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On monotone permutations of -cyclically ordered sets

Ján Jakubík (2006)

Czechoslovak Mathematical Journal

For an -cyclically ordered set M with the -cyclic order C let P ( M ) be the set of all monotone permutations on M . We define a ternary relation C ¯ on the set P ( M ) . Further, we define in a natural way a group operation (denoted by · ) on P ( M ) . We prove that if the -cyclic order C is complete and C ¯ , then ( P ( M ) , · , C ¯ ) is a half cyclically ordered group.

On some interpolation rules for lattice ordered groups

Ján Jakubík (2004)

Czechoslovak Mathematical Journal

Let α be an infinite cardinal. In this paper we define an interpolation rule I R ( α ) for lattice ordered groups. We denote by C ( α ) the class of all lattice ordered groups satisfying I R ( α ) , and prove that C ( α ) is a radical class.

On the dynamics of (left) orderable groups

Andrés Navas (2010)

Annales de l’institut Fourier

We develop dynamical methods for studying left-orderable groups as well as the spaces of orderings associated to them. We give new and elementary proofs of theorems by Linnell (if a left-orderable group has infinitely many orderings, then it has uncountably many) and McCleary (the space of orderings of the free group is a Cantor set). We show that this last result also holds for countable torsion-free nilpotent groups which are not rank-one Abelian. Finally, we apply our methods to the case of braid...

Currently displaying 201 – 220 of 449