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An ‘almost all versus no’ dichotomy in homogeneous dynamics and Diophantine approximation
Journal article   Peer reviewed

An ‘almost all versus no’ dichotomy in homogeneous dynamics and Diophantine approximation

Dmitry Kleinbock
Geometriae dedicata, Vol.149(1), pp.205-218
02/27/2010

Abstract

Algebraic Geometry Convex and Discrete Geometry Hyperbolic Geometry Mathematics and Statistics Original Paper Projective Geometry Differential Geometry Mathematics Topology
Let Y0 be a not very well approximable m×n matrix, and let be a connected analytic submanifold in the space of m×n matrices containing Y0 . Then almost all are not very well approximable. This and other similar statements are cast in terms of properties of certain orbits on homogeneous spaces and deduced from quantitative nondivergence estimates for‘quasi-polynomial’ flows on the space of lattices.

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