Results 301 to 310 of about 1,175,469 (335)
Some of the next articles are maybe not open access.
1973
In this chapter we study the periodic (that is, torsion) subgroups of GL(n, F). For most of the chapter we are interested in the conjugacy of the maximal π-subgroups in various situations. For example we prove extensions of the Sylow and Schur-Zassenhaus Theorems to the class of periodic linear groups.
openaire +1 more source
In this chapter we study the periodic (that is, torsion) subgroups of GL(n, F). For most of the chapter we are interested in the conjugacy of the maximal π-subgroups in various situations. For example we prove extensions of the Sylow and Schur-Zassenhaus Theorems to the class of periodic linear groups.
openaire +1 more source
Periodic Endomorphisms of Polycyclic Groups
Mediterranean Journal of Mathematics, 2010Let \(G\) be a polycyclic group. It is a well known fact that any periodic subgroup of \(\Aut(G)\) is finite; on the other hand a semigroup of periodic endomorphisms of \(G\) need not be finite (an element \(\sigma\) of a semigroup \(\Sigma\) is said to be periodic if the semigroup \(\langle\sigma\rangle\) generated by \(\sigma\) is finite; the order ...
openaire +1 more source
Proceedings of the London Mathematical Society, 1979
Hickin, Kenneth K., Phillips, Richard E.
openaire +2 more sources
Hickin, Kenneth K., Phillips, Richard E.
openaire +2 more sources
On quasiresolvent periodic abelian groups
Siberian Mathematical Journal, 2007Summary: This is a continuation of the author's paper [Algebra Logika 43, No. 5, 614-628 (2004; Zbl 1095.03022); translation in Algebra Logic 43, No. 5, 346-354 (2004)]. We introduce the concept of a primarily quasiresolvent periodic Abelian group and describe primarily quasiresolvent and 1-quasiresolvent periodic Abelian groups.
openaire +2 more sources
Research groups, library resources, periodicals
Socialism and Democracy, 1991(1991). Research groups, library resources, periodicals. Socialism and Democracy: Vol. 7, No. 3, pp. 185-192.
openaire +1 more source
Periodic nanostructures: preparation, properties and applications
Chemical Society Reviews, 2021Hang Yin, Kaijian Xing, Yurou Zhang
exaly
Exclusively Relativistic: Periodic Trends in the Melting and Boiling Points of Group 12
Angewandte Chemie - International Edition, 2021Jan-Michael Mewes, Peter Schwerdtfeger
exaly