14.01.2026, 14:00 - 16:00
– Campus Golm, Building 9, Room 2.22 and via Zoom
Institutskolloquium
Getting to the chore of things
Christian Mercat (Lyon 1)
Peter Grabs
We investigate the Rarita-Schwinger operator using methods previously applied in the Dirac case. The structure of the underlying manifold \(\mathcal{S}^3 \cong \mathrm{SU}(2)\) as a Lie group implies that all associated bundles are trivial, so their sections can be seen as ordinary functions.
Due to the compactness of \(\mathcal{S}^3\), the Peter-Weyl theorem provides a decomposition of such function spaces into finite-dimensional summands. This simplifies the analysis of the operator, reducing the problem to a finite-dimensional setting where eigenvalues can be computed using linear algebra techniques.