Matrix generators for exceptional groups of Lie type

Robert J. Howlett; Leanne J. Rylands; Donald E. Taylor

doi:10.1006/jsco.2000.0431

Matrix generators for exceptional groups of Lie type

Robert J. Howlett, Leanne J. Rylands, Donald E. Taylor

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25 Citations (Scopus)

Abstract

This paper gives a uniform method of constructing generators for matrix representations of finite groups of Lie type with particular emphasis on the exceptional groups. The algorithm constructs matrices for the action of root elements on the lowest dimension representation of an associated Lie algebra. These generators have been implemented in the computer algebra system Magma and this completes the provision of pairs of matrix generators for all finite groups of Lie type.

Original language	English
Pages (from-to)	429-445
Number of pages	17
Journal	Journal of Symbolic Computation
Volume	31
Issue number	4
DOIs	https://doi.org/10.1006/jsco.2000.0431
Publication status	Published - 2001

Keywords

Lie type
Magma
computer science
mathematics
matrices

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10.1006/jsco.2000.0431

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abstract = "This paper gives a uniform method of constructing generators for matrix representations of finite groups of Lie type with particular emphasis on the exceptional groups. The algorithm constructs matrices for the action of root elements on the lowest dimension representation of an associated Lie algebra. These generators have been implemented in the computer algebra system Magma and this completes the provision of pairs of matrix generators for all finite groups of Lie type.",

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AU - Taylor, Donald E.

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AB - This paper gives a uniform method of constructing generators for matrix representations of finite groups of Lie type with particular emphasis on the exceptional groups. The algorithm constructs matrices for the action of root elements on the lowest dimension representation of an associated Lie algebra. These generators have been implemented in the computer algebra system Magma and this completes the provision of pairs of matrix generators for all finite groups of Lie type.

KW - Lie type

KW - Magma

KW - computer science

KW - mathematics

KW - matrices

UR - http://handle.uws.edu.au:8081/1959.7/34788

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DO - 10.1006/jsco.2000.0431

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JO - Journal of Symbolic Computation

JF - Journal of Symbolic Computation

IS - 4

ER -

Matrix generators for exceptional groups of Lie type

Abstract

Keywords

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