{"type":"journal_article","doi":"10.1112/S0025579300000243","author":[{"orcid":"0000-0002-8314-0177","id":"35827D50-F248-11E8-B48F-1D18A9856A87","full_name":"Timothy Browning","first_name":"Timothy D","last_name":"Browning"}],"issue":"1-2","publist_id":"7692","day":"21","date_updated":"2021-01-12T06:55:56Z","intvolume":" 54","publisher":"University College London","citation":{"ama":"Browning TD. Counting rational points on cubic hypersurfaces. Mathematika. 2007;54(1-2):93-112. doi:10.1112/S0025579300000243","ieee":"T. D. Browning, “Counting rational points on cubic hypersurfaces,” Mathematika, vol. 54, no. 1–2. University College London, pp. 93–112, 2007.","ista":"Browning TD. 2007. Counting rational points on cubic hypersurfaces. Mathematika. 54(1–2), 93–112.","chicago":"Browning, Timothy D. “Counting Rational Points on Cubic Hypersurfaces.” Mathematika. University College London, 2007. https://doi.org/10.1112/S0025579300000243.","short":"T.D. Browning, Mathematika 54 (2007) 93–112.","mla":"Browning, Timothy D. “Counting Rational Points on Cubic Hypersurfaces.” Mathematika, vol. 54, no. 1–2, University College London, 2007, pp. 93–112, doi:10.1112/S0025579300000243.","apa":"Browning, T. D. (2007). Counting rational points on cubic hypersurfaces. Mathematika. University College London. https://doi.org/10.1112/S0025579300000243"},"status":"public","abstract":[{"text":"Let X ⊂ ℙN be a geometrically integral cubic hypersurface defined over ℚ, with singular locus of dimension at most dim X - 4. The main result in this paper is a proof of the fact that X(ℚ) contains OεX,(BdimX+ε) points of height at most B.","lang":"eng"}],"month":"12","_id":"220","publication":"Mathematika","year":"2007","date_published":"2007-12-21T00:00:00Z","volume":54,"publication_status":"published","page":"93 - 112","quality_controlled":0,"date_created":"2018-12-11T11:45:16Z","title":"Counting rational points on cubic hypersurfaces","extern":1}