<div dir="ltr">Hi everyone,<div><br></div><div>A quick reminder about the last geometry/topology seminar of the semester. See you there!</div><div><br></div><div>Cary</div></div><br><div class="gmail_quote"><div dir="ltr" class="gmail_attr">On Sun, Nov 29, 2020 at 12:52 PM Matthew R Haulmark <<a href="mailto:haulmark@binghamton.edu">haulmark@binghamton.edu</a>> wrote:<br></div><blockquote class="gmail_quote" style="margin:0px 0px 0px 0.8ex;border-left:1px solid rgb(204,204,204);padding-left:1ex"><div dir="ltr">
<p>Hi everyone,</p><p>This week our speaker is Hakan Doga of SUNY Buffalo. Links and details are below.
</p><p>Zoom link for the seminar, 2:50 - 3:50:<br>
<a href="https://binghamton.zoom.us/j/94057178271" rel="noreferrer" target="_blank">https://binghamton.zoom.us/j/94057178271</a><br>
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Zoom link for the coffee, 12:30 - 1:30:<br>
<a href="https://binghamton.zoom.us/j/96674397432" rel="noreferrer" target="_blank">https://binghamton.zoom.us/j/96674397432</a></p><p><i>Title:</i> A Combinatorial Description of the Knot Concordance Invariant Epsilon</p><p><i>Abstract: </i>The knot concordance group is one of the central objects in the study of topological knot types and low-dimensional topology. Concordance invariants obtained from knot Floer homology have resulted in some important classification results. In this talk, I will describe a new method to compute the concordance invariant epsilon using combinatorial knot Floer homology and show the computations for torus knots and positive braids. This is a joint work with S. Dey.</p><p><br></p><p>See you Thursday!<br></p><p>Best,</p><p>Matt<br></p>
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Seminar web page:<br>
<a href="http://www2.math.binghamton.edu/p/seminars/topsem" rel="noreferrer" target="_blank">http://www2.math.binghamton.edu/p/seminars/topsem</a><br>
topsem mailing list:<br>
<a href="http://www1.math.binghamton.edu/mailman/listinfo/topsem" rel="noreferrer" target="_blank">http://www1.math.binghamton.edu/mailman/listinfo/topsem</a></blockquote></div>