A sharp polynomial estimate of positive integral points in a 4‐dimensional tetrahedron and a sharp estimate of the Dickman‐de Bruijn function |
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| Authors: | Xue Luo Stephen S.‐T. Yau Huaiqing Zuo |
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| Affiliation: | 1. +86 2. 10 3. 82317933;4. School of Mathematics and Systems Science, Beihang University, Beijing, P. R. China;5. Department of Mathematical Sciences, Tsinghua University, Beijing, P. R. China;6. 62797584+86 7. 62789445;8. Mathematical Sciences Center, Tsinghua University, Beijing, P. R. China |
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| Abstract: | The estimate of integral points in right‐angled simplices has many applications in number theory, complex geometry, toric variety and tropical geometry. In [24], [25], [27], the second author and other coworkers gave a sharp upper estimate that counts the number of positive integral points in n dimensional ( ) real right‐angled simplices with vertices whose distance to the origin are at least  . A natural problem is how to form a new sharp estimate without the minimal distance assumption. In this paper, we formulate the Number Theoretic Conjecture which is a direct correspondence of the Yau Geometry conjecture. We have proved this conjecture for  . This paper gives hope to prove the new conjecture in general. As an application, we give a sharp estimate of the Dickman‐de Bruijn function  for  . |
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| Keywords: | Sharp estimate tetrahedron integral points 11P21 11Y99 |
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