B8.2 Continuous Martingales and Stochastic Calculus (2025-26)
Main content blocks
- Lecturer: Profile: Zhongmin Qian
Brownian motion - definition, construction and basic properties, regularity of paths.
Filtrations and stopping times, first hitting times.
Brownian motion - martingale and strong Markov properties, reflection principle.
Martingales - definitions, regularisation and convergence theorems, optional sampling theorem, maximal and Doob's \(L^p\) inequalities.
Quadratic variation, local martingales, semimartingales.
Discussion of the Stieltjes integral.
Stochastic integration and Itô's formula with applications.
Section outline
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Covers the material on stopping times, optional stopping theorem, and martingale spaces, quadratic variation processes.
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3 March -- Added the detail of the proof of Lemma 5.4, the key computation in the definition of Ito integrals for martingales.
1 March -- Made several corrections and added more comments.
18 Feb 2026 : Additional comments in Section 4 Brownian motion are added mainly through footnotes for helping your understanding the material better. This should be the final version of the lecture notes used this year.
17 Feb 2026: Made a few modifications and additions in Section 4.1.
1) I have reorganized the material about Brownian motion. O shall follow the order in this version for lectures on Brownian motion (in weeks 5 and 6).
2) A few additions in appendix.
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Registration start: Friday, 16 January 2026, 12:00 PMRegistration end: Friday, 13 February 2026, 12:00 PM
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Class Tutor's Comments Assignment
Class tutors will use this activity to provide overall feedback to students at the end of the course.
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