Die dunkel hinterlegten Zellen sind dem Studienhandbuch entnommen; die alphanumerischen Klassencodes aus dem Studienhandbuch geben die Stellung der LVA im Curriculum an. Die hell hinerlegten Zellen geben die angebotenen LVAs im Semester 2025s laut KUSSS wieder; diese sind durch die LVA-Nummer identifiziert. Datenstand (KUSSS): 18.2.2025 [Nur angebotene LVAs anzeigen]
Klassencode bzw. LVA-Nummer und Titel Lehrende(r) W ECTS SSt.
402PFFA12: Pflichtfächer 33,00
........ 402MMPH12: Mathematische Methoden der Physik 27,00
................ TMAPAVOFUNK: VL Complex variables 6,00 4,0
................ 402MMPHDGEV22: VL Differential Geometry 3,00 2,0
........................ 356.005: VO Differential Geometry Bert Jüttler
................ 402MMPHDSCV22: VL Dynamical Systems and Chaos 3,00 2,0
........................ 357.430: VO Dynamical Systems and Chaos Weitere Infos Luca Gerardo-Giorda
................ 402MMPHPOFV22: VL Pseudodifferential Operators and Fourier Integral Operators 3,00 2,0
................ TMAPAVOSPEK: VL Spectral theory and distributions 6,00 4,0
................ TMAPAVOTHPH: VL Theoretical physics for mathematicians 6,00 4,0
........ 402STME12: Stochastische Methoden 6,00
................ 402STMESTMV22: VL Statistical Methods 3,00 2,0
................ 402STMESDEV22: VL Stochastic Differential Equations 3,00 2,0
402WAFA21: Wahlfächer
Sonstige Informationen: Es sind Seminare im Ausmaß von mind. 6 ECTS aus den Wahlfächern a. