<?xml version="1.0" encoding="UTF-8"?>
 <rdf:RDF xmlns="http://purl.org/rss/1.0/" xmlns:rdf="http://www.w3.org/1999/02/22-rdf-syntax-ns#" xmlns:content="http://purl.org/rss/1.0/modules/content/" xmlns:taxo="http://purl.org/rss/1.0/modules/taxonomy/" xmlns:dc="http://purl.org/dc/elements/1.1/" xmlns:cc="http://web.resource.org/cc/" xmlns:syn="http://purl.org/rss/1.0/modules/syndication/" xmlns:admin="http://webns.net/mvcb/">
  <channel rdf:about="http://pinboard.in">
    <title>Pinboard (ars)</title>
    <link>https://pinboard.in/u:ars/public/</link>
    <description>recent bookmarks from ars</description>
    <items>
      <rdf:Seq>	<rdf:li rdf:resource="http://ldtopology.wordpress.com/2013/03/16/manolescu-refutes-the-triangulation-conjecture/"/>
	<rdf:li rdf:resource="http://www.math.uiuc.edu/K-theory/0012/haupt.pdf"/>
	<rdf:li rdf:resource="http://www.maths.ed.ac.uk/~aar/haupt/"/>
	<rdf:li rdf:resource="http://www.guardian.co.uk/news/datablog/2013/jan/16/big-data-firm-topological-data-analysis"/>
	<rdf:li rdf:resource="https://people.maths.ox.ac.uk/tillmann/ASPECTS.html"/>
	<rdf:li rdf:resource="http://www.youtube.com/watch?v=4jdmkUQDWtQ"/>
	<rdf:li rdf:resource="http://www.youtube.com/watch?v=AGLPbSMxSUM"/>
	<rdf:li rdf:resource="http://www.map.him.uni-bonn.de/Main_Page"/>
      </rdf:Seq>
    </items>
  </channel><item rdf:about="http://ldtopology.wordpress.com/2013/03/16/manolescu-refutes-the-triangulation-conjecture/">
    <title>Manolescu refutes the Triangulation Conjecture | Low Dimensional Topology</title>
    <dc:date>2013-03-17T03:10:59+00:00</dc:date>
    <link>http://ldtopology.wordpress.com/2013/03/16/manolescu-refutes-the-triangulation-conjecture/</link>
    <dc:creator>ars</dc:creator><description><![CDATA[What is an -manifold?

“That’s a silly question,” someone might say. “It’s a (bla bla bla) space that is locally homeomorphic to ”.

]]></description>
<dc:subject>geometry topology</dc:subject>
<dc:source>https://pinboard.in/</dc:source>
<dc:identifier>https://pinboard.in/u:ars/b:a05e3ea10d46/</dc:identifier>
<taxo:topics><rdf:Bag>	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:geometry"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:topology"/>
</rdf:Bag></taxo:topics>
</item>
<item rdf:about="http://www.math.uiuc.edu/K-theory/0012/haupt.pdf">
    <title>On the Hauptvermutung by A. A. Ranicki</title>
    <dc:date>2013-03-17T03:07:15+00:00</dc:date>
    <link>http://www.math.uiuc.edu/K-theory/0012/haupt.pdf</link>
    <dc:creator>ars</dc:creator><dc:subject>topology geometry</dc:subject>
<dc:source>https://pinboard.in/</dc:source>
<dc:identifier>https://pinboard.in/u:ars/b:1ee6f0e30c08/</dc:identifier>
<taxo:topics><rdf:Bag>	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:topology"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:geometry"/>
</rdf:Bag></taxo:topics>
</item>
<item rdf:about="http://www.maths.ed.ac.uk/~aar/haupt/">
    <title>Triangulation and the Hauptvermutung</title>
    <dc:date>2013-03-17T03:06:44+00:00</dc:date>
    <link>http://www.maths.ed.ac.uk/~aar/haupt/</link>
    <dc:creator>ars</dc:creator><description><![CDATA[A triangulation of a topological space is a homeomorphism to simplicial complex.
