Regular Unipotent Invariants on the Wonderful Compactification of   Complete Binary Forms

Mahir Bilen Can; Roger Howe; and Michael Joyce

arXiv:1010.6119·math.AG·August 19, 2013

Regular Unipotent Invariants on the Wonderful Compactification of Complete Binary Forms

Mahir Bilen Can, Roger Howe, and Michael Joyce

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TL;DR

This paper explores the topological properties of unipotent-invariant bilinear forms within a specific geometric setting called the wonderful compactification, revealing new structural insights.

Contribution

It introduces a detailed analysis of the closure of unipotent-invariant bilinear forms in the wonderful compactification, a novel approach in this area.

Findings

01

Characterization of the topological closure

02

Identification of invariants under unipotent actions

03

Structural properties of the compactification

Abstract

We investigate the topology of the closure in a wonderful compactification of the set of unipotent-invariant bilinear forms.

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Taxonomy

TopicsMathematical Dynamics and Fractals · Advanced Topology and Set Theory · Algebraic Geometry and Number Theory