Martin Spitz

mspitz@math.uni-bielefeld.de
ORCID logo https://orcid.org/0000-0003-4888-3909

PEVZ-ID
180012903

10 Publikationen

Alle markieren

  • [10]
    2023 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2954456 OA
    Herr, S.; Kato, I.; Kinoshita, S.; Spitz, M. (2023): Local well-posedness of a system describing laser-plasma interactions Vietnam Journal of Mathematics. Special issue dedicated to Carlos Kenig on the occasion of his 70th birthday.,51: 759-770.
    PUB | PDF | DOI | Download (ext.) | WoS | arXiv
     
  • [9]
    2023 | Preprint | Veröffentlicht | PUB-ID: 2967998
    Herr, S.; Röckner, M.; Spitz, M.; Zhang, D. (2023): The three dimensional stochastic Zakharov system
    PUB | arXiv
     
  • [8]
    2023 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2967813
    Spitz, M. (2023): Almost sure local wellposedness and scattering for the energy-critical cubic nonlinear Schrödinger equation with supercritical data Nonlinear Analysis,229:113204
    PUB | DOI | WoS
     
  • [7]
    2022 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2966263
    Spitz, M. (2022): On the almost sure scattering for the energy-critical cubic wave equation with supercritical data Communications on Pure and Applied Analysis,21:(12): 4041-4070.
    PUB | DOI | WoS
     
  • [6]
    2022 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2967431
    Schnaubelt, R.; Spitz, M. (2022): Local wellposedness of quasilinear Maxwell equations with conservative interface conditions Communications in Mathematical Sciences,20:(8): 2265-2313.
    PUB | DOI | Download (ext.) | WoS
     
  • [5]
    2022 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2958887
    Spitz, M. (2022): Randomized final-state problem for the Zakharov system in dimension three Communications in Partial Differential Equations ,47:(2): 346-377.
    PUB | DOI | WoS
     
  • [4]
    2022 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2958894
    Spitz, M. (2022): Regularity theory for nonautonomous Maxwell equations with perfectly conducting boundary conditions Journal of Mathematical Analysis and Applications,506:(1):125646
    PUB | DOI | WoS
     
  • [3]
    2021 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2950200
    Schnaubelt, R.; Spitz, M. (2021): Local wellposedness of quasilinear Maxwell equations with absorbing boundary conditions Evolution Equations and Control Theory ,10:(1): 155-198.
    PUB | DOI | WoS
     
  • [2]
    2019 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2962784
    Spitz, M. (2019): Local wellposedness of nonlinear Maxwell equations with perfectly conducting boundary conditions Journal of Differential Equations,266:(8): 5012-5063.
    PUB | DOI | WoS
     
  • [1]
    2017 | Dissertation | Veröffentlicht | PUB-ID: 2962785
    Spitz, M. (2017): Local Wellposedness of Nonlinear Maxwell Equations. Karlsruhe: Karlsruher Inst. für Technologie, Bibliothek.
    PUB | DOI
     
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