arXiv:0903.1742 Abstract | arXiv Analytics

arXiv:0903.1742 [math.NT]Abstract References Reviews Resources

The Diophantine equation $aX^{4} - bY^{2} = 1$

Published 2009-03-10Version 1

As an application of the method of Thue-Siegel, we will resolve a conjecture of Walsh to the effect that the Diophantine equation $aX^{4} - bY^2=1$, for fixed positive integers $a$ and $b$, possesses at most two solutions in positive integers $X$ and $Y$. Since there are infinitely many pairs $(a,b)$ for which two such solutions exist, this result is sharp.

Comments: 20 pages, To appear in Journal fur die Reine und Angewandte Mathematik (Crelle's Journal)

Categories: math.NT

Subjects: 11D25, 11D41, 11B39, 11J25

Keywords: diophantine equation, conjecture, fixed positive integers, application

Related articles: Most relevant | Search more

arXiv:1206.0486 [math.NT] (Published 2012-06-03, updated 2012-08-17)

Complete Residue Systems: A Primer and an Application

Pietro Paparella

arXiv:1307.1413 [math.NT] (Published 2013-07-04)

On mod $p^c$ transfer and applications

Joachim Mahnkopf

arXiv:1407.7289 [math.NT] (Published 2014-07-27, updated 2015-01-28)

Hardy-Littlewood Conjecture and Exceptional real Zero

JinHua Fei

arXiv Analytics

arXiv:0903.1742 [math.NT]Abstract References Reviews Resources

The Diophantine equation $aX^{4} - bY^{2} = 1$

Links

Toolbox

arXiv:0903.1742 [math.NT]AbstractReferencesReviewsResources

The Diophantine equation $aX^{4} - bY^{2} = 1$

Links

Toolbox

arXiv:0903.1742 [math.NT]Abstract References Reviews Resources