Computational complexity studies the inherent power and limitations of various computational processes, be they natural, engineered, or imaginary. Here are some examples:
Complexity theory does not yet know the answers to these questions, but it shows that they (and many others) are deeply interconnected. In this course we will study the methodology and some of the tools that are used to establish these connections.
The course will cover ''classical'' topics in complexity theory as well as some recent developments.
| date | topic | |
|---|---|---|
| 1 | Jan 16 | Introduction, P and NP
Notes: Arora-Barak Chapters 1 and 2, Trevisan Lecture 1 |
| 2 | Jan 18 | NP completeness, hierarchy theorems
Notes: Arora-Barak Chapter 3, Trevisan Lecture 1 |
| 3 | Jan 23 | The polynomial hierarchy, oracles
Notes: Arora-Barak Chapter 5, Trevisan Lecture 3 |
| 4 | Jan 25 | Circuits, Karp-Lipton-Sipser theorem
Notes: Trevisan Lecture 4 |
| 5 | Jan 30 | Randomized algorithms, polynomial identity testing
Notes: Trevisan Lectures 5, 6 |
| 6 | Feb 1 | More on BPP, unique solutions
Notes: Trevisan Lectures 5, 7 |
| 7 | Feb 6 | Counting problems, approximate counting
Notes: Trevisan Lecture 8 |
| 8 | Feb 8 | Toda's theorem
Notes: Proof of Toda's theorem |
| 9 | Feb 13 | Worst-case and average-case equivalence for #P
Notes: Trevisan Lecture 9 |
| 10 | Feb 15 | Average-case complexity for NP
Notes: Average-case complexity |
| 11 | Feb 20 | Average-case completeness
Notes: From last lecture |
| 12 | Feb 22 | One-way functions and pseudorandom generators
Notes: One-way functions and pseudorandom generators |
| 13 | Feb 27 | The Goldreich-Levin theorem
Notes: Arora-Barak Chapter 10, Section 3 |
| 14 | Mar 1 | Space complexity
Notes: Trevisan Lecture 2 |
| 15 | Mar 6 | Interactive proofs
Notes: Arora-Barak Chapter 8, Trevisan Lecture 13 |
| 16 | Mar 8 | Interactive proofs for PSPACE
Notes: IP = PSPACE |
| 17 | Mar 20 | PCPs and constraint satisfaction problems
Notes: Arora-Barak §18.1, §18.2 |
| 18 | Mar 22 | Local testing and local decoding
Notes: Arora-Barak §18.4 |
| 19 | Mar 27 | Expanders and eigenvalues
Notes: Random walks and expanders |
| 20 | Mar 29 | More on expanders; the PCP theorem
Notes: From last lecture; Arora-Barak §18.5 |
| 21 | Apr 3 | Arity reduction, regularizing, expanderizing
Notes: Arora-Barak §18.5, omitted proofs |
| 22 | Apr 5 | Alphabet reduction, gap amplification
Notes: Arora-Barak §18.5 |
| 23 | Apr 10 | Finish gap amplification; Circuit lower bounds
Notes: Trevisan lecture 19 |
| 24 | Apr 12 | Lower bounds for constant depth circuits via polynomials
Notes: Trevisan lecture 19 |
| Apr 17 | Classes cancelled campuswide | |
| 25 | Apr 19 | Circuit lower bounds via the switching lemma
Notes: Trevisan lecture 20 |
| 26 | Apr 24 | Relativizing proofs and natural proofs
Notes: Arora-Barak §3.5, Chapter 22 |
| 27 | Apr 26 | Project presentations |
In the first part of the course we will focus on the following topics.
Here are some topics that we may talk about in the second part. This list should provide a representative sample though I do not expect we will have enough time to touch upon all of them.