The invariant measure of a walking droplet in hydrodynamic pilot-wave theory
Document Type
Article
Publication Date
9-2-2024
Abstract
We study the long time statistics of a walker in a hydrodynamic pilot-wave system, which is a stochastic Langevin dynamics with an external potential and memory kernel. While prior experiments and numerical simulations have indicated that the system may reach a statistically steady state, its long-time behavior has not been studied rigorously. For a broad class of external potentials and pilot-wave forces, we construct the solutions as a dynamics evolving on suitable path spaces. Then, under the assumption that the pilot-wave force is dominated by the potential, we demonstrate that the walker possesses a unique statistical steady state. We conclude by presenting an example of such an invariant measure, as obtained from a numerical simulation of a walker in a harmonic potential.
Identifier
85199135683 (Scopus)
Publication Title
Nonlinearity
External Full Text Location
https://doi.org/10.1088/1361-6544/ad5f6f
e-ISSN
13616544
ISSN
09517715
Issue
9
Volume
37
Grant
DMS-2108839
Fund Ref
National Science Foundation
Recommended Citation
Nguyen, Hung D. and Oza, Anand U., "The invariant measure of a walking droplet in hydrodynamic pilot-wave theory" (2024). Faculty Publications. 197.
https://digitalcommons.njit.edu/fac_pubs/197
