Information and Coding Theory

Information and Coding Theory - Autumn 2014

TTIC 31200/CMSC 37220

T Th 10:30-11:50, TTIC Room 530

This course is meant to serve as an introduction to some basic concepts in information theory and error-correcting codes, and some of their applications in computer science and statistics. We plan to cover the following topics:

Introduction to entropy and source coding. Some applications of entropy to counting problems.
Mutual information and KL-divergence. Method of types and hypothesis testing. I-projections and applications.
Introduction to error-correcting codes. Unique and list decoding of Reed-Solomon and Reed-Muller codes.
Applications of information theory to lower bounds in computational complexity and communication complexity.

The course will have 3-4 homeworks. Each student will also be expected to scribe 1-2 lectures.

There is no textbook for this course. A useful reference is ``Elements of Information Theory'' by T. M. Cover and J. A. Thomas. Also take a look at the resources section below.

Homeworks

Homework 1 (Due in class on 10/28/14).
Homework 2 (Due in class on 11/25/14).
Homework 3 (Due on 12/4/14).

Lecture Plan and Notes

9/30: Entropy of a random variable. Prefix-free codes and Kraft's inequality.
[Notes]
10/2: Conditional and joint entropy. Subadditivity of entropy and combinatorial applications. Fundamental source coding theorem.
[Notes]
10/7: Some applications of entropy to combinatorics.
[Notes]
10/9: Mutual information and KL-divergence.
[Notes]
10/14: Proof of Pinsker's inequality. Lower bound for distinguishing coins.
[Notes]
10/16: Lower bound for multi-armed bandits.
[Notes]
10/21: Method of types and large deviations.
[Notes]
10/23: Sanov's theorem and applications. Introduction to hypothesis testing.
[Notes]
10/28: Analysis of hypothesis testing.
10/30: I-projections and their properties. Parameter estimation and the Cramér-Rao bound.
[Notes]
11/4: Algebra review. Introduction to error-correcting codes.
[Notes]
11/6: The Hamming code and Hamming bound. Reed-Solomon codes and the Berlekamp-Welch decoding algorithm.
[Notes]
11/11: Analysis of the unique decoding algorithm. List decoding of Reed-Solomon codes.
[Notes]
11/13: Reed-Muller codes and local decoding.
[Notes]
11/18: Regev's information-theoretic proof of lower bound for dimension reduction in L₁.
11/20: Lower bound for dimension reduction in L₁ (contd). Introduction to the Lovász local lemma.
11/25: Moser's information-theoretic proof of the constructive Lovász local lemma. Communication complexity and the information content of protocols.
12/2: Guest lecture by Brendan Juba on Universal Semantic Communication.
This lecture will be in TTIC Room 526

Resources

Shannon's original paper.
Notes by Jaikumar Radhakrishnan on "Entropy and Counting".
A survey on information-theoretic methods in statistics.
Draft of a new book on coding theory by Guruswami, Rudra and Sudan.
Other courses with overlapping content:
- Information Theory and its applications in theory of computation by Venkatesan Guruswami.
- Information Theory in Computer Science by Anup Rao.
- Information Theory in Computer Science by Mark Braverman.