Permutation Groups with Bounded Movement having Maximum Orbits
islamic azad univ.talesh
L.Brailovsky, Structure of quasi-invariant sets,Arch.Math.,59(1992),322-326.
L.Brailovsky, D.Pasechnix , C.E.Praeger, Subsets close to invarianr sub-set of quasi-invariant subsets for group actions ,,Proc.Amer. Math.Soc.,123(1995),2283-2295.
C.E.Praeger,On permutation groups with bounded movement,J.Algebra,144(1991),436-442.
C.E.Praeger, The separation theorem for group actions, in ”orderedGroups and Infinite Groups”(W.charles Holland, Ed.),Kluwer Academic,Dordrecht/ Boston/ Lond, 1995.
A.Hassani,M.Khayaty,E.I.Khukhro and C.E.Praeger, Transitive permu-tation groups with bounded movement having maximum degree.J.Algebra,214(1999),317-337.
J.R.Cho, P.S.Kim, and C.E.Praeger, The maximal number of orbits of apermutation Group with Bounded Movement,J.Algebra,214(1999),625-630.
P.M.Neumann, The structure of finitary Permutation groups,Arch. Math.(Basel)27(1976),3-17.
B.H.Neumann, Groups covered by permutable subsets,J. London Mathsoc.,29(1954), 236-248.
P.M.Neumann, C.E.Praeger, On the Movement of permutation Group,J.Algebra,214, (1999)631-635
Copyright (c) 2019 Behname Razzaghmaneshi, Mehdi Alaeiyan
This work is licensed under a Creative Commons Attribution 4.0 International License.
Authors retain the copyright of their manuscripts, and all Open Access articles are distributed under the terms of the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided that the original work is properly cited.