This mini-course’s aim is to introduce some concepts of Differential Geometry centred around Riemannian and complex manifolds defined with reference to the action of a Lie group. The approach will be elementary and previous knowledge of manifolds - albeit useful - will not be essential. Through examples we will familiarise ourselves with several important properties and results.
Depending on time and the participants’ interest, we could address some of the following:
Matrix groups: revisiting classical examples, properties, the concept of a Lie group.
Lie algebras and differential forms: definition of Lie algebra via the exterior derivative, nilpotent algebras, computing cohomology by invariant forms.
Metric structures on Lie groups: invariant and bi-invariant Riemannian metrics, curvature.
Transformation groups: group actions, examples of homogeneous spaces, the Erlangen Programme.
Structures arising from closed forms: symplectic forms, the Kähler property, existence and non-existence theorems.
Other geometric applications.
Reference textbooks:
• B.Hall, Lie algebras, Lie groups and representations, Springer, 2015
• J.Stillwell, Naive Lie theory, Springer, 2008
• S.Chiossi, Lectures on Lie theory: the geometry of Lie groups, Lie algebras and their representations, in preparation (version 2026).
Schedule:
Tuesday 12 May, 10:30-12:30 Room L + 16:30-17:30 Room F
Wednesday 13 May, 14:30-17:30 Room L
Tuesday 19 May, 10:30-12:30 Room L + 12:30-13:30 Room E
Wednesday 20 May, 14:30-17:30 Room L
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