COURSE INSTRUCTOR

Telecommunications B: Data Communications Networking, EE 2T21
Syllabus
Introduction to telecommunication networks, includes local area networks, the Internet, and telephone networks.
Delft University of Technology
Quarter 4, 2020

Quantum Mechanics, PHYS 5115
Observations of macroscopic and microscopic bodies; uncertainty principle and waveparticle duality; probability amplitudes; SchrÃ¶dinger wave theory and onedimensional problems, SchrÃ¶dinger equation in three dimensions; and angular momentum and the hydrogen atom.
cotaught with Dmitri Krioukov
Northeastern University
Fall 2019, Spring 2020

Thermodynamics and Statistical Mechanics, PHYS 2305
First and second laws of thermodynamics, entropy and equilibrium, thermodynamic potentials, elementary kinetic theory, statistical mechanics, and the statistical interpretation of entropy.
cotaught with Dmitri Krioukov
Northeastern University
Spring 2017, Spring 2018, Spring 2019

Calculus II for Science and Engineering, MATH 1342
Syllabus
Further Techniques and Applications of Integration, Infinite Series, and Introduction to Vectors. Integration by Parts, Numerical Integration, Improper Integrals, Separable Differential Equations and Areas, Volumes, and Work as Integrals.
Northeastern University
Fall 2014
TEACHING ASSISTANT

Elementary Physics, CAS PY 105
Principles of classical and modern physics. Mechanics, conservation laws, heat.
Boston University
Fall 2003, Fall 2004, Summer 2006

Elementary Physics, CAS PY 106
Principles of classical and modern physics. Electricity and magnetism, waves,
light and optics, atomic and nuclear physics.
Boston University
Spring 2004, Spring 2005, Summer 2005

Elementary Modern Physics, CAS PY 313
Waves and physical optics, relativistic mechanics, experimental foundations of quantum mechanics, atomic structure,
physics of molecules and solids, atomic nuclei and elementary particles.
Boston University
Spring 2004, Spring 2005, Summer 2005

Methods of Theoretical Physics, CAS PY 355
First and second order ordinary differential equations. Partial differential equations and series solutions of differential equations.
Vectors and vector calculus. Matrices, matrix algebra, and matrix transformations.
Rotations, similarity, unitarity, hermiticity, eigenvalues, and eigenvectors.
Boston University
Spring 2005

