OS Reelle Geometrie und Algebra: Fourier quasicrystals
Wann
Freitag, 10. November 2023
13:30 bis 15 Uhr
Wo
F 426
Veranstaltet von
Philipp di Dio / Markus Schweighofer
Vortragende Person/Vortragende Personen:
Mario Kummer (TU Dresden)
A crystalline measure is a tempered distribution with discrete support whose Fourier transform also has discrete support. Recently, Pavel Kurasov and Peter Sarnak answered a question of Yves Meyer by constructing crystalline measures on the real line with several desirable properties. The crucial ingredient of their construction are real stable polynomials. In the talk I will explain how to generalize their construction using the theory of real fibered morphisms and obtain suitable crystalline measures in higher dimensions.
This is a joint work in progress with Lior Alon, Pavel Kurasov and Cynthia Vinzant.