Markov Chains — различия между версиями
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==Midterm == | ==Midterm == | ||
− | Midterm will take place on Saturday, 21.01.2023. | + | Midterm will take place on Saturday, 21.01.2023. Please split into 2 groups: first group starts exam at 09:00, second group starts at 11:00. You can book am exam slot below. Exam question will contain 1 theoretical question and 1 problem. Using any materials, electronic devices is allowed during preparation, but not during the answer. The proofs that were not given in the lectures/seminars can be omitted. |
+ | |||
+ | *[https://www.dropbox.com/s/h1u3ftm9wxym7d7/Mat_osnovy_exam_topics.pdf?dl=0 List of exam questions.] | ||
+ | *[https://docs.google.com/spreadsheets/d/1eCw0hl7wpi1L1o3OCvOcRWgp8pnSinX_f5-t86_M2yU/edit?usp=sharing link to exam slots] | ||
[https://disk.yandex.ru/i/5Bb0GVXctY-gAw List of midterm qustions] | [https://disk.yandex.ru/i/5Bb0GVXctY-gAw List of midterm qustions] |
Версия 15:58, 16 января 2023
Содержание
Lecturers and Seminarists
Lecturer | Naumov Alexey | [anaumov@hse.ru] | T924 |
Seminarist | Samsonov Sergey | [svsamsonov@hse.ru] | T926 |
About the course
This page contains materials for Markov Chains course in 2022/2023 year, mandatory one for 1st year Master students of the MML program (HSE and Skoltech).
Grading
The final grade consists of 3 components (each is non-negative real number from 0 to 10, without any intermediate rounding) :
- OHW for the hometasks
- OMid-term for the midterm exam
- OExam for the final exam
The formula for the final grade is
- OFinal = 0.3*OHW + 0.3*OMid-term + 0.4*OExam + 0.1*OBonus
with the usual (arithmetical) rounding rule.
Lectures and Seminars
Homeworks
Exam
Midterm
Midterm will take place on Saturday, 21.01.2023. Please split into 2 groups: first group starts exam at 09:00, second group starts at 11:00. You can book am exam slot below. Exam question will contain 1 theoretical question and 1 problem. Using any materials, electronic devices is allowed during preparation, but not during the answer. The proofs that were not given in the lectures/seminars can be omitted.
Recommended literature (1st term)
- http://www.statslab.cam.ac.uk/~james/Markov/ - Cambridge lecture notes on discrete-time Markov Chains
- https://link.springer.com/book/10.1007%2F978-3-319-97704-1 - book by E. Moulines et al, you are mostly interested in chapters 1,2,7 and 9 (book is accessible for download through HSE network)
- https://link.springer.com/book/10.1007%2F978-3-319-62226-2 - Stochastic Calculus by P. Baldi, good overview of conditional probabilities and expectations (part 4, also accessible through HSE network)
- https://elearning.unimib.it/pluginfile.php/583708/mod_resource/content/1/1-conditional-law.pdf - Probability kernels and (regular) conditional probabilities, to the first lecture.