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	<title>Higher homotopy categories - Revision history</title>
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	<updated>2026-07-05T01:22:16Z</updated>
	<subtitle>Revision history for this page on the wiki</subtitle>
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		<id>https://sfb-higher-invariants.app.uni-regensburg.de/index.php?title=Higher_homotopy_categories&amp;diff=129&amp;oldid=prev</id>
		<title>132.199.243.28: Created page with &quot;I will review the construction of the higher homotopy categories associated to an infinity-category and discuss some of their properties, especially in connection with higher...&quot;</title>
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		<updated>2022-05-06T15:07:06Z</updated>

		<summary type="html">&lt;p&gt;Created page with &amp;quot;I will review the construction of the higher homotopy categories associated to an infinity-category and discuss some of their properties, especially in connection with higher...&amp;quot;&lt;/p&gt;
&lt;p&gt;&lt;b&gt;New page&lt;/b&gt;&lt;/p&gt;&lt;div&gt;I will review the construction of the higher homotopy categories associated to an infinity-category and discuss some of their properties, especially in connection with higher &lt;br /&gt;
weak (co)limits. These objects define a natural sequence of refinements for the comparison between homotopy commutativity and homotopy coherence, but their study seems to have received less attention than the classical homotopy category. Moreover, I will discuss some ongoing work on adjoint functor theorems in this context and &lt;br /&gt;
a version of the classical Brown representability theorem for higher homotopy categories. I will then introduce a definition of K-theory for these objects and present some results about the comparison with Waldhausen K-theory. Lastly, I will also briefly discuss generalizations of Grothendieck derivators and derivator K-theory to the context &lt;br /&gt;
of (n,1)-categories, and  present analogous results about the comparison with Waldhausen K-theory.&lt;/div&gt;</summary>
		<author><name>132.199.243.28</name></author>
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