On overgroups of regular abelian p-groupsDobson, Edward (Avtor)
group theorygraph theoryCayley graphabelian groupregular groupp-groupLet ▫$G$▫ be a transitive group of odd prime-power degree whose Sylow ▫$p$▫-subgroup ▫$P$▫ is abelian od rank ▫$t$▫. Weshow that if ▫$p > 2^{t-1}$▫, then ▫$G$▫ has a normal subgroup that is a direct product of ▫$t$▫ permutation groups of smaller degree that are either cyclic or doubly-transitive simple groups. As a consequence, we determine the full automorphism group of a Cayley diagraph of an abelian group with rank two such that the Sylow ▫$p$▫-subgroup of the full automorphism group is abelian.20092013-10-15 12:09:58Delo ni kategorizirano4301ISSN: 1855-3966UDK: 512.54:519.17COBISS.SI-ID: 15159641sl