Ergodic theory and the duality principle on homogeneous spaces

Alexander Gorodnik; Amos Nevo

doi:10.1007/s00039-014-0257-8

Ergodic theory and the duality principle on homogeneous spaces

Alexander Gorodnik^*, Amos Nevo

^*Corresponding author for this work

Research output: Contribution to journal › Article (Academic Journal) › peer-review

8 Citations (Scopus)

Abstract

We prove mean and pointwise ergodic theorems for the action of a lattice subgroup in a connected algebraic Lie group on infinite volume homogeneous algebraic varieties. Under suitable necessary conditions, our results are quantitative, namely we establish rates of convergence in the mean and pointwise ergodic theorems, which can be estimated explicitly. Our results give a precise and in most cases optimal quantitative form to the duality principle governing dynamics on homogeneous spaces. We illustrate their scope in a variety of equidistribution problems.

Original language	English
Pages (from-to)	159-244
Number of pages	86
Journal	Geometric and Functional Analysis
Volume	24
Issue number	1
DOIs	https://doi.org/10.1007/s00039-014-0257-8
Publication status	Published - 5 Feb 2014

Keywords

COUNTING LATTICE POINTS
PERIODIC LORENTZ GAS
DIOPHANTINE APPROXIMATION
FURSTENBERG BOUNDARY
HOROSPHERICAL FLOWS
LINEAR-GROUPS
LIE-GROUPS
ORBITS
EQUIDISTRIBUTION
VARIETIES

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title = "Ergodic theory and the duality principle on homogeneous spaces",

abstract = "We prove mean and pointwise ergodic theorems for the action of a lattice subgroup in a connected algebraic Lie group on infinite volume homogeneous algebraic varieties. Under suitable necessary conditions, our results are quantitative, namely we establish rates of convergence in the mean and pointwise ergodic theorems, which can be estimated explicitly. Our results give a precise and in most cases optimal quantitative form to the duality principle governing dynamics on homogeneous spaces. We illustrate their scope in a variety of equidistribution problems.",

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author = "Alexander Gorodnik and Amos Nevo",

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doi = "10.1007/s00039-014-0257-8",

language = "English",

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journal = "Geometric and Functional Analysis",

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TY - JOUR

T1 - Ergodic theory and the duality principle on homogeneous spaces

AU - Gorodnik, Alexander

AU - Nevo, Amos

PY - 2014/2/5

Y1 - 2014/2/5

N2 - We prove mean and pointwise ergodic theorems for the action of a lattice subgroup in a connected algebraic Lie group on infinite volume homogeneous algebraic varieties. Under suitable necessary conditions, our results are quantitative, namely we establish rates of convergence in the mean and pointwise ergodic theorems, which can be estimated explicitly. Our results give a precise and in most cases optimal quantitative form to the duality principle governing dynamics on homogeneous spaces. We illustrate their scope in a variety of equidistribution problems.

AB - We prove mean and pointwise ergodic theorems for the action of a lattice subgroup in a connected algebraic Lie group on infinite volume homogeneous algebraic varieties. Under suitable necessary conditions, our results are quantitative, namely we establish rates of convergence in the mean and pointwise ergodic theorems, which can be estimated explicitly. Our results give a precise and in most cases optimal quantitative form to the duality principle governing dynamics on homogeneous spaces. We illustrate their scope in a variety of equidistribution problems.

KW - COUNTING LATTICE POINTS

KW - PERIODIC LORENTZ GAS

KW - DIOPHANTINE APPROXIMATION

KW - FURSTENBERG BOUNDARY

KW - HOROSPHERICAL FLOWS

KW - LINEAR-GROUPS

KW - LIE-GROUPS

KW - ORBITS

KW - EQUIDISTRIBUTION

KW - VARIETIES

U2 - 10.1007/s00039-014-0257-8

DO - 10.1007/s00039-014-0257-8

M3 - Article (Academic Journal)

SN - 1016-443X

VL - 24

SP - 159

EP - 244

JO - Geometric and Functional Analysis

JF - Geometric and Functional Analysis

IS - 1

ER -

Ergodic theory and the duality principle on homogeneous spaces

Abstract

Keywords

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