MASTER′S PROGRAM
GEOMETRY AND QUANTUM FIELDS
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Timetable - Spring Semester 2025
COURSES
COURSES
Semester
fall
spring
Status
compulsory
elective
Academic year
1st
2nd
Algebra. Part 1
Compulsory
Algebra. Part 2
Compulsory
Algebraic structures in Integrable systems
Compulsory
Batalin-Vilkovisky Quantization
Compulsory
Conformal Field Theory in Two Dimensions
Elective
Conformal Geometry and Riemann Surfaces
Compulsory
Conformal Theories and Holographic Dualities
Compulsory
Differential Geometry
Compulsory
Functional Analysis and Theory of Operators
Compulsory
Geometrical Theory of Nonlinear Differential Equations
Elective
Higher Spin Theory and Holography
Elective
Homological Algebra
Elective
Introduction to Conformal Field Theory in Two Dimensions
Compulsory
Introduction to String Theory
Compulsory
Introduction to Supergeometry
Compulsory
Modern Quantum Field Theory
Compulsory
Principles of Quantum Field Theory
Compulsory
Quantum Integrable Models
Elective
Seiberg-Witten Invariants
Elective
Selected Topics of General Relativity
Elective
Superstring Theory and Sigma Models
Elective
Symplectic Geometry and Quantizaton
Compulsory
Theory of Dynamical Systems
Elective
Topological Quantum Field Theories
Compulsory
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