Course Syllabus

About Seminars in analysis (18.104)

The class 18.104 is a class centered around communication of mathematics through the presentation of diverse topics in analysis. This class will be centered around the versatile theory of Optimal Transport in mathematics and its diverse applications.

See Syllabus.pdf  for more detailed information about the class, grading scheme, etc.

 

The main books

Peyré-Cuturi, Chewi-Niles-Weed-Rigollet and Santambrogio.

 

Calendar for 18.104

You can find the calendar of the class at: Calendar 18.104 and fill it with the names of your group when you want to present (it might be subject to change).

 

Michael's slides

 

Model Texts

Research Figalli-and-Jerison.pdf 

Expository Figalli.pdf

Expository Torres et al.pdf 

Aude's slides

IMSI_tuto.pdf 

OTML19-1.pdf  

Beamer presentation slides

18_104_presentation1.pdf

18_104_Beamer.pdf

18_104_Beamer_presentation (1).pdf

18_104_Beamer__3.pdf

18_104_Beamer 5.pdf

18_104_Beamer_Feb_25th.pdf

Online presentations

18_104_Online_presentation-Sashko.pdf

18_104_Online_Talk-Tom.pdf

18_104_Alissa.pdf

18.104 Online Talk-Katherine.pdf

18_104_online_talk-Asher.pdf

18_104_OnlineTalk-Saul.pdf

18_104_Online_Presentation-Zixiang.pdf

18_104_Beamer-Niles.pdf

18_104_Beamer_April_14th_Ana_.pdf

18_104_Beamer-Ryan.pdf

18_104_Online-Christine.pdf

18_104_Online_Presentation-Owen.pdf

18_104_Presentation-Hector.pdf

Attendance policy

Attendance is mandatory in class. If you miss three or more classes without justification, you will not pass the class.

Letters:

A = 90-100

B = 80-89

C = 70-79

D = 60-69

F = 59 and below

 

Slides from beamer presentations

Course Summary:

Date Details Due