5th or 7th Semester
Stochastic Analysis
At A Glance
Course Code
ΧΡΣΤΛ01-1
Course Type
Scientific expertise, Skills Development
Teaching Language
Greek
Is the course offered to Erasmus Students?
Yes (Exams and Bibliography in English)
Teaching Delivery
In-class lecturing
Use of Information and Communications Technology
- Distance learning by using the asynchronous platform e-class.
- Distance learning by using the synchronous platform MS Teams.
- Projectors
- Communication via email
Independent Teaching Activities
Type
Lectures
Weekly Teaching Hours
4
ECTS Credits
7,5
Course Outlines
🇬🇷 Greek
🇬🇧 English
Student Performance Evaluation
Written Examination (100%)
Methods of evaluation: problem solving
Learning Outcomes
Students are given the opportunity to deepen their knowledge into well-known concepts from Probability Theory and Stochastic Processes, and to understand new ones such as e.g. those of the conditional expectations with respect to a σ-algebra, the martingales and the Brown motion, which are useful for Stochastic Analysis. The aim of the course is the understanding of the basic concepts of Stochastic Analysis, in such a way that students will be able to apply them in modern Financial Mathematics and especially in the pricing of derivative products.
Upon successful completion of the course, students will be able to:
- prove that a given family of sets is a σ-algebra;
- prove that a given set-function is a measure;
- solve integrals on probability spaces;
- prove that a given sequence of random variables is a martingale;
- prove that a stochastic process is a Brownian motion;
- solve stochastic integrals by using Itô’s formula.
General Competences
- Analytical thinking.
- Production of new scientific ideas.
- Working independently.
Syllabus
- Probability Spaces
- Integration on Probability Spaces
- Conditional expectations
- Martingales
- Brownian motion
- Ito calculus
Bibliography
- Μαχαιράς, Ν. Δ. (2016) Σημειώσεις Στοχαστικής Ανάλυσης. Πανεπιστημιακές Σημειώσεις.
- Χελιώτης, Δ. (2015) Εισαγωγή στο Στοχαστικό Λογισμό. Πανεπιστημιακές Σημειώσεις.
- Karatzas, I. & Shreve, S. (1998) Brownian Motion and Stochastic Calculus. Springer-Verlag New York.
- Klebaner, F. C. (2005) Introduction to Stochastic Calculus With Applications (2nd ed.). Imperial College Press.
- Mikosh, Thomas (1998) Elementary stochastic calculus with finance in view. World Scientific
- Lamberton, D. and Lapeyre, B. (1994) Introduction to Stochastic calculus applied to Finance. Chapman and Hall, London.
- von Weizsäcker, H. (1990) Stochastic Integrals. Vieweg+Teubner Verlag.
Undergraduate Courses
1st Semester
2nd Semester
3rd Semester
4th Semester
7th Semester
Winter Elective
Spring Elective