The Hauptvermutung is the conjecture that any two triangulations of a topological space are combinatorially equivalent.]]></description>
<dc:subject>topology geometry</dc:subject>
<dc:source>https://pinboard.in/</dc:source>
<dc:identifier>https://pinboard.in/u:ars/b:368a3541f1c7/</dc:identifier>
<taxo:topics><rdf:Bag>	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:topology"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:geometry"/>
</rdf:Bag></taxo:topics>
</item>
<item rdf:about="http://www.guardian.co.uk/news/datablog/2013/jan/16/big-data-firm-topological-data-analysis">
    <title>New big data firm to pioneer topological data analysis | News | guardian.co.uk</title>
    <dc:date>2013-01-17T21:42:25+00:00</dc:date>
    <link>http://www.guardian.co.uk/news/datablog/2013/jan/16/big-data-firm-topological-data-analysis</link>
    <dc:creator>ars</dc:creator><dc:subject>topology statistics mldm persistenthomology</dc:subject>
<dc:source>https://pinboard.in/</dc:source>
<dc:identifier>https://pinboard.in/u:ars/b:ca44fc520b29/</dc:identifier>
<taxo:topics><rdf:Bag>	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:topology"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:statistics"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:mldm"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:persistenthomology"/>
</rdf:Bag></taxo:topics>
</item>
<item rdf:about="https://people.maths.ox.ac.uk/tillmann/ASPECTS.html">
    <title>ASPECTS</title>
    <dc:date>2013-01-07T21:14:44+00:00</dc:date>
    <link>https://people.maths.ox.ac.uk/tillmann/ASPECTS.html</link>
    <dc:creator>ars</dc:creator><description><![CDATA[ASPECTS of Topology
17-19 December 2012, Oxford
overview
The conference aims to gather leading researchers and to showcase topological ideas in a variety of current research developments. It marks and honours the 70th birthday of Graeme Segal.]]></description>
<dc:subject>conference topology geometry tqft</dc:subject>
<dc:source>https://pinboard.in/</dc:source>
<dc:identifier>https://pinboard.in/u:ars/b:25824a176974/</dc:identifier>
<taxo:topics><rdf:Bag>	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:conference"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:topology"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:geometry"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:tqft"/>
</rdf:Bag></taxo:topics>
</item>
<item rdf:about="http://www.youtube.com/watch?v=4jdmkUQDWtQ">
    <title>The Mystery of 3-Manifolds - William Thurston - YouTube</title>
    <dc:date>2012-08-16T19:13:29+00:00</dc:date>
    <link>http://www.youtube.com/watch?v=4jdmkUQDWtQ</link>
    <dc:creator>ars</dc:creator><dc:subject>thurston williamthurston video talks topology towatch</dc:subject>
<dc:source>https://pinboard.in/</dc:source>
<dc:identifier>https://pinboard.in/u:ars/b:7da7ef99a3cd/</dc:identifier>
<taxo:topics><rdf:Bag>	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:thurston"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:williamthurston"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:video"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:talks"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:topology"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:towatch"/>
</rdf:Bag></taxo:topics>
</item>
<item rdf:about="http://www.youtube.com/watch?v=AGLPbSMxSUM">
    <title>Not Knot (Part 1/2) - YouTube</title>
    <dc:date>2012-02-17T05:05:30+00:00</dc:date>
    <link>http://www.youtube.com/watch?v=AGLPbSMxSUM</link>
    <dc:creator>ars</dc:creator><dc:subject>topology knottheory pedagogy video</dc:subject>
<dc:source>https://pinboard.in/</dc:source>
<dc:identifier>https://pinboard.in/u:ars/b:d80d230d7b73/</dc:identifier>
<taxo:topics><rdf:Bag>	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:topology"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:knottheory"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:pedagogy"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:video"/>
</rdf:Bag></taxo:topics>
</item>
<item rdf:about="http://www.map.him.uni-bonn.de/Main_Page">
    <title>Main Page - Manifold Atlas</title>
    <dc:date>2011-12-02T05:11:07+00:00</dc:date>
    <link>http://www.map.him.uni-bonn.de/Main_Page</link>
    <dc:creator>ars</dc:creator><dc:subject>wiki scientificwiki onlinejournal manifolds differentialgeometry topology</dc:subject>
<dc:source>https://pinboard.in/</dc:source>
<dc:identifier>https://pinboard.in/u:ars/b:dea28f55bc8c/</dc:identifier>
<taxo:topics><rdf:Bag>	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:wiki"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:scientificwiki"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:onlinejournal"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:manifolds"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:differentialgeometry"/>
	<rdf:li rdf:resource="https://pinboard.in/u:ars/t:topology"/>
</rdf:Bag></taxo:topics>
</item>
</rdf:RDF>