NumberFields@home, ищет числовые поля с особыми свойствами |
Привіт Гість ( Вхід | Реєстрація )
NumberFields@home, ищет числовые поля с особыми свойствами |
Rilian |
Aug 19 2011, 11:11
Пост
#1
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interstellar Група: Team member Повідомлень: 16 971 З нами з: 22-February 06 З: Торонто Користувач №: 184 Стать: НеСкажу Free-DC_CPID Парк машин: ноут и кусок сервера |
https://numberfields.asu.edu/NumberFields/
NumberFields@home NumberFields@home is a research project that uses Internet-connected computers to do research in number theory. You can participate by downloading and running a free program on your computer. NumberFields@home searches for fields with special properties. The primary application of this research is in the realm of algebraic number theory. Number theorists can mine the data for interesting patterns to help them formulate conjectures about number fields. Ultimately, this research will lead to a deeper understanding of the profound properties of numbers, the basic building blocks of all mathematics. NumberFields@home is based at the school of mathematics at Arizona State University. The final results of this project will be complete tables of number fields. The results are given in table form or as a searchable database. Minimum System Requirements: Intel/Amd processor. At least 128MB of ram free. 32MB of free disk space. Windows, Linux or Mac (x86) OS. https://numberfields.asu.edu/NumberFields/t...y.php?teamid=15 - команда Ukraine -------------------- |
Death |
Sep 27 2012, 13:29
Пост
#2
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<script ///> Група: Moderators Повідомлень: 6 371 З нами з: 5-November 03 З: Kyiv Користувач №: 26 Стать: НеСкажу Free-DC_CPID Парк машин: гидропарк jabber:deadjdona@gmail.com |
http://numberfields.asu.edu/NumberFields/f...hread.php?id=95
Another level of the search has been completed. We are now 1 step closer to finishing the Decics search over Q(i). The next batch of WUs is targetting those fields with discriminant (2^29)*(5^17). After that, we hit the (2^29)*(5^18) discriminants, which is the pinacle of the search over Q(i). In addition to Q(i) there are 6 other subfields we need to do. I am starting to sprinkle some of those WUs in with the Q(i) work. These other subfields are expected to be much smaller searches, so the idea here is to pick off some of the easier targets while waiting for Q(i) to finish. -------------------- |
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