The action of F4(q) on cosets of B4(q).

Lancaster University

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https://doi.org/10.1006/jabr.1998.7619
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The action of F4(q) on cosets of B4(q). / Lawther, R.
In: Journal of Algebra, Vol. 212, No. 1, 01.02.1999, p. 79-118.

Research output: Contribution to Journal/Magazine › Journal article › peer-review

Harvard

Lawther, R 1999, 'The action of F4(q) on cosets of B4(q).', Journal of Algebra, vol. 212, no. 1, pp. 79-118. https://doi.org/10.1006/jabr.1998.7619

APA

Lawther, R. (1999). The action of F4(q) on cosets of B4(q). Journal of Algebra, 212(1), 79-118. https://doi.org/10.1006/jabr.1998.7619

Vancouver

Lawther R. The action of F4(q) on cosets of B4(q). Journal of Algebra. 1999 Feb 1;212(1):79-118. doi: 10.1006/jabr.1998.7619

Author

Lawther, R. / The action of F4(q) on cosets of B4(q). In: Journal of Algebra. 1999 ; Vol. 212, No. 1. pp. 79-118.

Bibtex

@article{f858419daefd46958ef380b37cc2cc0c,

title = "The action of F4(q) on cosets of B4(q).",

abstract = "In this paper we consider the action of the simple groupF4(q) on the cosets of the maximal subgroupB4(q). We show that the action is multiplicity-free of rankq + 3; we obtain suborbit representatives and calculate subdegrees, show that all suborbits are self-paired, find that none of the graphs arising from the action is distance-transitive, and give explicitly the decomposition of the permutation character. In addition, we give detailed information on the correspondence between geometric conjugacy classes and semisimple classes which is used in the Deligne–Lusztig theory.",

author = "R. Lawther",

year = "1999",

month = feb,

day = "1",

doi = "10.1006/jabr.1998.7619",

language = "English",

volume = "212",

pages = "79--118",

journal = "Journal of Algebra",

issn = "0021-8693",

publisher = "ELSEVIER ACADEMIC PRESS INC",

number = "1",

}

RIS

TY - JOUR

T1 - The action of F4(q) on cosets of B4(q).

AU - Lawther, R.

PY - 1999/2/1

Y1 - 1999/2/1

N2 - In this paper we consider the action of the simple groupF4(q) on the cosets of the maximal subgroupB4(q). We show that the action is multiplicity-free of rankq + 3; we obtain suborbit representatives and calculate subdegrees, show that all suborbits are self-paired, find that none of the graphs arising from the action is distance-transitive, and give explicitly the decomposition of the permutation character. In addition, we give detailed information on the correspondence between geometric conjugacy classes and semisimple classes which is used in the Deligne–Lusztig theory.

AB - In this paper we consider the action of the simple groupF4(q) on the cosets of the maximal subgroupB4(q). We show that the action is multiplicity-free of rankq + 3; we obtain suborbit representatives and calculate subdegrees, show that all suborbits are self-paired, find that none of the graphs arising from the action is distance-transitive, and give explicitly the decomposition of the permutation character. In addition, we give detailed information on the correspondence between geometric conjugacy classes and semisimple classes which is used in the Deligne–Lusztig theory.

U2 - 10.1006/jabr.1998.7619

DO - 10.1006/jabr.1998.7619

M3 - Journal article

VL - 212

SP - 79

EP - 118

JO - Journal of Algebra

JF - Journal of Algebra

SN - 0021-8693

IS - 1

ER -

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