Bounds for the smallest integral point on a conic over a number field

Paraskevas Alvanos; Dimitrios Poulakis

doi:10.4064/aa181116-12-6

Publishing house / Journals and Serials / Acta Arithmetica / Online First articles

PDF files of articles are only available for institutions which have paid for the online version upon signing an Institutional User License.

Bounds for the smallest integral point on a conic over a number field

Volume 193 / 2020

Paraskevas Alvanos, Dimitrios Poulakis Acta Arithmetica 193 (2020), 355-368 MSC: Primary 11D09; Secondary 14G25, 14H25. DOI: 10.4064/aa181116-12-6 Published online: 7 February 2020

Abstract

We compute an explicit upper bound for the size of the smallest integral point of an irreducible conic defined over a number field of degree $\geq 2$.

Authors

Paraskevas AlvanosDepartment of Mathematics
Aristotle University of Thessaloniki
54124 Thessaloniki, Greece
e-mail
Dimitrios PoulakisDepartment of Mathematics
Aristotle University of Thessaloniki
54124 Thessaloniki, Greece
e-mail

8.00

Download

Search for IMPAN publications

Publishing house / Journals and Serials / Acta Arithmetica / Online First articles

Acta Arithmetica

Bounds for the smallest integral point on a conic over a number field

Volume 193 / 2020

Abstract

Authors

Search for IMPAN publications

Rewrite code from the image