Classification of linkage systems
Abstract
A linkage diagram is obtained from the Carter diagram by adding an extra root , so that the resulting subset of roots is linearly independent. With every linkage diagram we associate the linkage label vector , similar to Dynkin labels. The linkage diagrams connected under the action of the group constitute the the linkage system . For any simply-laced Carter diagram, the system is constructed. To obtain linkage diagrams , we use an easily verifiable criterion: , where is the inverse quadratic form associated with . A Dynkin diagram such that rank() = rank() + 1 and any -associated root subset lies in , is said to be the Dynkin extension. The linkage system is the union of -components taken for all Dynkin extensions of . The subset of roots of , linearly dependent on roots of is said to be a partial root system. The size of is estimated as follows: . Carter diagrams and (resp. and ) are said to be covalent. For any pair {} of covalent Carter diagrams, where is the Dynkin diagram, we explicitly construct the invertible linear map , where (resp. ) is the root system (resp. partial root system) corresponding to (resp. ). In particular, we have .
Keywords
Cite
@article{arxiv.1406.3049,
title = {Classification of linkage systems},
author = {Rafael Stekolshchik},
journal= {arXiv preprint arXiv:1406.3049},
year = {2014}
}
Comments
118 pages, 66 figures. Updated abstract, added index. arXiv admin note: text overlap with arXiv:1010.5684