Math
784 — Spring 2001
Recursion Theory
| Instructor: |
Richard Shore |
| Time: |
TR 10:10–11:25 |
| Room: |
MT 203 |
Math 784 will be a first course in the theory of computability. We will
assume some background in logic. Math 681 or Computer Science 682 should
be more than sufficient. This term we will concentrate on the recursively
(computably) enumerable sets and degrees. The text will be Recursively
Enumerable Sets and Degrees by R. I. Soare (Springer-Verlag).
We will begin with a brief discussion of the basic properties of a reasonable
model of computability: universal machines, the enumeration, s-m-n and
recursion theorems, r.e. (effectively or computably enumerable) sets and
the halting problem (one week). Next will come the notions of relative
computability, the Turing jump operator and the arithmetical hierarchy
(two weeks).
There will be some development of construction procedures for non-r.e.
sets including the Kleene-Post finite extension method (really Cohen forcing
in arithmetic) and perhaps minimal degree constrictions by forcing with
trees (perfect set forcing). The heart of the course, however, will be
the development of various kinds of priority arguments for the construction
of r.e. sets including finite and infinite injury as well as tree arguments.
We will use these methods to analyze the structure of the (Turing) degrees
of r.e. sets and something of their set theoretic structure as well. Connections
between degree theoretic and other properties such as types of approximations,
rates of growth and complexity of definition will be considered.
Last modified:
April 7, 2003
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