Title:
Strichartz inequalities with white noise potential on compact surfaces
Author(s):
Mouzard, Antoine; Zachhuber, Immanuel
Year of publication:
2024
Available Date:
2024-06-20T07:51:16Z
Abstract:
We prove Strichartz inequalities for the Schrödinger equation and the wave equation with multiplicative noise on a two-dimensional manifold. This relies on the Anderson Hamiltonian described using high-order paracontrolled calculus. As an application, it gives a low-regularity solution theory for the associated nonlinear equations.
Part of Identifier:
e-ISSN (online): 1948-206X
Keywords:
Anderson Hamiltonian
paracontrolled calculus
white noise
Schrödinger operator
Strichartz inequalities
DDC-Classification:
510 Mathematik
Publication Type:
Wissenschaftlicher Artikel
URL of the Original Publication:
DOI of the Original Publication:
Journaltitle:
Analysis & PDE
Department/institution:
Mathematik und Informatik
Institut für Mathematik
