The credit units listed in the graduate course program (in brackets) are only valid for doctoral students of I-Math or doctoral students of D-Math according to the old ordinance on the doctorate. For doctoral students of D-Math according to the new ordinance on the doctorate the credit units are valid for courses with a module number ending with -DRL (ETH) or -DP (UZH) or for the Nachdiplom Lectures (ETH). For all other courses please see the information on our website.
The below listed graduate course program is preliminary until September 18, 2023 (start of the semester). Further courses will be added to the program and there can be changes concerning courses or credits until this date.
Title (Credits) | Time & Place | Instructor |
(Random) Graphs with applications to risk management (3) | We, 10.15-12.00 Y27H25 We, 13.00-14.45 Y35F47 Fr, 10.15-12.00 Y27H25
| Nikeghbali |
A Mathematical Introduction to Machine Learning Approximation Algorithms (G) (3) | Mo, 15.15-17.00 ETH HG E 3 Tu, 17.15-18.00 ETH HG G 3
| Jentzen |
Advanced Topics in Field Theory (2) | We, 13.00-14.45 Y27H12
| Cattaneo |
Algebraic Topology II (3) | We, 10.15-12.00 ETH ML F 36 Fr, 13.15-15.00 ETH HG G 3
| Merry |
A_∞ Structures and Moduli Spaces (2) | Mo, 10.15-12.00 ETH HG G 43
| Polishchuk |
Brownian Motion and Stochastic Calculus (U) () | Fr, 08.15-09.00 ETH HG E 21 Fr, 09.15-10.00 ETH HG E 21 Fr, 11.15-12.00 ETH HG E 22 Fr, 12.15-13.00 ETH HG E 22
| Werner |
Brownian Motion and Stochastic Calculus (V) (2) | We, 08.15-10.00 ETH HG G 3 Th, 10.15-12.00 ETH HG D 7.2
| Werner |
Causality (2) | Mo, 08.15-10.00 ETH HG D 1.1
| Meinshausen |
Combinatorial Optimization (U) () | Mo, 14.15-15.00 ETH HG G 26.5
| Zenklusen |
Combinatorial Optimization (V) (2) | Th, 16.15-18.00 ETH HG G 19.1
| Zenklusen |
Combinatorics of integer partitions (2) | Tu, 13.00-14.45 Y27H12 Tu, 17.15-18.00 Y27H25
| Dousse |
Complex Singularities and Picard-Lefschetz Theory (3) | Th, 10.15-12.00 ETH HG G 26.5 Fr, 10.15-11.00 ETH HG G 5
| Biran |
Computational Methods for Quantitative Finance: PDE Methods (3) | We, 13.15-15.00 ETH HG D 1.2 Fr, 13.15-14.00 ETH HG D 1.2
| Schwab |
Computational Methods for Quantitative Finance: PDE Methods (U) () | Fr, 14.15-15.00 ETH HG D 1.2
| Schwab |
Computational Quantum Physics (U) () | Tu, 12.45-14.30 ETH HIL E 9
| |
Computational Quantum Physics (V) (2) | Tu, 10.00-11.45 ETH HIL E 9
| |
Data Analytics for Non-Life Insurance Pricing (V) (1) | Tu, 16.15-18.00 ETH HG F 5
| Wüthrich |
Dependence, Risk Bounds and Optimal Portfolios (V) (2) | Fr, 10.15-12.00 ETH HG G 43
| |
Differential Geometry II (3) | Tu, 08.15-10.00 ETH ML H 43 Th, 10.15-12.00 ETH HG D 1.1
| Salamon |
Differential Geometry II (U) () | Fr, 08.15-09.00 ETH HG E 1.1 Fr, 09.15-10.00 ETH HG E 1.1 Fr, 10.15-11.00 ETH HG E 1.1
| Salamon |
Elliptic Curves (9) | Tu, 13.00-14.45 Y35F47 Tu, 15.00-17.00 Y27H28 Th, 10.15-12.00 Y27H28 Fr, 08.00-09.45 Y27H28
| Rosenthal |
Forcing: Einführung in Unabhängigkeitsbeweise (U) () | Th, 16.15-17.00 ETH ML F 39
| Halbeisen |
