Title:
Existence, regularity, and a strong Itô formula for the isochronal phase of SPDE
Author(s):
Adams, Zachary P.
Year of publication:
2024
Available Date:
2024-11-05T13:15:20Z
Abstract:
We prove the existence and regularity of the isochron map for stable invariant manifolds of a large class of evolution equations. Our results apply in particular to the isochron map of reaction-diffusion equations and neural field equations. Using the regularity properties proven here, we prove a strong Itô formula for the isochronal phase of stochastically perturbed travelling waves and other patterns appearing in SPDEs driven by white noise, even for SPDEs that only admit mild solutions.
Part of Identifier:
e-ISSN (online): 1083-589X
Keywords:
invariant manifold
isochronal phase
neural field equations
Reaction-diffusion equations
spiral waves
strong Itô formula
Travelling waves
DDC-Classification:
510 Mathematik
Publication Type:
Wissenschaftlicher Artikel
URL of the Original Publication:
DOI of the Original Publication:
Journaltitle:
Electronic Communications in Probability
Department/institution:
Mathematik und Informatik
Institut für Mathematik
