{"intvolume":" 324","volume":324,"year":"2023","acknowledgement":"The authors thank the referee for important comments which led to significant improvements is the presentation of several results in the paper. They also thank Ami Paz for preparing the figures for this paper. Horesh thanks Ami Paz and Yakov Karasik for helpful discussions. Nevo thanks John Parker and Rene Rühr for providing some very useful references. Nevo is supported by ISF Grant No. 2095/15.","file_date_updated":"2023-09-05T07:26:17Z","isi":1,"ddc":["510"],"doi":"10.2140/pjm.2023.324.265","page":"265-294","has_accepted_license":"1","publication":"Pacific Journal of Mathematics","author":[{"full_name":"Horesh, Tal","id":"C8B7BF48-8D81-11E9-BCA9-F536E6697425","first_name":"Tal","last_name":"Horesh"},{"full_name":"Nevo, Amos","last_name":"Nevo","first_name":"Amos"}],"external_id":{"isi":["001047690500001"],"arxiv":["1612.08215"]},"publication_identifier":{"eissn":["1945-5844"],"issn":["0030-8730"]},"article_type":"original","citation":{"short":"T. Horesh, A. Nevo, Pacific Journal of Mathematics 324 (2023) 265–294.","apa":"Horesh, T., & Nevo, A. (2023). Horospherical coordinates of lattice points in hyperbolic spaces: Effective counting and equidistribution. Pacific Journal of Mathematics. Mathematical Sciences Publishers. https://doi.org/10.2140/pjm.2023.324.265","ista":"Horesh T, Nevo A. 2023. Horospherical coordinates of lattice points in hyperbolic spaces: Effective counting and equidistribution. Pacific Journal of Mathematics. 324(2), 265–294.","chicago":"Horesh, Tal, and Amos Nevo. “Horospherical Coordinates of Lattice Points in Hyperbolic Spaces: Effective Counting and Equidistribution.” Pacific Journal of Mathematics. Mathematical Sciences Publishers, 2023. https://doi.org/10.2140/pjm.2023.324.265.","ama":"Horesh T, Nevo A. Horospherical coordinates of lattice points in hyperbolic spaces: Effective counting and equidistribution. Pacific Journal of Mathematics. 2023;324(2):265-294. doi:10.2140/pjm.2023.324.265","ieee":"T. Horesh and A. Nevo, “Horospherical coordinates of lattice points in hyperbolic spaces: Effective counting and equidistribution,” Pacific Journal of Mathematics, vol. 324, no. 2. Mathematical Sciences Publishers, pp. 265–294, 2023.","mla":"Horesh, Tal, and Amos Nevo. “Horospherical Coordinates of Lattice Points in Hyperbolic Spaces: Effective Counting and Equidistribution.” Pacific Journal of Mathematics, vol. 324, no. 2, Mathematical Sciences Publishers, 2023, pp. 265–94, doi:10.2140/pjm.2023.324.265."},"language":[{"iso":"eng"}],"_id":"14245","oa":1,"oa_version":"Published Version","user_id":"2DF688A6-F248-11E8-B48F-1D18A9856A87","date_created":"2023-08-27T22:01:18Z","publisher":"Mathematical Sciences Publishers","scopus_import":"1","title":"Horospherical coordinates of lattice points in hyperbolic spaces: Effective counting and equidistribution","quality_controlled":"1","status":"public","file":[{"checksum":"a675b53cfb31fa46be1e879b7e77fe8c","relation":"main_file","content_type":"application/pdf","creator":"dernst","access_level":"open_access","file_name":"2023_PacificJourMaths_Horesh.pdf","date_updated":"2023-09-05T07:26:17Z","success":1,"file_id":"14267","date_created":"2023-09-05T07:26:17Z","file_size":654895}],"type":"journal_article","day":"26","article_processing_charge":"Yes","month":"07","tmp":{"image":"/images/cc_by.png","name":"Creative Commons Attribution 4.0 International Public License (CC-BY 4.0)","short":"CC BY (4.0)","legal_code_url":"https://creativecommons.org/licenses/by/4.0/legalcode"},"date_updated":"2023-12-13T12:19:42Z","publication_status":"published","date_published":"2023-07-26T00:00:00Z","issue":"2","department":[{"_id":"TiBr"}],"abstract":[{"lang":"eng","text":"We establish effective counting results for lattice points in families of domains in real, complex and quaternionic hyperbolic spaces of any dimension. The domains we focus on are defined as product sets with respect to an Iwasawa decomposition. Several natural diophantine problems can be reduced to counting lattice points in such domains. These include equidistribution of the ratio of the length of the shortest solution (x,y) to the gcd equation bx−ay=1 relative to the length of (a,b), where (a,b) ranges over primitive vectors in a disc whose radius increases, the natural analog of this problem in imaginary quadratic number fields, as well as equidistribution of integral solutions to the diophantine equation defined by an integral Lorentz form in three or more variables. We establish an effective rate of convergence for these equidistribution problems, depending on the size of the spectral gap associated with a suitable lattice subgroup in the isometry group of the relevant hyperbolic space. The main result underlying our discussion amounts to establishing effective joint equidistribution for the horospherical component and the radial component in the Iwasawa decomposition of lattice elements."}]}