Forcing: Einführung in Unabhängigkeitsbeweise (V) (2) | Mo, 13.15-15.00 ETH HG D 7.1 Th, 15.15-16.00 ETH ML F 39
| Halbeisen |
Functional Analysis II (3) | Mo, 10.15-12.00 ETH HG G 5 Th, 13.15-15.00 ETH HG G 5
| Carlotto |
Functional Analysis II (U) () | Mo, 09.15-10.00 ETH HG E 33.3
| Carlotto |
Geometric Integer Programming (U) () | We, 12.15-13.00 ETH HG F 26.3
| Weismantel |
Geometric Integer Programming (V) (2) | Th, 13.15-15.00 ETH HG G 26.3
| Weismantel |
Geometric Wave Equations (3) | Tu, 10.15-12.00 ETH HG F 26.5 Th, 10.15-12.00 ETH HG F 26.5
| Struwe |
Graph Theory (U) () | Th, 15.15-16.00 ETH CAB G 52
| Sudakov |
Graph Theory (V) (2) | We, 10.15-12.00 ETH HG E 1.1 Th, 10.15-12.00 ETH HG E 1.1
| Sudakov |
Homogeneous Dynamics II (3) | Mo, 13.15-16.00 ETH HG F 26.5
| Einsiedler |
Hopf algebras (3) | Tu, 10.15-12.00 Y27H46 We, 15.00-17.00 Y27H26 Th, 13.00-14.45 Y27H12
| Stufler |
Hyperbolic Flows (V) (2) | We, 10.15-12.00 ETH HG G 19.1
| |
Introduction to Computability and Complexity Theory (2) | Tu, 14.00-14.45 Y27H46 Tu, 15.00-17.00 Y27H46
| Bouvel |
Lie groups and Lie algebras (3) | Mo, 13.00-14.45 Y27H12 We, 15.00-17.00
Fr, 13.00-14.45 Y27H12
| Safronov |
Market-Consistent Actuarial Valuation (V) (1) | Mo, 16.15-18.00 ETH HG D 1.1
| Wüthrich |
Mathematical aspects of quantum mechanics (2) | Th, 13.00-14.45 Y27H28 Fr, 15.00-17.00 Y27H25
| Schlein |
Mathematics of (Super-Resolution) Biomedical Imaging (3) | Mo, 09.15-11.00 ETH HG E 22 Th, 13.15-15.00 ETH HG E 22
| Ammari |
Mathematics of Information (U) () | Mo, 13.15-15.00 ETH ML F 39
| Bölcskei |
Mathematics of Information (V) (3) | Th, 09.15-12.00
| Bölcskei |
Microlocal Aspects of Representation Theory (2) | We, 08.15-10.00 ETH HG G 26.5
| Nelson |
Microlocal Aspects of Representation Theory (U) () | Th, 16.15-17.00 ETH HG G 3
| Nelson |
Nonlinear Dynamics and Chaos II (G) (2) | We, 10.15-12.00 ETH HG F 26.3 Th, 16.15-18.00 ETH ML J 34.3
| Haller |
Numerical Methods for Hyperbolic PDEs (3) | Tu, 15.00-17.00 Y27H12 Tu, 17.15-19.00 Y27H12 We, 10.15-12.00 Y27H12
| Abgrall |
Percolation Theory (2) | Tu, 10.15-12.00 ETH HG F 26.3
| Tassion |
Quantitative Risk Management (V) (2) | Th, 10.15-12.00 ETH ML H 43
| Cheridito |
Quantum Field Theory II (U) () | Fr, 08.45-10.30 ETH HCI J 3
| Anastasiou |
Quantum Field Theory II (V) (3) | Mo, 13.45-15.30 ETH HCI J 7 Fr, 10.45-11.30 ETH HCI J 3
| Anastasiou |
Regularity theory for area minimizing currents (2) | Mo, 10.15-12.00 Y27H46
| De Lellis |
Representations of General Linear Groups over p-Adic Fields (V) (1) | We, 15.15-17.00 ETH HG G 5
| |
Selected Topics in Probability (2) | Fr, 10.15-12.00 ETH HG G 26.3
| Sznitman |
Stochastic Loss Reserving Methods (V) (1) | We, 16.15-18.00 ETH ML E 12
| Dahms |
Survival Analysis (1) | Tu, 09.00-11.00 Y13L11/13 Tu, 11.15-12.00
Tu, 11.15-12.00 Y13L11/13
| Hothorn |
Survival Analysis () | | Hothorn |
Symmetric Spaces (3) | Tu, 10.15-12.00 ETH HG D 5.2 Th, 08.15-10.00 ETH HG G 5
| Iozzi |
The conservativity conjecture for realisations of Chow motives (3) | Tu, 13.15-17.00 Y27H25
| Ayoub |
Additional Courses: see semester program of ETH and UZH