# Stochastic Processes 3

### Course content

• Signed measures, absolute continuity and singularity of measures, the Radon-Nikodym Theorem.
• Conditional expectations given a sigma-algebra.
• Martingales and submartingales in discrete time, the martingale convergence theorem, stopping times and optional sampling.
• Central Limit Theorem for martingales.
• Brownian motion: definition, continuity, variation and quadratic variation, non-differentiability, the law of the iterated logarithm.
Education

BSc Programme in Actuarial Mathematics

Learning outcome

Knowledge:

Basic knowledge of the topics covered by the course:  Decompositions of signed measures, conditional expectations, martingale theory, CLT for martingales, and definition, existence and path properties of the Brownian motion.

Skill:

• describe and prove the results on decomposition of signed measures.
• use the calculation rules for conditional expectations.
• show whether a sequence of random variables is a martingale or a submartingale.
• derive and describe the main results on martingales.
• apply the results on martingales to concrete examples.
• understand the foundation for the construction of stochastic processes in continuous time.
• describe the basic properties of the sample paths for Brownian motion.

Competence:

• discuss the relation between decomposition of measures and conditional expectations.
• relate and compare the results on martingales.
• use martingale CLT and understand the result compared to the classical CLT.
• describe the concept of sample paths with a view to constructing continuous stochastic processes.
• Give an oral presentation of a specific topic within the theory covered by the course.

5 hours of lectures and 4 hours of exercises per week for 7 weeks.

Stochastic Processes (Stok 2) or equivalent

The course is equivalent to Advanced Probability Theory 2 (VidSand2) (NMAK11011U)

Written
Oral
Continuous feedback during the course of the semester
Feedback by final exam (In addition to the grade)

Written feedback in the form of comments to the compulsory
assignements.

Oral feedback during exercise classes, as a response to the
contribution of the students to the solution process of the
exercises.

Detailed oral feedback after the oral exam.

ECTS
7,5 ECTS
Type of assessment
Oral examination, 30 minuts
Type of assessment details
30 minuts preparation. All aids allowed under preparation.
Exam registration requirements

To participate in the exam the compulsory assignment must be approved and valid.

Aid
All aids allowed
Marking scale
7-point grading scale
Censorship form
No external censorship
Several internal examiners.
Re-exam

As the ordinary exam. If the compulsory assignment was not approved before the ordinary exam it must be resubmitted and approved.  The reubmission must be handed in three weeks before the beginning of the re-exam week.

##### Criteria for exam assessment

The student should convincingly and accurately demonstrate the knowledge, skills and competences described under Intended learning outcome.

Single subject courses (day)

• Category
• Hours
• Lectures
• 35
• Preparation
• 132
• Theory exercises
• 28
• Project work
• 10
• Exam
• 1
• English
• 206

### Kursusinformation

Language
English
Course number
NMAB15026U
ECTS
7,5 ECTS
Programme level
Bachelor
Duration

1 block

Placement
Block 2
Schedulegroup
C
Capacity
No limit
The number of seats may be reduced in the late registration period
Studyboard
Study Board of Mathematics and Computer Science
##### Contracting department
• Department of Mathematical Sciences
##### Contracting faculty
• Faculty of Science
##### Course Coordinator
• Ernst Hansen   (8-6e7b716a777c6e7749766a7d7137747e376d74)
Saved on the 28-02-2023

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Courseinformation of students