Classification of classical twists of the standard Lie bialgebra structure on a loop algebra
Licentiatavhandling, 2021
author of this thesis.
The standard Lie bialgebra structure on an affine Kac-Moody algebra induces a Lie bialgebra structure on the underlying loop algebra and its parabolic subalgebras. We study classical twists of the induced Lie bialgebra structures and obtain their full classification in terms of Belavin-Drinfeld quadruples up to a natural notion of equivalence.
To obtain this classification we first show that the induced Lie bialgebra structures are determined by certain solutions of the classical Yang-Baxter equation (CYBE) with two parameters. Then, using the algebro-geometric theory of the CYBE, based on torsion free coherent sheaves, we reduce the problem to the well-known classification of trigonometric solutions given by A. Belavin and V. Drinfeld.
The classification of twists in the case of parabolic subalgebras allows us to answer recently posed open questions regarding the so-called quasi-trigonometric solutions of the CYBE.
Lie bialgebra
classical twist
loop algebra
Yang-Baxter equation
Manin triple
geometric r-matrix.
Belavin-Drinfeld quadruple
Författare
Stepan Maximov
Chalmers, Matematiska vetenskaper, Algebra och geometri
Ämneskategorier
Algebra och logik
Geometri
Annan matematik
Utgivare
Chalmers