Add to ORKGWe prove a generalization of a convexity theorem for semisimple symmetric spaces G/H established earlier in 1986 by the second named author. The latter result generalized Kostant's non-linear convexity theorem for the Iwasawa decomposition of a real semisimple Lie group. The present generalization involves Iwasawa decompositions related to minimal parabolic subgroups of G of arbitrary type instead of the particular type relative to H considered in 1986
We investigate the Schur harmonic convexity for two classes of symmetric functions and the Schur mul...
This second topic will deal with some forms of rigidity of lattices in semisimple Lie groups with no...
In this dissertation, we identify a subgroup Tˢ of Dˢ(μ), the group of Sobolev symplectomorphisms of...
We prove a generalization of a convexity theorem for semisimple symmetric spaces G/H established ear...
In this paper we prove a generalization of the convexity theorem in [3] for a symmetric space G/H. H...
This thesis is a thesis in Lie theory. The thesis is split into two parts. The first part classifies...
Let X = G=H be a homogeneous space of a Lie group G, and let D : C 1 (X) ! C 1 (X) be a non-trivial ...
The thesis contains a structure theory for semisimple symmetric spaces with applications to related ...
AbstractFor every fixed Riemannian symmetric space (M̃,g̃) we determine explicitly all locally non-h...
This is a monograph on convexity properties of moment mappings in symplectic geometry. The fundament...
none2noA characterization of convex functions in RN states that an upper semicontinuous function u i...
Given a complex semisimple Lie algebra g = k+ ik, we consider the converse question of Kostant’s con...
Introduction. Let G=H be a semisimple symmetric space, where G is a connected semisimple Lie group p...
Abstract. We prove several superrigidity results for isometric actions on Busemann non-positively cu...
AbstractIn this paper we generalize the linear Kostant Convexity Theorem to Lie algebras of bounded ...
We investigate the Schur harmonic convexity for two classes of symmetric functions and the Schur mul...
This second topic will deal with some forms of rigidity of lattices in semisimple Lie groups with no...
In this dissertation, we identify a subgroup Tˢ of Dˢ(μ), the group of Sobolev symplectomorphisms of...
We prove a generalization of a convexity theorem for semisimple symmetric spaces G/H established ear...
In this paper we prove a generalization of the convexity theorem in [3] for a symmetric space G/H. H...
This thesis is a thesis in Lie theory. The thesis is split into two parts. The first part classifies...
Let X = G=H be a homogeneous space of a Lie group G, and let D : C 1 (X) ! C 1 (X) be a non-trivial ...
The thesis contains a structure theory for semisimple symmetric spaces with applications to related ...
AbstractFor every fixed Riemannian symmetric space (M̃,g̃) we determine explicitly all locally non-h...
This is a monograph on convexity properties of moment mappings in symplectic geometry. The fundament...
none2noA characterization of convex functions in RN states that an upper semicontinuous function u i...
Given a complex semisimple Lie algebra g = k+ ik, we consider the converse question of Kostant’s con...
Introduction. Let G=H be a semisimple symmetric space, where G is a connected semisimple Lie group p...
Abstract. We prove several superrigidity results for isometric actions on Busemann non-positively cu...
AbstractIn this paper we generalize the linear Kostant Convexity Theorem to Lie algebras of bounded ...
We investigate the Schur harmonic convexity for two classes of symmetric functions and the Schur mul...
This second topic will deal with some forms of rigidity of lattices in semisimple Lie groups with no...
In this dissertation, we identify a subgroup Tˢ of Dˢ(μ), the group of Sobolev symplectomorphisms of...
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