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Unit information: Measure Theory and Integration in 2019/20

Please note: Due to alternative arrangements for teaching and assessment in place from 18 March 2020 to mitigate against the restrictions in place due to COVID-19, information shown for 2019/20 may not always be accurate.

Please note: you are viewing unit and programme information for a past academic year. Please see the current academic year for up to date information.

Unit name Measure Theory and Integration
Unit code MATH30007
Credit points 20
Level of study H/6
Teaching block(s) Teaching Block 1 (weeks 1 - 12)
Unit director Dr. Misha Rudnev
Open unit status Not open
Pre-requisites

MATH20006 Metric Spaces

Co-requisites

None

School/department School of Mathematics
Faculty Faculty of Science

Description

Unit Aims

The aim of the unit is to introduce measure theory and the Lebesgue integral.

Unit Description

The course introduces the Lebesgue integral and develops the elements of measure theory. We will, (i) generalise the notions of "length", "area" and "volume", (ii) find out which functions can be integrated, and (iii) prove the main properties of the Lebesgue integral.

Relation to Other Units

This unit is an element of a sequence of courses following on Level C/4 Analysis and Level I/5 Metric Spaces and Multivariable Calculus. It is a prerequisite for the Level M/7 unit Advanced Topics in Analysis.

Intended learning outcomes

At the end of the course the student should know and understand the definitions and theorems (and their proofs), and should be able to use the ideas of the course in unseen situations.

Teaching details

A standard lecture course of lectures, revision classes and problem classes

Assessment Details

100% examination

Raw scores on the examinations will be determined according to the marking scheme written on the examination paper. The marking scheme, indicating the maximum score per question, is a guide to the relative weighting of the questions. Raw scores are moderated as described in the Undergraduate Handbook.

If you fail this unit and are required to resit, reassessment is by a written examination in the August/September Resit and Supplementary exam period.

Reading and References

Recommended

  • G. de Barra, Measure Theory and Integration, Ellis Horwood, 2003
  • Robert Gardner Bartle, The Elements of Integration and Lebesque Measure, Wiley Classics Library, 1995
  • Paul R. Halmos, Measure Theory, Springer-Verlag New York, 1974
  • Andreń≠ Nikolaevich Kolmogorov, Sergei Vasil'evich Fomin, Elements of the Theory of Functions and Functional Analysis, Dover Publications Inc., 1999

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