Title of article
On the GLY Conjecture of upper estimate of positive integral points in real right-angled simplices Original Research Article
Author/Authors
Xuejun Wang، نويسنده , , Hing Sun Luk and Stephen Yau، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2007
Pages
27
From page
184
To page
210
Abstract
The GLY (Granville–Lin–Yau) Conjecture is a generalization of Lin, Xu and Yauʹs results. An important application of GLY is its use in characterizing an affine hypersurface in Cn as a cone over a nonsingular projective variety. In addition, the Rough Upper Estimate Conjecture in GLY, recently proved by Yau and Zhang, implies the Durfee Conjecture in singularity theory. This paper develops a unified approach to prove the Sharp Upper Estimate Conjecture for general n. Using this unified approach, we prove that the Sharp Upper Estimate Conjecture is true for n=4,5,6. After giving a counter-example to show that the Sharp Upper Estimate Conjecture is not true for n=7, we propose a Modified GLY Conjecture. For each fixed n, our unified approach can be used to prove this Modified GLY Conjecture.
Journal title
Journal of Number Theory
Serial Year
2007
Journal title
Journal of Number Theory
Record number
715912
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