the Zariski moduli space of curve singularities and to a moduli space of global singular curves, we prove that R is an affine variety by describing its defining equations in an ambient affine space in terms of an explicit algorithm. Moreover, we identify certain types of semigroups for which R is always an affine space, and for general we describe the stratification of R by embedding dimension. We also describe the natural map from R to the Zariski moduli space in some special cases. Explicit examples are provided throughout.