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DTSTART:20250309T070000
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DTSTART:20241103T060000
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DTSTART;TZID=America/Toronto:20250717T143000
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URL:https://uwaterloo.ca/pure-mathematics/events/differential-geometry-work
 ing-seminar-153
SUMMARY:Differential Geometry Working Seminar
CLASS:PUBLIC
DESCRIPTION:KALEB RUSCITTI\, UNIVERSITY OF WATERLOO\n\n_Embedding a family 
 of moduli spaces of SL(2\,C) bundles into\nprojective spaces_\n\nThe modul
 i space of polystable degree-0 SL(2\,C) bundles on a compact\nconnected Ri
 emann surface of genus g>=2 is a Kähler manifold\, and an\nopen subset of
  the moduli space of semi-stable bundles\, which is a\nprojective variety 
 of dimension 3g-3. Biswas and Hurtubise constructed\na toric degeneration 
 of this moduli space\, meaning a family of moduli\nspaces over C whose fib
 er over 0 is a toric variety. The toric variety\nhas a moduli interpretati
 on as a space of framed parabolic bundles. \n\nIn this talk\, I will descr
 ibe the family and then describe how one can\nembed the entire family into
  P^N x C. This is the key step in a\ncurrent project I am working on\, abo
 ut relating different geometric\nquantizations of the moduli space of SL(2
 \,C) bundles.\n\nMC 5403
DTSTAMP:20260504T111618Z
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