Decomposing 40 billion integers by four tetrahedral numbers |
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| Authors: | Chung-Chiang Chou Yuefan Deng. |
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| Affiliation: | Department of Mathematics, National ChangHua University of Education, ChangHua 50058, Taiwan Yuefan Deng ; Center for Scientific Computing, State University of New York at Stony Brook, Stony Brook, New York 11794 |
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| Abstract: | Based upon a computer search performed on a massively parallel supercomputer, we found that any integer  less than  billion ( B) but greater than  can be written as a sum of four or fewer tetrahedral numbers. This result has established a new upper bound for a conjecture compared to an older one,  B, obtained a year earlier. It also gives more accurate asymptotic forms for partitioning. All this improvement is a direct result of algorithmic advances in efficient memory and cpu utilizations. The heuristic complexity of the new algorithm is  compared with that of the old,  . |
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| Keywords: | Waring's problem parallel computing asymptotic form |
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