Difference between revisions of "NumberFields@home"

From BOINC Wiki
(Numberfields data)
 
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    <project>
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{{Projects
        <name>NumberFields@home</name>
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|1=NumberFields@home
        <url>http://numberfields.asu.edu/NumberFields/</url>
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|2=http://numberfields.asu.edu/NumberFields/
        <general_area>Mathematics, computing, and games</general_area>
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|3=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.
        <specific_area>Mathematics</specific_area>
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|4=Macintosh, Linux, Windows
        <description><![CDATA[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.]]></description>
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|5=not available
        <home>Arizona State University, school of Mathematics</home>
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}}
    <platforms>
 
        <name>i686-pc-linux-gnu</name>
 
        <name>windows_intelx86</name>
 
        <name>windows_x86_64</name>
 
        <name>x86_64-apple-darwin</name>
 
        <name>x86_64-pc-linux-gnu</name>
 
    </platforms>
 
      <image>https://boinc.berkeley.edu/images/nf_banner_10.jpg</image>
 
      <summary>Do research in algebraic number theory</summary>
 
    </project>
 

Revision as of 22:56, 3 June 2016

Project name: NumberFields@home
Project URL: http://numberfields.asu.edu/NumberFields/
Description: 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.
Platforms: Macintosh, Linux, Windows
Calculates using GPUs: not available
Has an OpenGL screen saver: {{{6}}}