# Sebastian Huber: Catalogue data in Spring Semester 2021

Name | Prof. Dr. Sebastian Huber |

Address | Institut für Theoretische Physik ETH Zürich, HIT K 11.2 Wolfgang-Pauli-Str. 27 8093 Zürich SWITZERLAND |

Telephone | +41 44 633 25 65 |

sebastian.huber@itp.phys.ethz.ch | |

URL | http://cmt-qo.phys.ethz.ch |

Department | Physics |

Relationship | Adjunct Professor |

Number | Title | ECTS | Hours | Lecturers | |
---|---|---|---|---|---|

402-0101-00L | The Zurich Physics Colloquium | 0 credits | 1K | S. Huber, A. Refregier, University lecturers | |

Abstract | Research colloquium | ||||

Objective | The goal of this event is to bring you closer to current day research in all fields of physics. In each semester we have a set of distinguished speakers covering the full range of topics in physics. As a participating student should learn how to follow a research talk. In particular, you should be able to extract key points from a colloquium where you don't necessarily understand every detail that is presented. | ||||

402-0889-00L | Topological Condensed Matter PhysicsSpecial Students UZH must book the module PHY576 directly at UZH. | 6 credits | 2V + 2U | S. Huber, T. Neupert | |

Abstract | This course provides the student with a solid understanding of quantum phases with non-trivial topological properties. At the end of the course the student will be acquainted with the theoretical description of the integer and fractional quantum Hall phases, symmetry protected topological states like the topological insulators and quantum spin systems. | ||||

Objective | The goal of this course is to provide the student with a solid understanding of quantum phases with non-trivial topological properties. The course is aimed at the graduate level and requires basic knowledge of quantum mechanics and solid state physics. The necessary tools and concepts are introduced on the example of the integer quantum Hall effect. At the end of the course the student will be acquainted with the theoretical description of the integer and fractional quantum Hall phases, symmetry protected topological states like the topological insulators and quantum spin systems. |