共 50 条
- [31] ALMOST ABELIAN LIE GROUPS, SUBGROUPS AND QUOTIENTS[J]. Journal of Mathematical Sciences, 2022, 266 (1) : 42 - 65Rios M.A.Avetisyan Z.Berlow K.Martin I.Rakholia G.Yang K.Zhang H.Zhao Z.
- [32] Profinite groups in which centralizers are abelian[J]. Israel Journal of Mathematics, 2019, 230 : 831 - 854Pavel ShumyatskyPavel ZalesskiiTheo Zapata
- [33] Profinite groups in which centralizers are abelian[J]. ISRAEL JOURNAL OF MATHEMATICS, 2019, 230 (02) : 831 - 854Shumyatsky, PavelZalesskii, PavelZapata, Theo
- [34] On Lie algebras all nilpotent subalgebras of which are Abelian[J]. JOURNAL OF MATHEMATICAL PHYSICS, 1999, 40 (08) : 4151 - 4156Dallmer, E
- [35] 2-PRIMARY COMPONENTS OF HOMOTOPY GROUPS OF SOME LIE GROUPS[J]. PROCEEDINGS OF THE JAPAN ACADEMY, 1962, 38 (06): : 235 - &OGUCHI, K
- [36] HOMOTOPY GROUPS OF THE SPACES OF SELF-MAPS OF LIE GROUPS II[J]. KODAI MATHEMATICAL JOURNAL, 2009, 32 (03) : 530 - 546Oshima, KatsumiOshima, Hideaki
- [37] ODD PRIMARY HOMOTOPY TYPES OF THE GAUGE GROUPS OF EXCEPTIONAL LIE GROUPS[J]. PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY, 2019, 147 (04) : 1751 - 1762Hasui, ShoKishimoto, DaisukeSo, TseleungTheriault, Stephen
- [38] 2-PRIMARY COMPONENTS OF HOMOTOPY GROUPS OF SPHERES AND LIE GROUPS[J]. PROCEEDINGS OF THE JAPAN ACADEMY, 1962, 38 (09): : 619 - &OGUCHI, K
- [39] ON GROUPS WHICH ARE THE PRODUCT OF 2 ABELIAN-GROUPS[J]. JOURNAL OF THE LONDON MATHEMATICAL SOCIETY-SECOND SERIES, 1984, 29 (JUN): : 453 - 461HOLT, DFHOWLETT, RB
- [40] Homotopy nilpotent Lie groups have no torsion in homology[J]. MANUSCRIPTA MATHEMATICA, 1997, 92 (04) : 455 - 462Rao, VK