Random evolutions are driven by the hyperparabolic operators
DOI10.1007/S10955-011-0131-0zbMath1276.82018OpenAlexW2049457585MaRDI QIDQ633119
Alexander D. Kolesnik, Mark A. Pinsky
Publication date: 31 March 2011
Published in: Journal of Statistical Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10955-011-0131-0
Brownian motionfundamental solutiongeneralized functiontelegraph equationrandom evolutiontelegraph processtransport processrandom flighthyperparabolic operatorKac's conditionpersistent random walk
Brownian motion (60J65) Random walks, random surfaces, lattice animals, etc. in equilibrium statistical mechanics (82B41) Transport processes in time-dependent statistical mechanics (82C70) Stochastic partial differential equations (aspects of stochastic analysis) (60H15)
Related Items (11)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Exact probability distributions for noncorrelated random walk models
- Random motions at finite speed in higher dimensions
- A stochastic model related to the telegrapher's equation
- A note on random walks at constant speed
- Isotropic Transport Process on a Riemannian Manifold
- Asymptotic analysis of transport processes
- A four-dimensional random motion at finite speed
- A planar random motion with an infinite number of directions controlled by the damped wave equation
- ON DIFFUSION BY DISCONTINUOUS MOVEMENTS, AND ON THE TELEGRAPH EQUATION
This page was built for publication: Random evolutions are driven by the hyperparabolic operators
