<div dir="ltr"><div>Hi everyone,</div><div><br></div><div>A quick reminder about the seminar and coffee hour today. See you there!<br></div></div><br><div class="gmail_quote"><div dir="ltr" class="gmail_attr">On Mon, May 3, 2021 at 10:54 AM 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">
<div>Hi everyone,</div><div><br></div><div>This week our speaker will be Wouter Van Limbeek from the University of Illinois-Chicago. Here are the details.<br></div><div>
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<div><div><b><span>Title</span>: </b>Do thin groups have discrete <span>commensurators</span>?</div><div><br></div><div><b><span>Abstract</span>: </b>Let
G be a simple Lie group and \Gamma < G a lattice. In 1974, Margulis
proved that if the commensurator of \Gamma is dense, then \Gamma is
arithmetic. In 2015, Shalom asked if the same is true only assuming
\Gamma is Zariski-dense in G. I will report on recent progress on this
question for normal subgroups of lattices in rank 1 (e.g. hyperbolic
space) using ideas from infinite ergodic theory, Brownian motion, random
walks and harmonic maps. I will attempt to give a picture of how all
these ideas combine to give information on <span>commensurators</span>. This is joint work with D. Fisher <font face="Helvetica Neue, Helvetica, Arial, sans-serif" color="#333333"><span style="font-size:14px">and M. Mj.</span></font></div></div>
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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>Best,</p><p>Matt</p></div></div>
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