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How and why we do mathematical proofs
This is a module framework. It can be viewed online or downloaded as a zip file.
As taught in Autumn Semester 2009/10
The aim of this short unit is to motivate students to understand why we might want to do proofs ...
Why do we do proofs?
The aim of this session is to motivate students to understand why we might want to do proofs, why proofs are important, and how they can help us. In particular, the student will learn the following: proofs can help you to ...
Definitions, proofs and examples
During the academic year 2011-12, Dr Joel Feinstein gave five optional example classes to his second-year Mathematical Analysis students on Definitions, Proofs and Examples. Dr Feinstein recorded videos of these classes ...
Regularity conditions for Banach function algebras
In June 2009 the Operator Algebras and Applications International Summer School was held in Lisbon. Dr Joel Feinstein taught one of the four courses available on Regularity conditions for Banach function algebras. He ...
Functional analysis 2010
This is a module framework. It can be viewed online or downloaded as a zip file.
As taught Autumn semester 2010.
Functional analysis begins with a marriage of linear algebra and metric topology. These work together ...
Mathematical analysis
This is a module framework. It can be viewed online or downloaded as a zip file.
It is as taught in 2009-2010.
This module introduces mathematical analysis building upon the experience of limits of sequences and ...
Functional analysis
As taught in 2006-2007 and 2007-2008.
Functional analysis begins with a marriage of linear algebra and metric topology. These work together in a highly effective way to elucidate problems arising from differential ...
Beyond infinity
This popular maths talk gives an introduction to various different kinds of infinity, both countable and uncountable. These concepts are illustrated in a somewhat informal way using the notion of Hilbert's infinite hotel. ...
Uniform convergence and pointwise convergence
The aim of this material is to introduce the student to two notions of convergence for sequences of real-valued functions. The notion of pointwise convergence is relatively straightforward, but the notion of uniform ...
Introduction to compact operators
The aim of this session is to cover the basic theory of compact linear operators on Banach spaces. This includes definitions and statements of the background and main results, with illustrative examples and some ...