2024 Faculty Courses School of Science Undergraduate major in Physics

Quantum Mechanics II（Exercise) A

Academic unit or major: Undergraduate major in Physics
Instructor(s): Kazuya Fujimoto / Kazuki Yamamoto / Yusuke Nishida
Class Format: Exercise (Face-to-face)
Media-enhanced courses: -
Day of week/Period (Classrooms): 5-6 Tue / 5-6 Fri
Class: A
Course Code: PHY.Q218
Number of credits: 010
Course offered: 2024
Offered quarter: 4Q
Syllabus updated: Mar 17, 2025
Language: Japanese

Syllabus

Course overview and goals

This course is complementary to the lecture course (PHY.Q208). After passing this course, the students will be able to account for the basic concepts of quantum mechanics such as atomic model and angular momenta, and further be able to solve problems such as two- and three-dimensional harmonic oscillators, hydrogen atom, coupling of angular momenta, and approximate solutions of Schroedinger equation.

Course description and aims

The students will be able to solve Schroedinger equation for two- and three-diemensional harmonic oscillators and hydrogen atom, to perform angular momentum coupling, and to obtain approximate solutions by using perturbational and variational methods.

Keywords

Angular momenta, confluent hypergeometric functions, spherical harmonics, perturbation theory, and variational methods.

Competencies

Specialist skills
Intercultural skills
Communication skills
Critical thinking skills
Practical and/or problem-solving skills

Class flow

A set of exercise problems will be given in every class session. The students are expected to solve all the problems by the next session. In class session, for each problem, a student will present how to solve it and field questions from the other students. The teacher will provide complementary explanation to the presentation.

Course schedule/Objectives

	Course schedule	Objectives
Class 1	Introduction	To review mathematical formulae.
Class 2	Harmonic oscillators	To understand Hermite polynomials and further to solve Schrodinger equation for harmonic oscillators.
Class 3	Angular momenta	To understand angular momenta, Legendre polynomials and related functions.
Class 4	Spherical harmonics	To understand spherical harmonics and the algebraic structure of angular momentum operators.
Class 5	Confluent hypergeometric functions	To understand Laguerre polynomials and associated Laguerre polynomials.
Class 6	Hydrogen atom	To solve Schroedinger equation for electron in hydrogen atom.
Class 7	Isotropic harmonic oscillators	To solver Schroedinger equation for isotropi two- and three-dimensional harmonic oscillators.
Class 8	Dirac notation	To understand how to use Dirac's bra-ket notation.
Class 9	Charged particle in magnetic field	To understand the characteristic behavior of electrons in magnetic filed, such as Landau levels, Zeeman splitting, and Aharonov-Bohm effect.
Class 10	Spin angular momenta	To understand spin angular momenta.
Class 11	Angular momentum coupling	To understand angular momentum coupling, and further to solve problems with spin-spin interaction and spin-orbit interaction.
Class 12	Perturbation theory, part 1	To solve problems by using perturbation theory for non-degenerated systems.
Class 13	Perturbation theory, part 2	To solve problems by using perturbation theory for degenerated systems.
Class 14	Selection rule in optical transition	To solve problems by using perturbation theory for time-dependent systems and to understand selection rule for electric dipole transition.

Study advice (preparation and review)

To enhance learning, students are encouraged to spend approximately 100 minutes preparing for class and another 100 minutes reviewing class content afterwards for each class.

Textbook(s)

Same as those used in the lecture course (PHY.Q208).

Reference books, course materials, etc.

L.I. Schiff, "Quantum Mechanics" (McGraw-Hill College)

Evaluation methods and criteria

Evaluated based on presentations and reports.

Related courses

PHY.Q208 ： Quantum Mechanics II(Lecture)
ZUB.Q206 ： Quantum Mechanics II

Prerequisites

Nothing.