**Next:**Computer Graphics and Image

**Up:**Lent Term 2008: Part

**Previous:**Compiler Construction

**Contents**

##

Computation Theory

*Lecturer: Dr J.K.M. Moody*

*No. of lectures:* 12

*Prerequisite course: Discrete Mathematics or Mathematics for Computation Theory*

*This course is a prerequisite for Complexity Theory (Part IB and Diploma), Quantum Computing (Part II and Diploma).*

**Aims**

The aim of this course is to introduce several apparently different formalisations of the informal notion of algorithm; to show that they are equivalent; and to use them to demonstrate that there are uncomputable functions and algorithmically undecidable problems.

**Lectures**

**Introduction: algorithmically undecidable problems.**Decision problems. The informal notion of algorithm, or effective procedure. Examples of algorithmically undecidable problems. [1 lecture]**Register machines.**Definition and examples; graphical notation. Register machine computable functions. Doing arithmetic with register machines. [1 lecture]**Universal register machine.**Natural number encoding of pairs and lists. Coding register machine programs as numbers. Specification and implementation of a universal register machine. [2 lectures]**Undecidability of the halting problem.**Statement and proof. Example of an uncomputable partial function. Decidable sets of numbers; examples of undecidable sets of numbers. [1 lecture]**Turing machines.**Informal description. Definition and examples. Turing computable functions. Equivalence of register machine computability and Turing computability. The Church-Turing Thesis. [2 lectures]**Primitive recursive functions.**Definition and examples. Primitive recursive partial function are computable and total. [1 lecture]**Partial recursive functions.**Definition. Existence of a recursive, but not primitive recursive function. Ackermann's function. A partial function is partial recursive if and only if it is computable. [2 lectures]**Recursive and recursively enumerable sets.**Decidability and recursive sets. Generability and recursive enumeration. Example of a set that is not recursively enumerable. Example of a recursively enumerable set that is not recursive. Alternative characterisations of recursively enumerable sets as the images and the domains of definition of partial recursive functions. [2 lectures]

**Objectives**

At the end of the course students should

- be familiar with the register machine and Turing machine models of computability
- understand the notion of coding programs as data, and of a universal machine
- be able to use diagonalisation to prove the undecidability of the Halting Problem
- understand the mathematical notion of partial recursive function and its relationship to computability
- be able to develop simple mathematical arguments to show that particular sets are not recursively enumerable

**Recommended reading**

* Hopcroft, J.E., Motwani, R. & Ullman, J.D. (2001). *Introduction to automata theory, languages, and computation*. Addison-Wesley (2nd ed.).

Cutland, N.J. (1980). *Computability. An introduction to recursive function theory*. Cambridge University Press.

Davis, M.D., Sigal, R. & Weyuker E.J. (1994). *Computability, complexity and languages*. Academic Press (2nd ed.).

Sudkamp, T.A. (1995). *Languages and machines*. Addison-Wesley (2nd ed.).

**Next:**Computer Graphics and Image

**Up:**Lent Term 2008: Part

**Previous:**Compiler Construction

**Contents**