- Module code: MA912
- Module name: Analysis for Linear PDEs
- Department: Mathematics Institute
- Credit: 15
Module content and teaching
The purpose of this module is to provide an introduction to Hilbert and Banach space methods for the analysis of partial differential equations (PDEs), primarily in the linear case.
Principal learning outcomes
Approach and solve difficult problems in linear PDEs with confidence and skill; Appreciate the range of theoretical tools available, understand how to apply these and select the appropriate tool for a variety of applied settings involving linear PDEs with confidence and skill; Appreciate the range of theoretical tools available, understand how to apply these and select the appropriate tool for a variety of applied settings involving linear PDEs ; Have a deep understanding of some of the main ideas and techniques in modern analysis associated with the research areas of MASDOC.
Timetabled teaching activities
Lectures per week: 3 hours; Module duration: 10 weeks; Total contact hours: 30 hours; Private study and group working: 90.
Other essential notes
Available for MSc Mathematics and Statistics (MASDOC) students
|Assessment group||Assessment name||Percentage|
|15 CATS (Module code: MA912-15)|
|A (Assessed work only)||Assessed Course Work||50%|
|Assessed Course Work||50%|
This module is available on the following courses:
- Postgraduate Taught Mathematics (G1P0) - Year 2
- Postgraduate Taught Mathematics (Diploma plus MSc) (G1PC) - Year 2
- Postgraduate Taught Interdisciplinary Mathematics (Diploma plus MSc) (G1PD) - Year 2