Probability and Stochastic Analysis

Period of duration of course
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Course info
Number of course hours
40
Number of hours of lecturers of reference
40
CFU 6
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Modalità esame

oral exam

Prerequisiti

Prerequisites

A good knowledge of the basic topics in mathematical analysis, linear algebra, and measure theory is required. Preliminary notions of probability theory are also useful, including random variables, distributions, probabilistic convergence, and conditional expectation.

Familiarity with function spaces and with some elements of ordinary or partial differential equations may help in understanding certain parts of the course, but is not strictly required.


Per gli anni di corso, vedere requisiti SNS

Programma

The course introduces the fundamental tools of modern probability theory and stochastic analysis, with particular emphasis on the rigorous construction of random processes and their analytical applications.

The first, introductory part reviews elements of measure theory, integration, random variables, probabilistic convergence, and conditioning. Products of probability spaces, Kolmogorov’s extension theorem, and Kolmogorov’s continuity criterion are then presented.

The second part is devoted to Brownian motion and Gaussian structures: Gaussian measures in finite and infinite dimensions, Cameron-Martin space, white noise, Wiener measure, quadratic variation, and the Wiener integral. Filtrations, stopping times, the Markov and strong Markov properties, the reflection principle, and some applications of Brownian motion to parabolic problems with boundary conditions are then introduced.

The final part presents the Itô integral, Itô’s formula, and finite-dimensional stochastic differential equations, including the existence and uniqueness theorem under standard regularity assumptions on the coefficients.

The objective is to provide a solid mathematical foundation for the study of continuous stochastic processes, stochastic equations, and the connections between probability, functional analysis, and the theory of partial differential equations.

Obiettivi formativi

The course aims to provide students with a solid and rigorous understanding of the fundamental tools of modern probability theory and stochastic analysis. By the end of the course, students will be familiar with the mathematical construction of continuous-time random processes, with particular emphasis on Brownian motion, Gaussian measures, and stochastic integration.

Students will also be able to understand and use concepts such as filtrations, stopping times, Markov properties, quadratic variation, the Wiener integral, the Itô integral, and Itô’s formula. A further objective is to introduce finite-dimensional stochastic differential equations and to provide the tools needed to understand the main existence and uniqueness results under standard assumptions.

Finally, the course aims to develop students’ ability to connect probabilistic methods, functional analysis, and the theory of partial differential equations, preparing them for advanced study of stochastic processes and their analytical applications.

Riferimenti bibliografici

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