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Department:
MATH
Course Number:
7245
Hours - Lecture:
3
Hours - Lab:
0
Hours - Recitation:
0
Hours - Total Credit:
3
Typical Scheduling:
Every spring semester
An introduction to the Ito stochastic calculus and stochastic differential equations through a development of continuous-time martingales and Markov processes. (2nd of two courses in sequence)
Prerequisites:
MATH 7244 or equivalent
Course Text:
At the level of Karatzas and Shreve, Brownian Motion and Stochastic Calculus
Topic Outline:
- Additional examples and applications for Ito stochastic integrals and Ito's rule for change-of-variables
- Representation theorems for continuous martingales in terms of Brownian motion
- Girsanov transformations, theory and applications
- Local time, including definitions and elementary properties, and connections to reflected Brownian motion, generalized Ito rules, and extensions
- Stochastic differential equations -- strong solutions, including definitions and basic existence, uniqueness, comparison, and approximation results
- Stochastic differential equations -- weak solutions, including definitions, basic existence and uniqueness, and connections to the martingale problem of Stroock and Varadhan