Lecture Summaries -- Winter 2012

Week 1

Week 2

Herb Wilf was a combinatorialist at the University of Pennsylvania who just recently passed away.

Lecture 3: Wednesday, January 11, 2012:
Problem Set 2 is available and due January 18. Theorem 2.3.6. Definitions of conjugates and bordered words. Theorems 2.4.2 and 2.4.3, Lemma 2.4.4, Theorem 2.4.5.

Solutions to Problem Set 1 are available, but you need a username and password that will be distributed on Monday, January 16 (or contact the instructor or TA).

Week 3

Open problem #3: What are the properties of the lexicographically least squarefree word?

Lecture 5: Wednesday, January 18, 2012:
We covered the remaining material in Section 2.6. We also began Chapter 3, covering the material in Section 3.2.

Problem Set 1 (marked) was returned. Problem Set 3 is now available on the course home page, and the solutions to Problem Set 2 are there.

Open problem #9: Is there an infinite word over a finite subset of N with no two consecutive blocks of the same size and the same sum?

Week 4

Lecture 7: Wednesday, January 25 2012: The Kolakoski word: an open problem about transducers. More on transducers: sketch of the proof of Nivat's theorem. The operation cyc(L) and proof that if L is regular, then so is cyc(L). Introduction to 2DFA's.

Problem Set 4 is available from the course home page, and the solutions to Problem Set 3 are available, too.

Week 5

We introduced the transformation automaton, and showed how it could be used to accept T(L), where L is a regular language and T is the map T(L) = { x : x* ⊆ L }.

Lecture 9: Wednesday, February 1 2012: Automata and boolean matrices. Section 3.8. Introduction to the Myhill-Nerode theorem (p. 77).

Open problem: show how to find all the strings accepted by an n-state unary acyclic NFA in O(n²) time.

Week 6

Lecture 11: Wednesday, February 8 2012: Minimization of finite automata. Section 3.10.

Problem Set 6 is available from the course home page, and the solutions to Problem Set 5 are available, too.

Week 7

I mentioned two open problems: Number 7 on the list is to determine good upper and lower bounds on the worst-case state complexity of (c(L^*))^*. Here by c(A) I mean the complement of A.

The second (Number 5 on the list) is to determine the distribution of state sizes in the minimal dfa for the reversed language L^R, where L is accepted by an n-state DFA.

Lecture 13: Wednesday, February 15 2012: Partial orders and regular languages: section 3.12 of the textbook.

Two open problems: Number 5: Does every power of 16 greater than 16⁴ have a digit 1, 2, 4, or 8 when written in base 10?

Number 12: Is there a prime of the form 8 · 13⁴ⁱ + 183 for i ≥ 1? Resolving this would allow a classification of the minimal elements of the primes expressed in base 13.

Update: Curtis Bright has found a "probably prime" for i = 8005.

Problem Set 7 is available from the course home page. It is due on February 29, so you have two weeks to do it. The solutions to Problem Set 6 are available.

Week 8: No class (reading week)

Week 9

Open problem: let p be a polynomial of degree ≥ 2 such that p(N) ⊆ N. Let k be an integer ≥ 2. Prove or disprove: for all such p and k, { (p(n))_{k : n ≥ 0 } is not a CFL.}

Lecture 15: Wednesday, February 29 2012: proof of Ogden's lemma. Ambiguity of context-free grammars. Inherent ambiguity of context-free languages. Proof of inherent ambiguity of a language.

Problem Set 8 is available from the course home page. It is due on March 7. The solutions to Problem Set 7 are available.

Week 10

Lecture 17: Wednesday, March 7 2012: More about Parikh's theorem. The interchange lemma.

Week 11

Lecture 18: Wednesday, March 14, 2012: Shuo Tan will give a guest lecture on non-closure of CFL's under quotient, and deterministic context-free languages.

Week 12

Lecture 20: Wednesday, March 21 2012: LR(0) parsing. The Knuth NFA and DFA. Using the Knuth DFA to parse.

Week 13

Lecture 22: Wednesday, March 28 2012: More on 2DPDA's. Sketch of simulation. The Chomsky hierarchy. Context-sensitive grammars. Length-increasing grammars. Unrestricted grammars.

Week 14