Aimed primarily at undergraduate level university students, An Illustrative Introduction to Modern Analysis provides an accessible and lucid contemporary account of the fundamental principles of Mathematical Analysis.
The themes treated include Metric Spaces, General Topology, Continuity, Completeness, Compactness, Measure Theory, Integration, Lebesgue Spaces, Hilbert Spaces, Banach Spaces, Linear Operators, Weak and Weak* Topologies.
Suitable both for classroom use and independent reading, this book is ideal preparation for further study in research areas where a broad mathematical toolbox is required.
Table of Contents
1 Sets, mappings, countability and choice
2 Metric spaces and normed spaces
3 Completeness and applications
4 Topological spaces and continuity
5 Compactness and sequential compactness
6 The Lebesgue measure on the Euclidean space
7 Measure theory on general spaces
8 The Lebesgue integration theory
9 The class of Lebesgue functional spaces
10 Inner product spaces and Hilbert spaces
11 Linear operators on normed spaces
12 Weak topologies on Banach spaces
13 Weak* topologies and compactness
14 Functional properties of the Lebesgue spaces
15 Solutions to the exercises
Nikos Katzourakis is based at the University of Reading in the UK. His field of expertise lies in the analysis of nonlinear Partial Differential Equations and Calculus of Variations. His name is connected to contributions in vectorial variational problems for supremal functionals and generalised solutions for fully nonlinear systems.
Eugen Varvaruca is based at the University "Al. I. Cuza’’ of Iasi in Romania. His research work is concerned with the analysis of nonlinear Partial Differential Equations, focusing particularly on free-boundary problems in fluid dynamics. In 2012 he was awarded the Whitehead Prize by the London Mathematical Society for his contributions.