Stochastic processes selected papers of Hiroshi Tanaka /
| Основен автор: | Tanaka, Hiroshi. |
|---|---|
| Автор-организации: | ebrary, Inc. |
| Други автори: | Maejima, Makoto., Shiga, Tokuzo. |
| Формат: | Електронен |
| Език: | English |
| Публикувано: |
River Edge, N.J. :
World Scientific,
c2002.
|
| Предмети: | |
| Онлайн достъп: |
An electronic book accessible through the World Wide Web; click to view |
Съдържание:
- Machine generated contents note: Stochastic Differential Equations with Reflecting Boundary Condition in Convex Regions
- Some Probabilistic Problems in the Spatially Homogeneous Boltzmann Equation
- Limit Theorems for Certain Diffusion Processes with Interaction
- Central Limit Theorem for a System of Markovian Particles with Mean Field Interactions (with T. Shiga)
- Propagation of Chaos for Diffusing Particles of Two Types with Singular Mean Field Interaction (with M. Nagasawa)
- Stochastic Differential Equations for Mutually Reflecting Brownian Balls (with Y. Saisho)
- Limit Distribution for 1-Dimensional Diffusion in a Reflected Brownian Medium
- Limit Distributions for One-Dimensional Diffusion Processes in Self-Similar Random Environments
- Stochastic Differential Equation Corresponding to the Spatially Homogeneous Boltzmann Equation of Maxwellian and Non-Cutoff Type
- Limit Theorem for One-Dimensional Diffusion Process in Brownian Environment
- On the Maximum of a Diffusion Process in a Drifted Brownian Environment (with K. Kawazu)
- Recurrence of a Diffusion Process in a Multidimensional Brownian Environment
- Localization of a Diffusion Process in a One-Dimensional Brownian Environment
- Diffusion Processes in Random Environments
- Environment-Wise Central Limit Theorem for a Diffusion in a Brownian Environment with Large Drift
- A Diffusion Process in a Brownian Environment with Drift (with K. Kawazu)
- Limit Theorems for a Brownian Motion with Drift in a White Noise Environment
- Invariance Principle for a Brownian Motion with Large Drift in a
- White Noise Environment (with K. Kawazu)
- Some Theorems Concerning Extrema of Brownian Motion with d-Dimensional Time.