A generic effective Oppenheim theorem for systems of forms

Prasuna Bandi, Anish Ghosh, Jiyoung Han

Type: Article

Publication Date: 2020-08-12

Citations: 7

DOI: https://doi.org/10.1016/j.jnt.2020.07.002

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Locations

Journal of Number Theory - View
arXiv (Cornell University) - View - PDF

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Works Cited by This (25)

Action	Title	Year	Authors
+	Discrete Subgroups and Ergodic Theory**Editorial note. After consultation with G. A. Margulis it was agreed to make some changes directly on the original manuscript, without returning it to him, in order to save time. A. Borel kindly provided the necessary revision, including an additional argument supplied by G. Prasad in the proof of Lemma A. The appendix in the original manuscript has been transformed and reorganized into Section 4; the historical background material and the bibliography …	1989	G. A. Margulis
+ PDF Chat	Oppenheim conjecture for pairs consisting of a linear form and a quadratic form	2004	Alexander Gorodnik
+ PDF Chat	Distribution of values of quadratic forms at integral points	2022	Paul Buterus Friedrich Götze Thomas Hille G. A. Margulis
+	Limit distributions of orbits of unipotent flows and values of quadratic forms	1993	S. G. Dani G. A. Margulis
+	Upper Bounds and Asymptotics in a Quantitative Version of the Oppenheim Conjecture	1998	Alex Eskin G. A. Margulis Shahar Mozes
+	On an oppenheim-type conjecture for systems of quadratic forms	2004	Alexander Gorodnik
+	Orbit closures of generic unipotent flows on homogeneous spaces ofSL(3, ℝ)	1990	S. G. Dani G. A. Margulis
+ PDF Chat	Effective estimates on indefinite ternary forms	2014	Elon Lindenstrauss G. A. Margulis
+ PDF Chat	Quadratic forms of signature (2,2) and eigenvalue spacings on rectangular 2-tori	2005	Alex Eskin G. Margulis Shahar Mozes
+ PDF Chat	Mean values over the space of lattices	1955	C. A. Rogers