Class 5: Foundations of Modern Cryptography π by Professor Avishek Adhikari
Discover the essential mathematical concepts, including Abstract Algebra, that form the backbone of modern cryptography in this engaging lecture from Presidency University.
Avishek's Talk
285 views β’ May 10, 2021
About this video
In this class I talked about the Basic Mathematics, mostly the part of Abstract Algebra that will be required for our course on Cryptography. I started with the intuitive idea of basic motivations for group theory through examples, such as (Z,+). Then I talked about the cyclic group (Z_n,+), one of the most important groups that will be used in studying Public Key Cryptography. We also discussed about Euler phi function and Extended Euclidean Algorithm, the group of Units, i.e, U_n, Fermat's Little Theore, Euler's Theorem. Mostly I follow my book (currently Chapter 10):
Adhikari M R and Adhikari A: Basic Modern Algebra with Applications, Springer, 2014
Viewers are also requested to watch my following videos on Basic Group Theory to know more about basic group theory.
https://www.youtube.com/playlist?list=PLxPYbPBbtwgIhqjWVcXuGYK8zoJk4LQAa
Adhikari M R and Adhikari A: Basic Modern Algebra with Applications, Springer, 2014
Viewers are also requested to watch my following videos on Basic Group Theory to know more about basic group theory.
https://www.youtube.com/playlist?list=PLxPYbPBbtwgIhqjWVcXuGYK8zoJk4LQAa
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Video Information
Views
285
Likes
9
Duration
01:44:15
Published
May 10, 2021
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