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Master's programme Mathematics for Natural Sciences (K 066/402)

Versionsauswahl
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Overview ECTS Credits
(*)Pflichtfächer33,00
........ Mathematical methods in physics27,00
................ VL Differential geometry3,00
................ VL (*)Dynamische Systeme und Chaos3,00
................ VL Complex variables6,00
................ VL Pseudodifferential operators and Fourier integral operators3,00
................ VL Spectral theory and distributions6,00
................ VL Theoretical physics for mathematicians6,00
........ Stochastic methods6,00
................ VL Statistical methods3,00
................ VL Stochastic differential equations3,00
Electives33,00
........ (*)a. Analysis0,00-33,00
................ VL Integral equations and boundary value problems6,00
................ SE Seminar for graduate and doctoral students3,00
................ UE Asymptotic methods for differential equations1,50
................ VL Asymptotic methods for differential equations3,00
................ UE (*)Dynamische Systeme und Chaos1,50
................ UE Evolution equations1,50
................ VL Evolution equations3,00
................ UE Fractals1,50
................ VL Fractals3,00
................ UE Complex variables3,00
................ UE Ordinary differential equations and dynamical systems 21,50
................ VL Ordinary differential equations and dynamical systems 23,00
................ UE Advanced complex variables1,50
................ VL Advanced complex variables3,00
................ UE Integral equations and boundary value problems3,00
................ UE Classical harmonic analysis1,50
................ VL Classical harmonic analysis3,00
................ UE Nonlinear integral equations1,50
................ VL Nonlinear integral equations6,00
................ UE Nonlinear partial differential equations1,50
................ VL Nonlinear partial differential equations3,00
................ UE Pseudodifferential operators and Fourier integral operators1,50
................ SE Seminar Analysis3,00
................ UE Singular integrals and potential theory1,50
................ VL Singular integrals and potential theory3,00
................ VL Special course Analysis (1,5 ECTS)1,50
................ UE Special course analysis1,50
................ VL Special course analysis3,00
........ (*)b. Numerische Mathematik0,00-16,50
................ VL Numerical methods in continuum mechanics 13,00
................ UE Numerical methods in electrical engineering1,50
................ VL Numerical methods in electrical engineering3,00
................ UE Numerical methods in continuum mechanics 11,50
................ UE Numerical methods in continuum mechanics 21,50
................ VL Numerical methods in continuum mechanics 23,00
................ SE Seminar numerical analysis3,00
........ (*)c. Wahrscheinlichkeitstheorie und Mathematische Statistik0,00-24,00
................ UE Stochastic simulation1,50
................ VL Stochastic simulation3,00
................ VL Stochastic processes3,00
................ UE Markov chains1,50
................ VL Markov chains3,00
................ UE Martingales and Brownian motion1,50
................ VL Martingales and Brownian motion3,00
................ SE Seminar probability theory and mathematical statistics3,00
................ UE Statistical methods1,50
................ UE Stochastic differential equations1,50
................ UE Stochastic processes1,50
........ (*)d. Mathematische Methoden in den Naturwissenschaften0,00-21,00
................ SE Seminar for graduate and doctoral students3,00
................ UE Mathematics in the life sciences1,50
................ VL Mathematics in the life sciences6,00
................ SE Seminar mathematical methods in the natural sciences3,00
................ VL Special Topics mathematical methods in the natural sciences (1,5 ECTS)1,50
................ UE Special Topics mathematical methods in the natural sciences1,50
................ VL Special Topics mathematical methods in the natural sciences3,00
................ UE Theoretical physics for mathematicians1,50
........ (*)e. Mathematische Methoden in der Technik0,00-33,00
................ VL Inverse problems3,00
................ VL Mathematical methods in continuum mechanics6,00
................ UE Free boundary problems1,50
................ VL Free boundary problems3,00
................ UE Inverse problems1,50
................ UE Mathematical methods in electrical engineering1,50
................ VL Mathematical methods in electrical engineering3,00
................ UE Mathematical methods in continuum mechanics3,00
................ UE Mathematical theory of inelastic materials1,50
................ VL Mathematical theory of inelastic materials3,00
................ SE Seminar mathematical methods in engineering3,00
................ UE Signal and image processing1,50
................ VL Signal and image processing3,00
........ (*)f. Mathematische Methoden in den Wirtschaftswissenschaften0,00-3,00
................ SE Seminar mathematical methods in the economic sciences3,00
........ (*)g. Optimierung0,00-7,50
................ SE Seminar optimization3,00
................ UE Calculus of variation1,50
................ VL Calculus of variation3,00
........ (*)h. Symbolisches Rechnen0,00-3,00
................ SE Seminar symbolic computation3,00
........ (*)i. Logik und Softwaredesign0,00-3,00
................ SE Seminar logic and software design3,00
........ (*)j. Algebra und Diskrete Mathematik0,00-16,50
................ UE Algebra1,50
................ VL Algebra6,00
................ UE Representation theory of finite groups1,50
................ VL Representation theory of finite groups4,50
................ SE Seminar algebra and discrete mathematics3,00
........ (*)k. Funktionalanalysis0,00-33,00
................ SE Seminar for graduate and doctoral students3,00
................ UE Representation theory and special functions1,50
................ VL Representation theory and special functions3,00
................ UE Distributions and locally convex spaces1,50
................ VL Distributions and locally convex spaces3,00
................ UE Ergodic theory1,50
................ VL Ergodic theory3,00
................ UE Functional-analytic methods1,50
................ VL Functional-analytic methods3,00
................ UE Operator theory1,50
................ VL Operator theory3,00
................ SE Seminar Functional analysis3,00
................ UE Sobolev spaces1,50
................ VL Sobolev spaces3,00
................ UE Spectral theory and distributions3,00
................ VL Special Topics Functional analysis (1,5 ECTS)1,50
................ UE Special Topics Functional analysis1,50
................ VL Special Topics Functional analysis3,00
........ (*)l. Geometrie0,00-33,00
................ SE Seminar for graduate and doctoral students3,00
................ UE Computer-aided geometric design1,50
................ VL Computer-aided geometric design3,00
................ UE Differential geometry1,50
................ UE Introduction to topology1,50
................ VL Introduction to topology3,00
................ UE Advanced differential geometry1,50
................ VL Advanced differential geometry3,00
................ UE Advanced topolopy1,50
................ VL Advanced topolopy3,00
................ UE Kinematics and robotics1,50
................ VL Kinematics and robotics3,00
................ SE Seminar Geometry3,00
................ UE Splines1,50
................ VL Splines3,00
................ UE Wavelets1,50
................ VL Wavelets3,00
........ (*)m. Wissensbasierte mathematische Systeme0,00-3,00
................ SE Seminar Knowledge-based Mathematical Systems3,00
........ (*)n. Zahlentheorie0,00-7,50
................ SE Seminar Number theory3,00
................ UE Number-theoretic methods in numerical analysis1,50
................ VL Number-theoretic methods in numerical analysis3,00
Free electives7,50