Difference between revisions of "Week 0"
From Research management course
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# Lectures on Discrete Geometry by Jiří Matoušek, 2002 | # Lectures on Discrete Geometry by Jiří Matoušek, 2002 | ||
# Thomas’ Calculus, based on the original work by George B. Thomas, Jr, 2010 | # Thomas’ Calculus, based on the original work by George B. Thomas, Jr, 2010 | ||
| + | # [https://drive.google.com/file/d/16SL9bQYar2ylDzHKNapBIDXCYUZEnRIh/view?fbclid=IwAR3fiuQgDJ0PRxv8o6UslbGx2ICdKxO2Li32FtwPJ_GbjRCXKhxa-BPZw2A Linear algebra by Jörg Liesen, Volker Mehrmann, 2015] | ||
| + | # [http://joshua.smcvt.edu/linearalgebra Linear algebra by Jim Hefferon, 2017] | ||
| + | <!--*[https://web.stanford.edu/~boyd/vmls/?fbclid=IwAR08VCHfJ1hVAvuVBW6G59CZZ9EWzAlm0yKnID82DP9G2YbmugzsYIQQ4W0 Introduction to Applied Linear Algebra – Vectors, Matrices, and Least Squares by Stephen Boyd and Lieven Vandenberghe, 2018]--> | ||
| + | # Lie Groups, Lie Algebras, and Representations: An Elementary Introduction by Brian Hall, 2015 | ||
# Mathematics for Physicists: Introductory Concepts and Methods by Alexander Altland and Jan von Delft, 2014 | # Mathematics for Physicists: Introductory Concepts and Methods by Alexander Altland and Jan von Delft, 2014 | ||
# Mathematical Methods for Physicists by Danilo Babusci, Giuseppe Dattoli, Silvia Licciardi and Elio Sabia, 2020 | # Mathematical Methods for Physicists by Danilo Babusci, Giuseppe Dattoli, Silvia Licciardi and Elio Sabia, 2020 | ||
# A First Course in Probability by Sheldon Ross, 2019 | # A First Course in Probability by Sheldon Ross, 2019 | ||
# Probability Theory by Alexandr A. Borovkov, 2009 | # Probability Theory by Alexandr A. Borovkov, 2009 | ||
| + | # Lectures on Probability Theory and Mathematical Statistics by Marco Taboga, 2012 | ||
| + | # Lectures on Probability Theory and Statistics by Boris Tsirelson and Wendelin Werner, 2002 | ||
# Elements of Information Theory by Thomas M. Cover and Joy A. Thomas, 2006 | # Elements of Information Theory by Thomas M. Cover and Joy A. Thomas, 2006 | ||
Revision as of 20:08, 21 February 2021
This course produces student research papers. It gathers research teams in a society. Each team combines a student, a consultant and an expert. The student is a project driver, who wants to plunge into scientific research activities. The consultant, a graduated student, conducts the research and helps the student. The expert, a professor, states the problem and enlightens the road to the goal.
Resources
- Introduction for students
- Introduction for colleagues
- Introduction [1] for the committee]
Student prerequisites
- Discrete Analysis and Set Theory
- Calculus and Mathematical Analysis
- Algebra, Group theory
- General Physics is highly welcome!
- Probability and Statistics
- Functional analysis is welcome
References to catch-up
- Graph Theory by Reinhard Diestel, 2017
- Lectures on Discrete Geometry by Jiří Matoušek, 2002
- Thomas’ Calculus, based on the original work by George B. Thomas, Jr, 2010
- Linear algebra by Jörg Liesen, Volker Mehrmann, 2015
- Linear algebra by Jim Hefferon, 2017
- Lie Groups, Lie Algebras, and Representations: An Elementary Introduction by Brian Hall, 2015
- Mathematics for Physicists: Introductory Concepts and Methods by Alexander Altland and Jan von Delft, 2014
- Mathematical Methods for Physicists by Danilo Babusci, Giuseppe Dattoli, Silvia Licciardi and Elio Sabia, 2020
- A First Course in Probability by Sheldon Ross, 2019
- Probability Theory by Alexandr A. Borovkov, 2009
- Lectures on Probability Theory and Mathematical Statistics by Marco Taboga, 2012
- Lectures on Probability Theory and Statistics by Boris Tsirelson and Wendelin Werner, 2002
- Elements of Information Theory by Thomas M. Cover and Joy A. Thomas, 2006