MATS352 Stochastic Analysis (5 cr)
Study level:
Advanced studies
Grading scale:
0-5
Language:
English
Responsible organisation:
Department of Mathematics and Statistics
Curriculum periods:
2017-2018, 2018-2019, 2019-2020
Description
Content
The course introduces basics of stochastic analysis. One cornerstone is the Brownian motion, probably one of the most important stochastic processes. The course will cover:
* definition of the Brownian motion, its construction, and basic properties
* Stochastic integrals as an extension of Riemann-integrals
* Itô's formula as an extension of the Taylor formula from calculus
Completion methods
Course exam and exercises. Part of the exercises may be obligatory.
Final exam is an other option.
Assessment details
The grade is based on
a) the number of points in the course exam and possibly additional points from exercises
OR
b) the number of points in the final exam.
At least half of the points are needed to pass the course.
Learning outcomes
The students understand basic properties of the Brownian motion and can verify some of them. They are familiar with the construction of stochastic integrals. The students are able to compute particular stochastic integrals and to apply Itô's formula in various situations.
Description of prerequisites
Course MATS262 Probability 2 or similar.
Recommended: MATS254 Stochastic processes or similar.
Recommended: MATS254 Stochastic processes or similar.
Study materials
Lecture notes: S. Geiss. Stochastic differential equations (chapters 1-3)
Literature
- Karatzas, Ioannis, Shreve, Steven: Brownian Motion and Stochastic Calculus, 1998, Springer; ISBN: 978-1-4612-0949-2
Completion methods
Method 1
Select all marked parts
Method 2
Select all marked parts
Parts of the completion methods
x
Teaching (5 cr)
Type:
Participation in teaching
Grading scale:
0-5
Language:
English
Teaching
1/8–3/4/2020 Lectures
8/28–8/28/2020 Exam
10/27–12/18/2020 Lectures
12/16–12/16/2020 Exam
1/13–1/13/2021 Exam
8/31–10/24/2021 Lectures
10/27–10/27/2021 Course exam
11/17–11/17/2021 Exam
8/30–10/23/2022 Lectures
10/26–10/26/2022 Exam
9/5–10/29/2023 Lectures
11/1–11/1/2023 Course Exam
11/22–11/22/2023 Course Exam
x
Exam (5 cr)
Type:
Exam
Grading scale:
0-5
Language:
English