620-312 Linear Analysis

Credit Points

Coordinator

Prerequisites

620-311.

Semester

Contact

Subject Description

The most important topic of this course is integration. Students meet this concept in a calculus course where an integral is defined as a Riemann integral. Although a Riemann integral is useful in many areas of mathematics, it is not adequate for many problems of modern analysis. The aim of the course is to introduce students to the Lesbesgue theory of integration and measure theory. Included in this course is an introduction to the fundamental concepts of functional analysis. Functional analysis os the common name for the study of infinite dimensional vector spaces and the linear maps between them. What distinguishes this subject from linear algebra is the role of topological considerations. These topics are not only beautiful and interesting but are also useful in other branches of mathematics such as probability theory, partial differential equations and quantum mechanics.

Construction of measures, measurable functions, Lesbesgue integrals, convergence theorems, L^p-spaces, Fubini's theorem, normed spaces and Banach spaces, inner product and Hilbert spaces, linear functionals and linear operators.

Assessment

Up to 24 pages of written assignments and a 3-hour end-of-semester written examination.