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<!DOCTYPE file SYSTEM "bibxmlext.dtd"> <file> <string key="berlin" value="Berlin, Heidelberg, New York"/> <string key="grund" value="Grund. Math. Wiss."/> <string key="jalg" value="J. Algebra"/> <string key="springer" value="Springer"/> <entry id="BallesterBeidlemanCosseyEstebanRaglandSchmidt09"><article> <author> <name><first>A.</first><last>Ballester-Bolinches</last></name> <name><first>J. C.</first><last>Beidleman</last></name> <name><first>J.</first><last>Cossey</last></name> <name><first>R.</first><last>Esteban-Romero</last></name> <name><first>M. F.</first><last>Ragland</last></name> <name><first>J.</first><last>Schmidt</last></name> </author> <title>Permutable subnormal subgroups of finite groups</title> <journal>Arch. Math.</journal> <year>2009</year> <volume>92</volume> <pages>549-557</pages> </article></entry> <entry id="BallesterBeidlemanHeineken03-commalg"><article> <author> <name><first>A.</first><last>Ballester-Bolinches</last></name> <name><first>J. C.</first><last>Beidleman</last></name> <name><first>H.</first><last>Heineken</last></name> </author> <title>A local approach to certain classes of finite groups</title> <journal>Comm. Algebra</journal> <year>2003</year> <volume>31</volume> <number>12</number> <pages>5931-5942</pages> </article></entry> <entry id="BallesterBeidlemanHeineken03-illinois"><article> <author> <name><first>A.</first><last>Ballester-Bolinches</last></name> <name><first>J. C.</first><last>Beidleman</last></name> <name><first>H.</first><last>Heineken</last></name> </author> <title>Groups in which <C>S</C>ylow subgroups and subnormal subgroups permute</title> <journal>Illinois J. Math</journal> <year>2003</year> <volume>47</volume> <number>1-2</number> <pages>63-69</pages> </article></entry> <entry id="BallesterBeidlemanHeineken03"><article> <author> <name><first>A.</first><last>Ballester-Bolinches</last></name> <name><first>J. C.</first><last>Beidleman</last></name> <name><first>H.</first><last>Heineken</last></name> </author> <title>A local approach to certain classes of finite groups</title> <journal>Comm. Algebra</journal> <year>2003</year> <volume>31</volume> <number>12</number> <pages>5931-5942</pages> </article></entry> <entry id="BallesterEsteban02-sylper1"><article> <author> <name><first>A.</first><last>Ballester-Bolinches</last></name> <name><first>R.</first><last>Esteban-Romero</last></name> </author> <title><C>S</C>ylow permutable subnormal subgroups of finite groups</title> <journal><value key="jalg"/></journal> <year>2002</year> <volume>251</volume> <number>2</number> <pages>727-738</pages> </article></entry> <entry id="BallesterEstebanAsaad10"><book> <author> <name><first>A.</first><last>Ballester-Bolinches</last></name> <name><first>R.</first><last>Esteban-Romero</last></name> <name><first>M.</first><last>Asaad</last></name> </author> <title>Products of finite groups</title> <publisher>Walter de Gruyter</publisher> <year>2010</year> <address>Berlin</address> </book></entry> <entry id="BallesterCosmeEsteban13-cejm"><article> <author> <name><first>A.</first><last>Ballester-Bolinches</last></name> <name><first>E.</first><last>Cosme-Llópez</last></name> <name><first>R.</first><last>Esteban-Romero</last></name> </author> <title>Algorithms for permutability in finite groups</title> <journal>Cent. Eur. J. Math.</journal> <year>2013</year> <volume>11</volume> <number>11</number> <pages>1914-1922</pages> </article></entry> <entry id="BallesterEstebanRagland07"><article> <author> <name><first>A.</first><last>Ballester-Bolinches</last></name> <name><first>R.</first><last>Esteban-Romero</last></name> <name><first>M.</first><last>Ragland</last></name> </author> <title>A note on finite <C>PST</C>-groups</title> <journal>J. Group Theory</journal> <year>2007</year> <volume>10</volume> <number>2</number> <pages>205-210</pages> </article></entry> <entry id="BallesterEstebanRagland09"><article> <author> <name><first>A.</first><last>Ballester-Bolinches</last></name> <name><first>R.</first><last>Esteban-Romero</last></name> <name><first>M.</first><last>Ragland</last></name> </author> <title>Corrigendum: A note on finite <C>PST</C>-groups</title> <journal>J. Group Theory</journal> <year>2009</year> <volume>12</volume> <number>6</number> <pages>961-963</pages> </article></entry> <entry id="BeidlemanBrewsterRobinson99"><article> <author> <name><first>J. C.</first><last>Beidleman</last></name> <name><first>B.</first><last>Brewster</last></name> <name><first>D. J. S.