Teaching at the University of Vienna will take place in the form of remote learning until the end of the semester. Exams basically take place digitally as well. Further information about remote learning

From the end of May onwards, individual exams that cannot be held online will be taking place within the framework of limited exam operation on site at exam centres. You consent to the changed mode of assessment when registering for the exam/course. All information about the exams at the exam centres

# Master Physics (876)

260072 VO History of Physics - The developement of physics at the University Vienna included
260124 SE Supplementary Seminar STEP - for sophomores of problem-solving courses accompanying introductory physics I
260096 VO Structure and properties of condensed matter: scattering and microscopy - an alternative to Solid state physics I and Materials physics I
260099 UE Structure and properties of condensed matter: scattering and microscopy - Exercises - an alternative to Solid state physics I and Materials physics I
260030 VO Finite element and boundary element method for physical problems - Python tools and introduction to method for the solution of differential equations. Overview of numerical methods for the solution of physical problems (finite difference method, finite element and boundary element methods, solution of partial differential equations)
260031 UE Finite element and boundary element method for physical problems - Exercises - Introduction to python and numerical tools such as numpy and scipy for the solution of numerical problems. Special python software tools will be discussed in order to solve finite element and boundary element problems (Fenics, BEM++)
260115 VO [en] Complex Systems I - Foundations, Concepts and Phenomena
260116 UE [en] Exercises to Complex Systems I - Foundations, Concepts and Phenomena
260030 VO Finite element and boundary element method for physical problems - Python tools and introduction to method for the solution of differential equations. Overview of numerical methods for the solution of physical problems (finite difference method, finite element and boundary element methods, solution of partial differential equations)
260031 UE Finite element and boundary element method for physical problems - Exercises - Introduction to python and numerical tools such as numpy and scipy for the solution of numerical problems. Special python software tools will be discussed in order to solve finite element and boundary element problems (Fenics, BEM++)
260115 VO [en] Complex Systems I - Foundations, Concepts and Phenomena
260116 UE [en] Exercises to Complex Systems I - Foundations, Concepts and Phenomena
260092 VO [en] Materials Physics I
260096 VO Structure and properties of condensed matter: scattering and microscopy - an alternative to Solid state physics I and Materials physics I
260099 UE Structure and properties of condensed matter: scattering and microscopy - Exercises - an alternative to Solid state physics I and Materials physics I
260054 SE [de en] Seminar - low dimensional solids - synthesis, characterization and device applications
260030 VO Finite element and boundary element method for physical problems - Python tools and introduction to method for the solution of differential equations. Overview of numerical methods for the solution of physical problems (finite difference method, finite element and boundary element methods, solution of partial differential equations)
260031 UE Finite element and boundary element method for physical problems - Exercises - Introduction to python and numerical tools such as numpy and scipy for the solution of numerical problems. Special python software tools will be discussed in order to solve finite element and boundary element problems (Fenics, BEM++)
260054 SE [de en] Seminar - low dimensional solids - synthesis, characterization and device applications
260092 VO [en] Materials Physics I
260096 VO Structure and properties of condensed matter: scattering and microscopy - an alternative to Solid state physics I and Materials physics I
260099 UE Structure and properties of condensed matter: scattering and microscopy - Exercises - an alternative to Solid state physics I and Materials physics I
260030 VO Finite element and boundary element method for physical problems - Python tools and introduction to method for the solution of differential equations. Overview of numerical methods for the solution of physical problems (finite difference method, finite element and boundary element methods, solution of partial differential equations)
260031 UE Finite element and boundary element method for physical problems - Exercises - Introduction to python and numerical tools such as numpy and scipy for the solution of numerical problems. Special python software tools will be discussed in order to solve finite element and boundary element problems (Fenics, BEM++)
260054 SE [de en] Seminar - low dimensional solids - synthesis, characterization and device applications
260024 VO [en] Quantum Optics II
260358 SE [en] Quantum Optomechanics
442609 SE [en] Quantum Foundations - (Journal Club)
442610 SE [en] Seminar Quantum Entanglement - Foundations and Applications
442617 SE [en] Quantum Nanophysics - (Journal Club)
442618 VO [en] (VDS-PH) Quantum Information Theory I
260129 VO [en] Astroparticle Physics
260014 VO Organisms and their environment - Environmental Biophysics
442607 SE [en] Seminar in low dimensional quantum solids - Seminar on new results on the properties of low dimensional quantum solids such as fullerenes, nanotubes and graphene, high temperature superconductors and optoelectronic materials as well as implications on their application potential
442609 SE [en] Quantum Foundations - (Journal Club)
442610 SE [en] Seminar Quantum Entanglement - Foundations and Applications
442615 SE [en] Quantum Optics Seminar - The Seminar consists of a series of talks, given by mainly international guests.
442617 SE [en] Quantum Nanophysics - (Journal Club)
260108 PR Laboratory Electronics - Electronics for Physicists
260035 PR [en] Laboratory Acoustics
260035 PR [en] Laboratory Acoustics
260079 PR Laboratory course - low dimensional solids - synthesis, characterization and device applications
260030 VO Finite element and boundary element method for physical problems - Python tools and introduction to method for the solution of differential equations. Overview of numerical methods for the solution of physical problems (finite difference method, finite element and boundary element methods, solution of partial differential equations)
260031 UE Finite element and boundary element method for physical problems - Exercises - Introduction to python and numerical tools such as numpy and scipy for the solution of numerical problems. Special python software tools will be discussed in order to solve finite element and boundary element problems (Fenics, BEM++)
260054 SE [de en] Seminar - low dimensional solids - synthesis, characterization and device applications
442607 SE [en] Seminar in low dimensional quantum solids - Seminar on new results on the properties of low dimensional quantum solids such as fullerenes, nanotubes and graphene, high temperature superconductors and optoelectronic materials as well as implications on their application potential
442621 VO [en] (VDS-PH) Spectroscopy on nanomaterials
442623 VO [en] (VDS-PH) Physics of 2D Materials
260130 SE [de en] Seminar in special topics in relativity - Cauchy problems for wave equations
260358 SE [en] Quantum Optomechanics
442609 SE [en] Quantum Foundations - (Journal Club)
442610 SE [en] Seminar Quantum Entanglement - Foundations and Applications
442615 SE [en] Quantum Optics Seminar - The Seminar consists of a series of talks, given by mainly international guests.
442617 SE [en] Quantum Nanophysics - (Journal Club)
442618 VO [en] (VDS-PH) Quantum Information Theory I
260011 VO Physics of the earth - Structure and physical properties of the earth
260054 SE [de en] Seminar - low dimensional solids - synthesis, characterization and device applications
442607 SE [en] Seminar in low dimensional quantum solids - Seminar on new results on the properties of low dimensional quantum solids such as fullerenes, nanotubes and graphene, high temperature superconductors and optoelectronic materials as well as implications on their application potential
442621 VO [en] (VDS-PH) Spectroscopy on nanomaterials
442622 VU (VDS-PH) QCD and Jet Physics
260148 PR Specialization Module Nuclear and Isotope Physics - Supervision of master theses in the framework of subatomic physics, experimental work on international accelerator centres: CERN-AD, Geneva, Switzerland; GSI, Darmstadt, Germany; J-PARC, Tokai, Japa and DAFNE, Frascati, Italy. (Additional information on SMI-homepage: www.oeaw.ac.at/smi)
260165 PR Specialization Module Quantum Optics, Quantum Nanophysics and Quantum Information - Introduction to the work methods of experimental and theoretical quantum physics - Preparation towards the masterthesis