Aims

The aims of the course are to:

• provide an introduction to the various classes of PDE and the physical nature of their solution
• demonstrate how variational calculus can be used to derive both ordinary and partial differential equations, and also how the technique can be used to obtain approximate solutions to these equations

Objectives

As specific objectives, by the end of the course students should be able to:

• understand the various types of PDE and the physical nature of their solutions.
• understand various solution methods for PDEs and be able to apply these to a range of problems.
• understand the formulation of various physical problems in terms of variational statements
• estimate solutions using trial functions and direct minimisation;
• calculate an Euler-Lagrange differential equation from a variational statement, and to find the corresponding natural boundary conditions;
• perform vector manipulations using suffix notation.

Content

Partial differential equations (PDEs) occur widely in all branches of engineering science, and this course provides an introduction to the various classes of PDE and the physical nature of their solution. The second part of the course demonstrates how variational calculus can be used to derive both ordinary and partial differential equations, and also how the technique can be used to obtain approximate solutions to these equations. The final section on the summation convention provides a powerful mathematical tool for the manipulation of equations that arise in engineering analysis

Suffix notation and the summation convention (2L Dr J S Biggins)

Index notation for scalar, vector, and matrix products, and for grad, div and curl. Applications including Stokes’ theorem and the divergence theorem.

Variational methods in engineering analysis (6L DrJ S Biggins)

Introduction to variational calculus. Functionals and their first variation. Derivation of differential equations and boundary conditions from variational principles. The Euler-Lagrange equations. The effect of constraints. Applications in mechanics, optics, stress analysis, and optimal control.

Partial Differential Equations (8L Prof. P. A. Davidson)

What is a PDE? Classification of PDEs: elliptic/parabolic/hyperbolic types. Canonical examples of each type: Laplace/diffusion/wave equations. solving the diffusion equation. Solving the wave equation. Solving the Laplace equation.

This syllabus contributes to the following areas of the UK-SPEC standard:

Toggle display of UK-SPEC areas.

 
Last modified: 31/05/2019 12:16

Aims

The aims of the course are to:

• provide an introduction to the various classes of PDE and the physical nature of their solution
• demonstrate how variational calculus can be used to derive both ordinary and partial differential equations, and also how the technique can be used to obtain approximate solutions to these equations

Objectives

As specific objectives, by the end of the course students should be able to:

• understand the various types of PDE and the physical nature of their solutions.
• understand various solution methods for PDEs and be able to apply these to a range of problems.
• understand the formulation of various physical problems in terms of variational statements
• estimate solutions using trial functions and direct minimisation;
• calculate an Euler-Lagrange differential equation from a variational statement, and to find the corresponding natural boundary conditions;
• perform vector manipulations using suffix notation.

Content

Partial differential equations (PDEs) occur widely in all branches of engineering science, and this course provides an introduction to the various classes of PDE and the physical nature of their solution. The second part of the course demonstrates how variational calculus can be used to derive both ordinary and partial differential equations, and also how the technique can be used to obtain approximate solutions to these equations. The final section on the summation convention provides a powerful mathematical tool for the manipulation of equations that arise in engineering analysis

Suffix notation and the summation convention (2L Prof J S Biggins)

Index notation for scalar, vector, and matrix products, and for grad, div and curl. Applications including Stokes’ theorem and the divergence theorem.

Variational methods in engineering analysis (6L Prof J S Biggins)

Introduction to variational calculus. Functionals and their first variation. Derivation of differential equations and boundary conditions from variational principles. The Euler-Lagrange equations. The effect of constraints. Applications in mechanics, optics, stress analysis, and optimal control.

Partial Differential Equations (8L Dr J Li)

What is a PDE? Classification of PDEs: elliptic/parabolic/hyperbolic types. Canonical examples of each type: Laplace/diffusion/wave equations. Typical solution techniques and example solutions for simple geometries.

This syllabus contributes to the following areas of the UK-SPEC standard:

Toggle display of UK-SPEC areas.

 
Last modified: 31/05/2024 10:27

Objectives

As specific objectives, by the end of the course students should be able to:

• Be confident in communicating in the target language, especially in a work-related situation, as well as explaining and defending their opinion about specific issues and problems
• Use the language as a tool to improve their understanding of technology and culture
• Analyse a topic/an issue presented in German language, compare all the elements at play, synthesise the major points and make a balanced judgement

Content

This module will significantly enhance students’ receptive language skills so that, at the end of this course, students will be able to follow lectures and presentations in their subject area held in German as well as participate actively in question-and-answer sessions on engineering-related topics. By regular training and application of specific productive/expressive language skills, they will further improve their ability to take part in discussions of both general and engineering-related issues. Students will especially receive instruction/training in the delivery of presentations in German to prepare them for participation in international symposiums in German-speaking countries.

Particular emphasis will be put on:

• the creation of an understanding of the framework of German Engineering
• following and summarizing, as well as preparing and delivering, presentations in a foreign language

7 Lectures (various speakers) + 7 seminars (module leader)

• Presentations on engineering/science in German (5-6 Lectures)
• Presentations on cultural/social topics in German (1-2 Lectures)

Seminars

Associated with each lecture will be a one-hour seminar. This may be held before the lecture for preparation, or following the lecture for discussion purposes.

Support will be given with the following language related competences if necessary:

• How to follow, take notes and summarise a lecture in German
• How to give an oral presentation in German
• Technical and academic language

This syllabus contributes to the following areas of the UK-SPEC standard:

Toggle display of UK-SPEC areas.

 
Last modified: 13/06/2022 17:00

Objectives

As specific objectives, by the end of the course students should be able to:

• Be confident in communicating in the target language, especially in a work-related situation, as well as explaining and defending their opinion about specific issues and problems
• Use the language as a tool to improve their understanding of technology and culture
• Analyse a topic/an issue presented in German language, compare all the elements at play, synthesise the major points and make a balanced judgement

Content

This module will significantly enhance students’ receptive language skills so that, at the end of this course, students will be able to follow lectures and presentations in their subject area held in German as well as participate actively in question-and-answer sessions on engineering-related topics. By regular training and application of specific productive/expressive language skills, they will further improve their ability to take part in discussions of both general and engineering-related issues. Students will especially receive instruction/training in the delivery of presentations in German to prepare them for participation in international symposiums in German-speaking countries.

Particular emphasis will be put on:

• the creation of an understanding of the framework of German Engineering
• following and summarizing, as well as preparing and delivering, presentations in a foreign language

7 Lectures (various speakers) + 7 seminars (Alexander Bleistein)

• Engineering/Research-Presentations in German (5-6 Lectures)
• Presentations on cultural/social topics (1-2 Lectures)

Seminars

Associated with each lecture will be a one-hour seminar. This may be held before the lecture for preparation, or following the lecture for discussion purposes.

Support will be given with the following language related competences if necessary:

• How to follow, take notes and summarize a lecture in German
• How to give an oral presentation in German
• Engineering related language

This syllabus contributes to the following areas of the UK-SPEC standard:

Toggle display of UK-SPEC areas.

 
Last modified: 20/09/2019 09:37