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Poisson homogeneous spaces
 Quantum groups (Karpacz
, 1994
"... General framework for Poisson homogeneous spaces of Poisson groups is introduced. Poisson Minkowski spaces are discussed as a particular example. ..."
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Cited by 9 (1 self)
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General framework for Poisson homogeneous spaces of Poisson groups is introduced. Poisson Minkowski spaces are discussed as a particular example.
ON AFFINELY CLOSED HOMOGENEOUS SPACES
, 2004
"... Abstract. Affinely closed homogeneous spaces G/H, i.e., affine homogeneous spaces that admit only the trivial affine embedding, are characterized for any affine algebraic group G. As a corollary, a description of affine Galgebras with finitely generated invariant subalgebras is obtained. 1. ..."
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Abstract. Affinely closed homogeneous spaces G/H, i.e., affine homogeneous spaces that admit only the trivial affine embedding, are characterized for any affine algebraic group G. As a corollary, a description of affine Galgebras with finitely generated invariant subalgebras is obtained. 1.
NONFORMAL HOMOGENEOUS SPACES
"... Abstract. Several large classes of homogeneous spaces are known to be formal—in the sense of Rational Homotopy Theory. However, it seems that far fewer examples of nonformal homogeneous spaces are known. In this article we provide several construction principles and characterisations for nonforma ..."
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Cited by 1 (1 self)
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Abstract. Several large classes of homogeneous spaces are known to be formal—in the sense of Rational Homotopy Theory. However, it seems that far fewer examples of nonformal homogeneous spaces are known. In this article we provide several construction principles and characterisations for non
Matrix models in homogeneous spaces
 Nucl. Phys. B
, 2002
"... We investigate noncommutative gauge theories in homogeneous spaces G/H. We construct such theories by adding cubic terms to IIB matrix model which contain the structure constants of G. The isometry of a homogeneous space, G must be a subgroup of SO(10) in our construction. We investigate CP 2 = SU( ..."
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Cited by 29 (2 self)
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We investigate noncommutative gauge theories in homogeneous spaces G/H. We construct such theories by adding cubic terms to IIB matrix model which contain the structure constants of G. The isometry of a homogeneous space, G must be a subgroup of SO(10) in our construction. We investigate CP 2 = SU
in Banach space on Homogeneous space
, 2008
"... The intimate connection between the Banach space wavelet reconstruction method on homogeneous spaces with both singular and nonsingular vacuum vectors, and some of well known quantum tomographies, such as: Moyalrepresentation for a spin, discrete phase space tomography, tomography of a free particl ..."
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The intimate connection between the Banach space wavelet reconstruction method on homogeneous spaces with both singular and nonsingular vacuum vectors, and some of well known quantum tomographies, such as: Moyalrepresentation for a spin, discrete phase space tomography, tomography of a free
EQUIVARIANT EMBEDDINGS OF HOMOGENEOUS SPACES
"... Abstract. Homogeneous spaces of algebraic groups naturally arise in various problems of geometry and representation theory. The same reasons that motivate considering projective spaces instead of affine spaces (e.g. solutions “at infinity ” of systems of algebraic equations) stimulate the study of c ..."
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Abstract. Homogeneous spaces of algebraic groups naturally arise in various problems of geometry and representation theory. The same reasons that motivate considering projective spaces instead of affine spaces (e.g. solutions “at infinity ” of systems of algebraic equations) stimulate the study
Rigidity of rational homogeneous spaces
 International Congress of Mathematicians
, 2006
"... Abstract. Rigidity questions on rational homogeneous spaces arise naturally as higher dimensional generalizations of Riemann’s uniformization theorem in one complex variable. We will give an overview of some results obtained in this area by the study of minimal rational curves and geometric structu ..."
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Cited by 14 (0 self)
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Abstract. Rigidity questions on rational homogeneous spaces arise naturally as higher dimensional generalizations of Riemann’s uniformization theorem in one complex variable. We will give an overview of some results obtained in this area by the study of minimal rational curves and geometric
Ergodic theory on homogeneous spaces . . .
, 2007
"... This article gives a brief overview of recent developments in metric number theory, in particular, Diophantine approximation on manifolds, obtained by applying ideas and methods coming from dynamics on homogeneous spaces. ..."
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This article gives a brief overview of recent developments in metric number theory, in particular, Diophantine approximation on manifolds, obtained by applying ideas and methods coming from dynamics on homogeneous spaces.
Results 1  10
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405,670