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MA3XJ - Integral Equations

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MA3XJ-Integral Equations

Module Provider: Mathematics and Statistics
Number of credits: 10 [5 ECTS credits]
Level:6
Terms in which taught: Spring term module
Pre-requisites: MA2DE Differential Equations and MA1RA1 Real Analysis I or MA2RA1 Real Analysis I
Non-modular pre-requisites:
Co-requisites:
Modules excluded: MA4XJ Integral Equations
Current from: 2020/1

Module Convenor: Prof Simon Chandler-Wilde

Email: s.n.chandler-wilde@reading.ac.uk

Type of module:

Summary module description:

This module in concerned with the theory, application and solution of integral equations, with an emphasis on applications that are part of research across the School, at ºÚ¹Ï³ÔÁÏÍø (for example wave scattering of water waves, of acoustic and electromagnetic waves by atmospheric particles, etc.).


Aims:

To introduce students to the theory, application and solution of integral equations, with some emphasis on aspects relevant to the large research effort in this area in mathematics and meteorology.


Assessable learning outcomes:

By the end of the module students are expected to be able to:

•ÌýÌý Ìýformulate integral equations as problems in a Banach space;Ìý

•ÌýÌý Ìýapply approximation techniques for solving integral equations and be able to draw conclusions about their accuracy;Ìý

•ÌýÌý Ìýformulate one-dimensional wave-scattering problems as integral equations.



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Additional outcomes:

Outline content:

In applied mathematics many physical problems are best formulated as integral equations. In this course, a general introduction to the key issues is followed by a discussion of widely used approximation techniques, and this leads on to a detailed examination of real-world wave-scattering problems, arising in our research in mathematics, and in applications in meteorology. The main components of the module are:Ìý



•ÌýÌý ÌýClassification of integral equat ions.

•ÌýÌý ÌýExact solution of degenerate kernel Fredholm integral equations.

•ÌýÌý ÌýBoundedness of integral operators with continuous and weakly singular kernels, and computation of the norm.Ìý

•ÌýÌý ÌýQuestions of uniqueness and existence of solution (in part tackled by functional analysis methods): the Fredholm alternative and Neumann series.Ìý

•ÌýÌý ÌýNumerical method s for Fredholm and Volterra integral equations, namely degenerate kernel approximations and Trapezium rule time-stepping.

•ÌýÌý ÌýApplications of integral equation methods to wave scattering: the Lippmann Schwinger integral equation and application in atmospheric particle scattering.

•ÌýÌý ÌýThe numerical analysis of the trapezium rule method for Volterra integral equations via Gronwall inequalities.


Brief description of teaching and learning methods:

Lectures, with some supported by course notes, problem sheets.


Contact hours:
Ìý Autumn Spring Summer
Lectures 20
Tutorials 4
Guided independent study: 76
Ìý Ìý Ìý Ìý
Total hours by term 100
Ìý Ìý Ìý Ìý
Total hours for module 100

Summative Assessment Methods:
Method Percentage
Written exam 85
Set exercise 15

Summative assessment- Examinations:

2 hours.


Summative assessment- Coursework and in-class tests:

Formative assessment methods:

Penalties for late submission:

The Module Convenor will apply the following penalties for work submitted late:

  • where the piece of work is submitted after the original deadline (or any formally agreed extension to the deadline): 10% of the total marks available for that piece of work will be deducted from the mark for each working day[1] (or part thereof) following the deadline up to a total of five working days;
  • where the piece of work is submitted more than five working days after the original deadline (or any formally agreed extension to the deadline): a mark of zero will be recorded.
The University policy statement on penalties for late submission can be found at:
You are strongly advised to ensure that coursework is submitted by the relevant deadline. You should note that it is advisable to submit work in an unfinished state rather than to fail to submit any work.

Assessment requirements for a pass:

A mark of 40% overall.


Reassessment arrangements:

One examination paper of 2 hours duration in August/September - the resit module mark will be the higher of the exam mark (100% exam) and the exam mark plus previous coursework marks (85% exam, 15% coursework).


Additional Costs (specified where applicable):

Last updated: 4 April 2020

THE INFORMATION CONTAINED IN THIS MODULE DESCRIPTION DOES NOT FORM ANY PART OF A STUDENT'S CONTRACT.

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