If N is a simply connected real nilpotent Lie group with a Γ-rational complex structure, where Γ is a lattice in N, then for each s, t.We study relations between invariant complex structures and Hodge numbers of compact nilmanifolds from a viewpoint of Lie algberas
AbstractLet g0 be a connected Lie group whose Lie algebra g0 is a simple exceptional non-compact rea...
AbstractLet G be a nilpotent, connected, and simply connected real Lie group and let Γ be a lattice ...
AbstractWe give a geometric slice-like characterization for the vanishing of Milnor's link invariant...
summary:Let $(N, J)$ be a simply connected $2n$-dimensional nilpotent Lie group endowed with an inva...
A compact K¨ahlerian manifoldM of dimension n satisfies hp,q(M) = hq,p(M) for each p, q.However, a c...
We consider the correspondence between nilmanifolds and Lie algebras with rational basis, and we def...
Let G be a connected and simply connected two-step nilpotent Lie group and Γ a lattice subgroup of G...
Le G be a real Nilpotent, connected and simply connected Lie group. If H is lattice in G, we study t...
Este artículo presenta un panorama de algunos resultados recientes sobre estructuras complejas nilpo...
The set of homotopy classes of self maps of a compact, connected Lie group G is a group by the point...
We study invariant Abelian hypercomplex structures on 8-dimensional nilpotent Lie groups. We prove t...
AbstractLet N be a connected, simply connected nilpotent Lie group with center Z. Let U be an irredu...
Let G be a nilpotent Lie group and Γ a discrete cocompact sub-group of G. A basic problem in harmoni...
We study \emph{pureness} and \emph{fullness} of invariant complex structures on nilmanifolds. We pro...
La géométrie complexe généralisée est une généralisation de la géométrie complexe obtenue en considé...
AbstractLet g0 be a connected Lie group whose Lie algebra g0 is a simple exceptional non-compact rea...
AbstractLet G be a nilpotent, connected, and simply connected real Lie group and let Γ be a lattice ...
AbstractWe give a geometric slice-like characterization for the vanishing of Milnor's link invariant...
summary:Let $(N, J)$ be a simply connected $2n$-dimensional nilpotent Lie group endowed with an inva...
A compact K¨ahlerian manifoldM of dimension n satisfies hp,q(M) = hq,p(M) for each p, q.However, a c...
We consider the correspondence between nilmanifolds and Lie algebras with rational basis, and we def...
Let G be a connected and simply connected two-step nilpotent Lie group and Γ a lattice subgroup of G...
Le G be a real Nilpotent, connected and simply connected Lie group. If H is lattice in G, we study t...
Este artículo presenta un panorama de algunos resultados recientes sobre estructuras complejas nilpo...
The set of homotopy classes of self maps of a compact, connected Lie group G is a group by the point...
We study invariant Abelian hypercomplex structures on 8-dimensional nilpotent Lie groups. We prove t...
AbstractLet N be a connected, simply connected nilpotent Lie group with center Z. Let U be an irredu...
Let G be a nilpotent Lie group and Γ a discrete cocompact sub-group of G. A basic problem in harmoni...
We study \emph{pureness} and \emph{fullness} of invariant complex structures on nilmanifolds. We pro...
La géométrie complexe généralisée est une généralisation de la géométrie complexe obtenue en considé...
AbstractLet g0 be a connected Lie group whose Lie algebra g0 is a simple exceptional non-compact rea...
AbstractLet G be a nilpotent, connected, and simply connected real Lie group and let Γ be a lattice ...
AbstractWe give a geometric slice-like characterization for the vanishing of Milnor's link invariant...
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