Closed subsets of root systems and regular subalgebras
Andrew Douglas, Willem A. de Graaf

TL;DR
This paper introduces an algorithm for classifying closed subsets of root systems, facilitating the classification of regular subalgebras of simple Lie algebras, with implementations for ranks 3 to 7 using GAP.
Contribution
The paper presents a novel algorithm for classifying closed subsets of root systems and applies it to classify regular subalgebras of simple Lie algebras, especially for ranks 3 to 7.
Findings
Complete classification for rank 3 root systems.
Algorithm successfully classifies closed subsets up to conjugation.
Provides summary data for higher ranks due to complexity.
Abstract
We describe an algorithm for classifying the closed subsets of a root system, up to conjugation by the associated Weyl group. Such a classification of an irreducible root system is closely related to the classification of the regular subalgebras, up to inner automorphism, of the corresponding simple Lie algebra. We implement our algorithm to classify the closed subsets of the irreducible root systems of ranks 3 through 7. We present a complete description of the classification for the closed subsets of the rank 3 irreducible root system. We employ this root system classification to classify all regular subalgebras of the rank 3 simple Lie algebras. We present only summary data for the classifications in higher ranks due to the large size of these classifications. Our algorithm is implemented in the language of the computer algebra system GAP.
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