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Invariant measures of actions of amenable monotileable groups on the Cantor set
(2017)
The set of invariant probability measures of a continuous action of an amenable group on a compact metric
space is a (non empty) metrizable Choquet simplex. A natural question is to know if the converse is true, i.e, if ...
Chain control sets for semigroup actions
(Soc Brasileira Matematica Aplicada & ComputacionalSao Carlos SpBrasil, 1996)
Free actions of abelian p-groups on the n-Torus
(2005-01-01)
In this work we make some contributions to the theory of actions of abelian p-groups on the n-Torus Tn. Set H ≅ ℤpk1 h1 × ℤpk2h2 × ⋯ × ℤpkrhr, r ≥ 1, k1 ≥ k2 ≥ ⋯ ≥ kr ≥ 1, p prime. Suppose that the group H acts freely on ...
INVARIANT CONTROL SETS ON FLAG MANIFOLDS
(Springer-verlag London LtdGodalmingInglaterra, 1993)
Adapted hyperbolic polygons and symplectic representations for group actions on Riemann surfaces
(Elsevier, 2013-03)
We prove that given a finite group G together with a set of fixed geometric generators, there is a family of special hyperbolic polygons that uniformize the Riemann surfaces admitting the action of G with the given geometric ...
Group actions on Jacobian varieties
(Universidad Autonoma de Madrid, 2007)
Consider a finite group G acting on a Riemann surface S, and the associated branched Galois cover πG : S → Y = S/G. We introduce the concept of geometric signature for the action of G, and we show that it captures much ...
Free actions of abelian p-groups on the n-torus
(Univ Houston, 2005-01-01)
In this work we make some contributions to the theory of actions of abelian p-groups on the n-Torus T-n. Set congruent to Z(pk1)(h1) x Z(pk2)(h2) x...x Z(pkr)(hr), r >= 1, k(1) >= k(2) >=...>= k(r) >= 1, p prime. Suppose ...
Free actions of abelian p-groups on the n-torus
(Univ Houston, 2005-01-01)
In this work we make some contributions to the theory of actions of abelian p-groups on the n-Torus T-n. Set congruent to Z(pk1)(h1) x Z(pk2)(h2) x...x Z(pkr)(hr), r >= 1, k(1) >= k(2) >=...>= k(r) >= 1, p prime. Suppose ...