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new file: pdfs/Fri14h00/Winter.pdf deleted: pdfs/Fri14h00/Winter?.txt new file: pdfs/Fri16h00/Winter.pdf deleted: pdfs/Fri16h00/Winter?.txt

modified: index.html
17d84206 · Luigi Santocanale · 20d9813e · 17d84206 · 17d84206 · 20d9813e
Commit 17d84206 authored 3 years ago by Luigi Santocanale
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@@ -974,7 +974,7 @@ Mika-Michalski)
 <a href="javascript:toggleDiv('T38')">Relational Sums and Splittings in Categories of L-fuzzy Relations</a>
 <div style="display:none", id="T38"><br /><br />Dedekind categories and similar structures provide a suitable framework to reason about binary relations in an abstract setting. Arrow categories extend this theory by certain operations and axioms so that additional aspects of L-fuzzy relations become expressible. In particular, arrow categories allow to identify crisp relations among all relations. On the other hand, the new operations and axioms in arrow categories force the category to be uniform, i.e., to be within a particular subclass of Dedekind categories. As an extension, arrow categories inherit constructions from Dedekind categories such as the definition of relational sums and splittings. However, these constructions are usually modified in arrow categories by requiring that certain relations are additionally crisp. This additional crispness requirement and the fact that the category is uniform raises a general question about these constructions in arrow categories. When can we guarantee the existence of the construction with and without the additional requirement of crispness in the given arrow category or or an extension thereof? This paper provides a complete answer to this complex question for the two constructions mentioned.</div>
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-<td><!--<a href="pdfs/Fri14h30/Winter.pdf">Slides</a>--></td>
+<td><a href="pdfs/Fri14h30/Winter.pdf">Slides</a></td>
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@@ -993,7 +993,7 @@ Mika-Michalski)
 <a href="javascript:toggleDiv('T39')">FuReM - A System for Visualization and Manipulation of L-Fuzzy Relations (short talk)</a>
 <div style="display:none", id="T39"><br /><br />In this presentation we will introduce the FuReM (Fuzzy Relation Manipulator) sys- tem. This system allows to visualize and manipulate so-called L-fuzzy relations similar to the RelView system.</div>
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-<td><!--<a href="pdfs/Fri16h00/Winter.pdf">Slides</a>--></td>
+<td><a href="pdfs/Fri16h00/Winter.pdf">Slides</a></td>
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--- a/pdfs/Fri14h00/Winter.pdf
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--- a/pdfs/Fri14h00/Winter?.txt
+++ b/pdfs/Fri14h00/Winter?.txt
--- a/pdfs/Fri16h00/Winter.pdf
+++ b/pdfs/Fri16h00/Winter.pdf
--- a/pdfs/Fri16h00/Winter?.txt
+++ b/pdfs/Fri16h00/Winter?.txt