Abstract
The aim of the present paper is to derive effective discrepancy estimates for the distribution of rational points on general semisimple algebraic group varieties, in general families of subsets and at arbitrarily small scales. We establish mean-square, almost sure and uniform estimates for the discrepancy with explicit error bounds. We also prove an analogue of W. Schmidt's theorem, which establishes effective almost sure asymptotic counting of rational solutions to Diophantine inequalities in the Euclidean space. We formulate and prove a version of it for rational points on the group variety, with an effective bound which in some instances can be expected to be the best possible.
Item Type: | Journal Article, refereed, original work |
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Communities & Collections: | 07 Faculty of Science > Institute of Mathematics |
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Dewey Decimal Classification: | 510 Mathematics |
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Scopus Subject Areas: | Physical Sciences > Algebra and Number Theory |
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Uncontrolled Keywords: | Algebra and Number Theory, Semisimple groups, Arithmetic lattice subgroups, Diophantine inequalities, Automorphic representations.
MSC classification
Primary: 11F70: Representation-theoretic methods; automorphic representations over local and global fields
Secondary: 37A17: Homogeneous flows; 22E46: Semisimple Lie groups and their representations; 11J83: Metric theory |
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Language: | English |
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Date: | 13 March 2024 |
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Deposited On: | 25 Apr 2024 05:26 |
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Last Modified: | 30 Dec 2024 04:37 |
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Publisher: | Cambridge University Press |
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ISSN: | 0010-437X |
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Additional Information: | The authors would like to thank the (anonymous) referee for a careful reading of the paper and for several useful comments. A.G. was supported by SNF grant 200021–182089 and A.N. was supported by ISF Moked Grant 2019-19. |
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OA Status: | Closed |
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Publisher DOI: | https://doi.org/10.1112/s0010437x23007716 |
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Project Information: | - Funder: SNF grant
- Grant ID: 200021–182089
- Project Title:
- Funder: ISF Moked Grant
- Grant ID: 2019-19
- Project Title:
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