</first><last>Robinson</last></name> </author> <title>Criteria for Permutability to Be Transitive in Finite Groups</title> <journal><value key="jalg"/></journal> <year>1999</year> <volume>222</volume> <number>2</number> <pages>400-412</pages> </article></entry> <entry id="BeidlemanHeineken03-jgt"><article> <author> <name><first>J. C.</first><last>Beidleman</last></name> <name><first>H.</first><last>Heineken</last></name> </author> <title>Finite soluble groups whose subnormal subgroups permute with certain classes of subgroups</title> <journal>J. Group Theory</journal> <year>2003</year> <volume>6</volume> <number>2</number> <pages>139-158</pages> <keywords>{PST-groups; subnormal subgroups; Carter subgroups; hypercentrally embedded subgroups}</keywords> <other type="classmath">{*20D10 Solvable finite groups 20D35 Subnormal subgroups of finite groups 20D40 Products of subgroups of finite groups}</other> <other type="reviewer">{Hans Lausch (Clayton)}</other> </article></entry> <entry id="Deskins63"><article> <author> <name><first>W. E.</first><last>Deskins</last></name> </author> <title>On quasinormal subgroups of finite groups</title> <journal>Math. Z.</journal> <year>1963</year> <volume>82</volume> <pages>125-132</pages> </article></entry> <entry id="Foguel97"><article> <author> <name><first>T.</first><last>Foguel</last></name> </author> <title>Conjugate-permutable subgroups</title> <journal><value key="jalg"/></journal> <year>1997</year> <volume>191</volume> <pages>235-239</pages> </article></entry> <entry id="Huppert67"><book> <author> <name><first>B.</first><last>Huppert</last></name> </author> <title><C>E</C>ndliche <C>G</C>ruppen <C>I</C></title> <publisher><value key="springer"/></publisher> <year>1967</year> <volume>134</volume> <series><value key="grund"/></series> <address><value key="berlin"/></address> </book></entry> <entry id="Kegel62"><article> <author> <name><first>O. H.</first><last>Kegel</last></name> </author> <title><C>S</C>ylow-<C>G</C>ruppen und <C>S</C>ubnormalteiler endlicher <C>G</C>ruppen</title> <journal>Math. Z.</journal> <year>1962</year> <volume>78</volume> <pages>205-221</pages> </article></entry> <entry id="MaierSchmid73"><article> <author> <name><first>R.</first><last>Maier</last></name> <name><first>P.</first><last>Schmid</last></name> </author> <title>The Embedding of Quasinormal Subgroups in Finite Groups</title> <journal>Math. Z.</journal> <year>1973</year> <volume>131</volume> <pages>269-272</pages> </article></entry> <entry id="Robinson68"><article> <author> <name><first>D. J. S.</first><last>Robinson</last></name> </author> <title>A note on finite groups in which normality is transitive</title> <journal>Proc. Amer. Math. Soc.</journal> <year>1968</year> <volume>19</volume> <pages>933-937</pages> </article></entry> <entry id="Schmidt94"><book> <author> <name><first>R.</first><last>Schmidt</last></name> </author> <title>Subgroup lattices of groups</title> <publisher>Walter de Gruyter</publisher> <year>1994</year> <volume>14</volume> <series>De Gruyter Expositions in Mathematics</series> <address>Berlin</address> <isbn>3110112132</isbn> <keywords>{modular lattices; complements; projectivities; subgroup lattices; lattices of normal subgroups; lattices of subnormal subgroups; lattices of centralizers; lattices of cosets}</keywords> <other type="classmath">{*20-02 Research monographs (group theory) 20E15 Chains and lattices of subgroups of groups 20D30 Series and lattices of subgroups of finite groups 06B15 Representation theory of lattices}</other> <other type="reviewer">{H.Heineken (Würzburg)}</other> </book></entry> <entry id="Schmid98"><article> <author> <name><first>P.</first><last>Schmid</last></name> </author> <title>Subgroups Permutable with All <C>S</C>ylow Subgroups</title> <journal><value key="jalg"/></journal> <year>1998</year> <volume>207</volume> <pages>285-293</pages> </article></entry> <entry id="EickWright03-FORMAT"><manual> <author> <name><first>B.</first><last>Eick</last></name> <name><first>C. R. B.</first><last>Wright</last></name> </author> <title>GAP package FORMAT --- Computing with formations of finite solvable groups v.~1.3</title> <year>2003</year> <note>Available on <URL>https://www.uoregon.edu/~wright/RESEARCH/format/</URL> (last visited 30th July 2015)</note> </manual></entry> </file> ¤ Dauer der Verarbeitung: 0.12 Sekunden (vorverarbeitet) ¤*© Formatika GbR, Deutschland |
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2026-03-28