We give a simple construction for hyperelliptic varieties, defined as the quotient of a complex torus by the action of a finite group $G$ that contains no translations and acts freely, with $G$ any dihedral group. This generalizes a construction given by Catanese and Demleitner for $D_4$ in dimension three
44 pages. Main paper by the first three authors, appendix by the fourth authorWe introduce Property ...
AbstractExotic actions of dihedral groups on S2k+1 are constructed using 3-dimensional techniques
We construct a non-abelian extension of S1 by Z/3 × Z/3, and prove that acts freely and smoothly o...
A hyperelliptic variety is by definition a complex projective variety, not isomorphic to an abelian ...
AbstractWe use group representation theory to study free actions by finite groups on spaces with non...
We consider actions of automorphism groups of free groups by semisimple isometries on complete CAT(0...
AbstractThe actions of certain nonamenable groups on the Lebesgue space are studied. An example is c...
AbstractWe classify free actions of finite groups on the 3-torus, up to topological conjugacy. By wo...
In this paper we introduce a new invariant for the action of a finite group G on a compact complex c...
AbstractThe action of a complex algebraic groupGon an affine varietyVis said to be multiplicity free...
AbstractLet us consider an abelian variety defined over Qℓ with good supersingular reduction. In thi...
AbstractThe actions of certain nonamenable groups on the Lebesgue space are studied. An example is c...
We study groups acting on simply connected cubical complexes of nonpositive curvature. Our main obje...
Extending work of Bielawski-Dancer [3] and Konno [14], we develop a theory of toric hyperkähler vari...
International audienceWe study algebraic actions of finite groups of quiver automorphisms on moduli ...
44 pages. Main paper by the first three authors, appendix by the fourth authorWe introduce Property ...
AbstractExotic actions of dihedral groups on S2k+1 are constructed using 3-dimensional techniques
We construct a non-abelian extension of S1 by Z/3 × Z/3, and prove that acts freely and smoothly o...
A hyperelliptic variety is by definition a complex projective variety, not isomorphic to an abelian ...
AbstractWe use group representation theory to study free actions by finite groups on spaces with non...
We consider actions of automorphism groups of free groups by semisimple isometries on complete CAT(0...
AbstractThe actions of certain nonamenable groups on the Lebesgue space are studied. An example is c...
AbstractWe classify free actions of finite groups on the 3-torus, up to topological conjugacy. By wo...
In this paper we introduce a new invariant for the action of a finite group G on a compact complex c...
AbstractThe action of a complex algebraic groupGon an affine varietyVis said to be multiplicity free...
AbstractLet us consider an abelian variety defined over Qℓ with good supersingular reduction. In thi...
AbstractThe actions of certain nonamenable groups on the Lebesgue space are studied. An example is c...
We study groups acting on simply connected cubical complexes of nonpositive curvature. Our main obje...
Extending work of Bielawski-Dancer [3] and Konno [14], we develop a theory of toric hyperkähler vari...
International audienceWe study algebraic actions of finite groups of quiver automorphisms on moduli ...
44 pages. Main paper by the first three authors, appendix by the fourth authorWe introduce Property ...
AbstractExotic actions of dihedral groups on S2k+1 are constructed using 3-dimensional techniques
We construct a non-abelian extension of S1 by Z/3 × Z/3, and prove that acts freely and smoothly o...
DOI
Add to ORKG