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An introduction to those parts of modern analysis essential for many aspects of pure and applied mathematics, physics, economics and finance.
An introductory course into the parts of modern mathematics that arise from the idea of distance in finite and infinite dimensions. It is useful in understanding numerical algorithms, the basis of calculus, approximation methods, and the theoretical underpinnings of quantum mechanics.MATH343 is a course in metric space theory. It is designed for students who have two courses from MATH201, MATH202, MATH203, and MATH240, or a similar background. It explores the idea of distance, and uses it to define convergence, continuity, and related concepts.
This course will:develop metric space theory and its applications including convergence, open and closed sets, completeness, and compactnesslook at standard infinite dimensional spaces and the similarities and differences between them and finite dimensional spacesintroduce normed and Hilbert spaces
30 points from MATH201, MATH202, MATH203, MATH240, MATH 243, MATH270, EMTH210, EMTH211 or EMTH271.
Hannes Diener
Rick Beatson
Recommended reading:•Satish Shirali and Harkrishan L. Vasudeva, Metric Spaces, Springer, 2006.•Graeme Cohen, A course in Modern Analysis and its Applications, Cambridge University Press, 2003.•W. Rudin, Principles of Mathematical Analysis, McGraw-Hill.
MATH343 Homepage General information for students Library portal LEARN
Domestic fee $720.00
International fee $3,450.00
* All fees are inclusive of NZ GST or any equivalent overseas tax, and do not include any programme level discount or additional course-related expenses.
For further information see Mathematics and Statistics .