{"day":"01","status":"public","year":"2008","publisher":"John Wiley and Sons Ltd","page":"389 - 416","date_published":"2008-03-01T00:00:00Z","month":"03","date_created":"2018-12-11T11:45:18Z","citation":{"ieee":"T. D. Browning and R. Dietmann, “On the representation of integers by quadratic forms,” Proceedings of the London Mathematical Society, vol. 96, no. 2. John Wiley and Sons Ltd, pp. 389–416, 2008.","short":"T.D. Browning, R. Dietmann, Proceedings of the London Mathematical Society 96 (2008) 389–416.","ama":"Browning TD, Dietmann R. On the representation of integers by quadratic forms. Proceedings of the London Mathematical Society. 2008;96(2):389-416. doi:10.1112/plms/pdm032","mla":"Browning, Timothy D., and Rainer Dietmann. “On the Representation of Integers by Quadratic Forms.” Proceedings of the London Mathematical Society, vol. 96, no. 2, John Wiley and Sons Ltd, 2008, pp. 389–416, doi:10.1112/plms/pdm032.","apa":"Browning, T. D., & Dietmann, R. (2008). On the representation of integers by quadratic forms. Proceedings of the London Mathematical Society. John Wiley and Sons Ltd. https://doi.org/10.1112/plms/pdm032","chicago":"Browning, Timothy D, and Rainer Dietmann. “On the Representation of Integers by Quadratic Forms.” Proceedings of the London Mathematical Society. John Wiley and Sons Ltd, 2008. https://doi.org/10.1112/plms/pdm032.","ista":"Browning TD, Dietmann R. 2008. On the representation of integers by quadratic forms. Proceedings of the London Mathematical Society. 96(2), 389–416."},"quality_controlled":0,"title":"On the representation of integers by quadratic forms","_id":"224","author":[{"id":"35827D50-F248-11E8-B48F-1D18A9856A87","last_name":"Browning","orcid":"0000-0002-8314-0177","full_name":"Timothy Browning","first_name":"Timothy D"},{"full_name":"Dietmann, Rainer","first_name":"Rainer","last_name":"Dietmann"}],"doi":"10.1112/plms/pdm032","abstract":[{"lang":"eng","text":"Let n ≥ 4 and let Q ∈ [X1, ..., Xn] be a non-singular quadratic form. When Q is indefinite we provide new upper bounds for the least non-trivial integral solution to the equation Q = 0, and when Q is positive definite we provide improved upper bounds for the greatest positive integer k for which the equation Q = k is insoluble in integers, despite being soluble modulo every prime power."}],"publication":"Proceedings of the London Mathematical Society","publication_status":"published","issue":"2","extern":1,"type":"journal_article","publist_id":"7688","date_updated":"2021-01-12T06:56:13Z","volume":96,"intvolume":" 96"}