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140.724.01
Probability Theory IV

Location
East Baltimore
Term
4th Term
Department
Biostatistics
Credit(s)
3
Academic Year
2023 - 2024
Instruction Method
In-person
Class Time(s)
M, W, 1:30 - 2:50pm
Auditors Allowed
Yes, with instructor consent
Available to Undergraduate
No
Grading Restriction
Letter Grade or Pass/Fail
Course Instructor(s)
Contact Name
Frequency Schedule
Every Year
Prerequisite

Calculus, real analysis; 140.721-3

Description
Covers basic stochastic processes including martingales and Markov chains, followed by consideration of Markov Chain Monte Carlo (MCMC) methods.
Learning Objectives
Upon successfully completing this course, students will be able to:
  1. Examine and apply foundational concepts of probability theory
  2. Assess the convergence of a sequence or series of random variables using martingale theory
  3. Classify the states and derive the transition probabilities of a Markov chain
  4. Derive the stationary distribution of certain Markov chains
  5. Identify the principles of MCMC algorithms like Gibbs sampler and Metropolis-Hastings
Methods of Assessment
This course is evaluated as follows:
  • 30% Homework
  • 30% In-class midterm exam
  • 40% In-class final exam
Special Comments

Please note: This is the in-person section of a course that is also offered virtually/online. Students will need to commit to the modality for which they register. The course may include one or two lab sessions scheduled for the corresponding lecture periods.