Course syllabus
The course Options and Mathematics treats arbitrage free valuation of stock options, and other financial derivatives, using both theoretical and numerical tools. It is intended as a first course in financial mathematics, and requires no prior knowledge of finance.
It is recommended that students who haven't done much math recently freshen up their math skills before the course starts.
More information regarding the purpose and learning goals of the course can be found in the study plan https://www.student.chalmers.se/sp/course?course_id=37296
Responsible for Course:
Carl Lindberg, carl.lindberg@chalmers.se
Important: I answer mail with up to four days delay.
Student representatives
TKIEK hanna.u.gustafsson@gmail.com Hanna Gustafsson
TKIEK pontuslundborg@hotmail.com Pontus Lundborg
FK luddenordberg@gmail.com Ludvig Nordberg
TKIEK bo.ped.lin@gmail.com Bo Pedersén Lindberg
TKIEK tonder.no8@gmail.com Erik Tönder
Literature
Borell, C. Lindberg, C.: Introduction to the Black-Scholes theory
Lindberg, C.: StochasticCalculus_20241002.pdf
Program
The schedule for the course is in TimeEdit.
Lectures, tentative
Week | Chapter & Exercises | Content |
---|---|---|
1 |
Chapter 1: 1-9 |
Financial derivatives of European and American type, forward contracts, the Dominance Principle, Put-Call Parity, Convexity. |
2 |
Chapter 2.1: 1-3, 5 Chapter 2.2: 1-5,7
|
The Binomial Model, the multi-period binomial model, arbitrage portfolio, replicating and self-financing strategies. |
3 |
Chapter 3.1: 1-17 Chapter 3.2: 1-3 Chapter 3.4: 1-3 |
Basic Probability: Event, random variable, Markov's inequality, characteristic function, Gaussian stochastic process, independence, random walk, Law of Large Numbers, Monte Carlo simulation, Central Limit Theorem |
4 |
Chapter 4.1: 1-2 Chapter 4.2: 1 |
Brownian Motion, Geometric Brownian Motion, Stochastic Calculus |
5 |
All theorems and results in the slides |
Stochastic Calculus
|
6 | Chapter 5: All exercises. Also, the examples are good! |
The Black-Scholes Theory, price of calls and puts, the greeks, path dependent options, implied volatility |
7 |
Chapter 4.3: 1-5 Chapter 4.5: 1-2 |
Heat conduction, partial differential equation, possibly some measure theory |
8 | I help you prepare for the exam |
EXAMINATION:
Written final examination (4 hours)
Aid not permitted.
The test comprises 15 points (plus the credit from the assignments which is valid for a year) and to pass at least 6 points are required (at GU a result greater than or equal to 11 points is graded VG; at Chalmers a result greater than or equal to 9 points and smaller than 12 points is graded 4 and a result greater than or equal to 12 points is graded 5).
At least 6 points are of theoretic nature and at least 3 of these are chosen from the following list:
Theorem 1.1.2; Theorem 1.1.3; Theorem 1.1.4; Theorem 2.1.1; Theorem 2.2.1; Theorem 3.3.1; Theorem 4.1.1; Theorem 4.2.1; Theorem 4.3.1; Theorem 4.3.2; Theorem 5.1.1; Theorem 5.2.1; Theorem 5.3.1.
The dates and times for the exams can be found in the student portal (Links to an external site.).