English

Associated Forms and Hypersurface Singularities: The Binary Case

Algebraic Geometry 2016-02-03 v3 Commutative Algebra Complex Variables

Abstract

In the recent articles by Alper, Eastwood and Isaev, it was conjectured that all rational GLn(C)GL_n({\mathbb C})-invariant functions of forms of degree d3d\ge 3 on Cn{\mathbb C}^n can be extracted, in a canonical way, from those of forms of degree n(d2)n(d-2) by means of assigning every form with nonvanishing discriminant the so-called associated form. While this surprising statement is interesting from the point of view of classical invariant theory, its original motivation was the reconstruction problem for isolated hypersurface singularities, which is the problem of finding a constructive proof of the well-known Mather-Yau theorem. The conjecture was confirmed by Eastwood and Isaev for binary forms of degree d6d \le 6 as well as ternary cubics. Furthermore, a weaker version of it was settled by Alper and Isaev for arbitrary nn and dd. In the present paper, we focus on the case n=2n=2 and establish the conjecture, in a rather explicit way, for binary forms of an arbitrary degree. This result allows one to extract a complete system of biholomorphic invariants of homogeneous plane curve singularities from their Milnor algebras.

Keywords

Cite

@article{arxiv.1407.6838,
  title  = {Associated Forms and Hypersurface Singularities: The Binary Case},
  author = {Jarod Alper and Alexander Isaev},
  journal= {arXiv preprint arXiv:1407.6838},
  year   = {2016}
}

Comments

To appear in J. reine angew. Math

R2 v1 2026-06-22T05:13:04.185Z