#  Seminar, Bohan Fang (PKU), Mirror Symmetry for Toric Calabi-Yau 3-Folds 

 



####  calendar\_today Date and Time 

 **September 4, 2018** 

 04:00PM - 05:00PM EDT 

####  pin\_drop Location 

 **Jefferson 356**  



 

 



 

   ![Bohan Fang](/sites/g/files/omnuum6611/files/styles/hwp_1_1__100x100_scale/public/mathpicture/files/bohanfang.jpg?itok=889kRa4g) 

 

 **Title.** Mirror Symmetry for Toric Calabi-Yau 3-Folds

 **Abstract.** 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.



 

 

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 Attachments- [  picture\_as\_pdf  fang\_seminar\_september\_4\_2018.pdf ](/sites/g/files/omnuum6611/files/mathpicture/files/fang_seminar_september_4_2018.pdf)
 
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