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X-WR-CALNAME;VALUE=TEXT:Seminar, Bohan Fang (PKU), Mirror Symmetry for Toric Calabi-Yau 3-Folds
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SUMMARY:Seminar, Bohan Fang (PKU), Mirror Symmetry for Toric Calabi-Yau 3-Folds
DESCRIPTION:<p>	<drupal-media data-entity-type="media" data-entity-uuid="5a043e2a-e4b6-487c-a543-6e51e37641bb" alt="Bohan Fang" data-view-mode="hwp_x_small"></drupal-media></p><p>	<span alt="Bohan Fang" class="file media-element file-default" data-file_info="%7B%22fid%22:%223742271%22,%22view_mode%22:%22default%22,%22type%22:%22media%22%7D"><strong>Title.</strong></span> Mirror Symmetry for Toric Calabi-Yau 3-Folds</p><p>	<strong>Abstract.</strong> Mirror symmetry, from the mathematical perspective, is a duality relation between symplectic geometry and algebraic geometry. The combinatorial nature of toric geometry makes the mirror symmetry relation very explicit in examples. I will explain various aspects of mirror symmetry, both enumerative and homological, for toric varieties and especially toric Calabi-Yau 3-folds.</p><p>	 </p>
LOCATION:Jefferson 356
STATUS:CONFIRMED
DTSTART:20180904T200000Z
DTEND:20180904T210000Z
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