On very regular representations in presence of index
T. Dahn
Abstract
We discuss the possibility of very regular subgroups of a Lie group, in presence of an index figure. Further, representations that reduce action to a very regular boundary.
Table of Contents
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On very regular representations in presence of index
Authors
T. Dahn
Abstract
We discuss the possibility of very regular subgroups of a Lie group, in presence of an index figure. Further, representations that reduce action to a very regular boundary.
Paper Structure (10 sections, 23 theorems)
This paper contains 10 sections, 23 theorems.
Table of Contents
Key Result
Proposition 1
Given (u,v) defines a symmetric one-sided convex neighborhood of an index figure $\mathcal{F}$, that is $\mathcal{F}(u,v) \cap \mathcal{F}(x,y,z) = \emptyset$, we have locally a resolution of (u,v) in convex components. Given a sharp front for f with respect to (u,v) close to $\mathcal{F}$, we can d
Theorems & Definitions (24)
- Proposition 1
- Lemma 2
- Lemma 3
- Lemma 4
- Lemma 5
- Proposition 6
- Lemma 7
- Definition 8
- Lemma 9
- Lemma 10
- ...and 14 more