Cornell Math - MATH 778 Spring 2007
MATH 778: Stochastic Processes (Spring 2007)
Instructor: Soumik Pal
The course objective is to cover a wide variety of topics in continuous stochastic processes which depend on stochastic calculus and have gained importance in probability or other areas in mathematics. First we will create our toolbox: review of Ito calculus, martingales, and introduce local times and some widely applicable results . Then we will use them to analyse the following.
- Interplay between probability and differential equations, particularly the heat and Feynman-Kac equations.
- Markov processes.
- Some path properties of Brownian motion including occupation time measures.
- Other fundamental processes: Brownian bridge, Ornstein-Uhlenbeck and the Bessel processes.
On our way we will encounter some of the fascinating, deep theorems of modern probability.