Course abstract
One of the main goals of Lebesgue's measure theory is to develop a fundamental tool for carrying out integration which behaves well with taking limits, and admitting a vast class of functions for which Riemann's integration theory is not applicable. Even though the crux of measure theory was to produce a good integration theory, it turns out that it also gives new ways of thinking about “measuring†objects, which is very useful for many other areas of mathematics such as probability theory as well as more advanced topics like harmonic analysis, ergodic theory, etc. Real-world applications of measure theory can be found in physics, economics, finance etc. Measure theoretic techniques are thus a must-have for any mathematician.
Course Instructor
Prof. Indrava
Indrava Roy is an Assistant Professor of Mathematics at the Institute of Mathematical Sciences, Chennai.More info
Teaching Assistant(s)
No teaching assistant data available for this course yetCourse Duration : Sep-Dec 2020
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Enrollment : 20-May-2020 to 21-Sep-2020
Exam registration : 14-Sep-2020 to 02-Nov-2020
Exam Date : 19-Dec-2020
Enrolled
1233
Registered
12
Certificate Eligible
8
Certified Category Count
Gold
0
Silver
4
Elite
2
Successfully completed
2
Participation
0
Success
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Category : Successfully Completed
Elite
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Category : Elite
Silver
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Category : Silver
Gold
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Category : Gold
Legend
AVERAGE ASSIGNMENT SCORE >=10/25 AND EXAM SCORE >= 30/75 AND FINAL SCORE >=40BASED ON THE FINAL SCORE, Certificate criteria will be as below:
>=90 - Elite + Gold
75-89 -Elite + Silver
>=60 - Elite
40-59 - Successfully Completed
Final Score Calculation Logic
- Assignment Score = Average of best 8 out of 12 assignments.
- Final Score(Score on Certificate)= 75% of Exam Score + 25% of Assignment Score
Enrollment Statistics
Total Enrollment: 1233
Registration Statistics
Total Registration : 12
Assignment Statistics
Exam score
Final score