TY - JOUR
T1 - Irreducible monomial linear groups of degree four over finite fields
AU - Flannery, D. L.
PY - 2004/6
Y1 - 2004/6
N2 - We describe an algorithm for explicitly listing the irreducible monomial subgroups of GL(n, q), given a, suitable list of finite irreducible monomial subgroups of GL(n, ℂ), where n is 4 or a prime, and q is a prime power. Particular attention is paid to the case n = 4, and the algorithm is illustrated for n = 4 and q = 5. Certain primitive permutation groups can be constructed from a list of irreducible monomial subgroups of GL(n, q). The paper's final section shows that the computation of automorphisms of such permutation groups reduces mainly to computation of irreducible monomial subgroups of GL(n, q), q prime.
AB - We describe an algorithm for explicitly listing the irreducible monomial subgroups of GL(n, q), given a, suitable list of finite irreducible monomial subgroups of GL(n, ℂ), where n is 4 or a prime, and q is a prime power. Particular attention is paid to the case n = 4, and the algorithm is illustrated for n = 4 and q = 5. Certain primitive permutation groups can be constructed from a list of irreducible monomial subgroups of GL(n, q). The paper's final section shows that the computation of automorphisms of such permutation groups reduces mainly to computation of irreducible monomial subgroups of GL(n, q), q prime.
KW - Computing lists of irreducible linear groups
KW - Monomial linear group
UR - http://www.scopus.com/inward/record.url?scp=7244247468&partnerID=8YFLogxK
U2 - 10.1142/S0218196704001736
DO - 10.1142/S0218196704001736
M3 - Article
SN - 0218-1967
VL - 14
SP - 253
EP - 294
JO - International Journal of Algebra and Computation
JF - International Journal of Algebra and Computation
IS - 3
ER -