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Mathematical aspects of the physics with non-self-adjoint operators / Les aspects mathématiques de la physique avec les opérateurs non-auto-adjoints
5 videos

Mathematical aspects of the physics with non-self-adjoint operators / Les aspects mathématiques de la physique avec les opérateurs non-auto-adjoints

Mathematical aspects of the physics with non-self-adjoint operators / Les aspects mathématiques de la physique avec les opérateurs non-auto-adjoints
5 videos

Mathematical aspects of the physics with non-self-adjoint operators / Les aspects mathématiques de la physique avec les opérateurs non-auto-adjoints

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Mathematical aspects of the physics with non-self-adjoint operators / Les aspects mathématiques de la physique avec les opérateurs non-auto-adjoints

Collection Mathematical aspects of the physics with non-self-adjoint operators / Les aspects mathématiques de la physique avec les opérateurs non-auto-adjoints

Organizer(s) Lucrezia Cossetti (University of the Basque Country) Borbala Gerhat (Institute of Science and Technology Austria) David Krejčiřík (Czech Technical University of Prague) Petr Siegl (Graz University of Technology)
Date(s) 20/04/2026 - 24/04/2026
linked URL https://conferences.cirm-math.fr/3476.html
00:00:00 / 00:00:00
4 5

Jumps, cusps and fractals in the solution of dispersive equations

By Beatrice Pelloni

I will discuss the unexpected changes in regularity in the behaviour of periodic solutions of dispersive equations, through the asymptotic study of their spectral structure.

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Citation data

  • DOI 10.24350/CIRM.V.20473903
  • Cite this video Pelloni, Beatrice (20/04/2026). Jumps, cusps and fractals in the solution of dispersive equations. CIRM. Audiovisual resource. DOI: 10.24350/CIRM.V.20473903
  • URL https://dx.doi.org/10.24350/CIRM.V.20473903

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Bibliography

  • BOULTON, Lyonell, FARMAKIS, George, PELLONI, Beatrice, et al. Jumps and cusps: A new revival effect in local dispersive PDEs. arXiv preprint arXiv:2403.01117, 2024. - https://doi.org/10.48550/arXiv.2403.01117

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