Mathematical Physics and Gravity (MAF900)
The course gives an introduction to a selection of modern topics in mathematical physics, gravity and supersymmetry.
Course description for study year 2024-2025. Please note that changes may occur.
Course code
MAF900
Version
1
Credits (ECTS)
10
Semester tution start
Spring, Autumn
Number of semesters
1
Exam semester
Spring, Autumn
Language of instruction
English
Content
The course consists of two modules, the obligatory module 1 on differential geometry and one module chosen each year according to the composition of the PhD student body from among module 2 and 3.
Module 1 (5ECTS- FIXED): Differential Geometry
Lie groups / algebras, group effects, subjects from differential geometry (including Differential Forms, orthogonal frames), fiber bundles, tangent bundles, connections.
Module 2 (5ECTS - option1): Supersymmetry:
The module begins with a brief historical and motivational interlude, followed by a review of the necessary mathematical preliminaries including Lie algebras, representations, Lie superalgebras, Clifford algebras, spin groups and spinor representations. The Poincaré (and conformal) algebras will then be introduced as the (conformal) isometry algebras of Minkowski space, followed by their supersymmetric extensions. A brief review of the classification of unitary irreducible representations of the Poincaré group and particle states in field theory will then be given before discussing some concrete examples, together with their associated lagrangians, symmetries and equations of motion. Various supersymmetric extensions of these models will then be presented (in order of increasing complexity) with emphasis on how they realise the Poincaré and conformal superalgebras as supersymmetries. Time permitting, we will then choose from a selection of advanced topics to conclude the module with.
Module 3 (5ECTS - option2): Gravitational waves:
Theory of gravitational waves: The theoretical ideas of what gravitational waves are, how they propagate and how they are produced.
Detection of gravitational waves: The theory of how gravitational waves are detected, and the technology needed to detect them.
Data analysis for gravitational waves: The statistical methods used to find gravitational wave signals in noisy data and the tools used to infer the source properties
Learning outcome
Module 1 (5ECTS- FIXED): Differential Geometry
Manifolds, Lie groups / algebras, group action, subjects from differential geometry (including Differential Forms, orthogonal frames), fiber bundles, tangent bundles, connections.
Module 2 (5ECTS - option1): Supersymmetry:
The module begins with a brief historical and motivational interlude, followed by a review of the necessary mathematical preliminaries including Lie algebras, representations, Lie superalgebras, Clifford algebras, spin groups and spinor representations. The Poincaré (and conformal) algebras will then be introduced as the (conformal) isometry algebras of Minkowski space, followed by their supersymmetric extensions. A brief review of the classification of unitary irreducible representations of the Poincaré group and particle states in field theory will then be given before discussing some concrete examples, together with their associated lagrangians, symmetries and equations of motion. Various supersymmetric extensions of these models will then be presented (in order of increasing complexity) with emphasis on how they realise the Poincaré and conformal superalgebras as supersymmetries. Time permitting, we will then choose from a selection of advanced topics to conclude the module with.
Module 3 (5ECTS - option2): Gravitational waves:
Theory of gravitational waves: The theoretical ideas of what gravitational waves are, how they propagate and how they are produced.
Detection of gravitational waves: The theory of how gravitational waves are detected, and the technology needed to detect them.
Data analysis for gravitational waves: The statistical methods used to find gravitational wave signals in noisy data and the tools used to infer the source properties
Required prerequisite knowledge
Recommended prerequisites
Exam
Form of assessment | Weight | Duration | Marks | Aid |
---|---|---|---|---|
Oral exam | 1/1 | Passed / Not Passed | None permitted |