Skip to Content

Analysis - MATH701

This unit provides an advanced introduction to the key areas of research interest in modern analysis. We will study Lebesgue integration, positive Borel measures, and the all important function spaces Lp. Then we will study the elementary Hilbert space theory and Banach space techniques. This will provide familiarity with some of the major theorems which make up the analysis toolbox: Monotone and Dominated Convergence theorems; Fatou's lemma; Egorov's theorem; Lusin's theorem; Radon-Nikodym theorem; Fubini-Tonelli theorems about product measures and integration on product spaces; Uniform Boundedness; Fundamental Theorem of Calculus for Lebesgue Integrals; Minkowski's Inequality; Holder's Inequality; Jensen's Inequality; and Bessel's Inequality.

Credit Points: 4
When Offered:

S1 Day - Session 1, North Ryde, Day

Staff Contact(s): Mathematics staff
Prerequisites:

Admission to MRes Prerequisite Information

Corequisites:

NCCW(s):
Unit Designation(s):
Unit Type:
Assessed As: Graded
Offered By:

Department of Mathematics

Faculty of Science and Engineering

Course structures, including unit offerings, are subject to change.
Need help? Ask us.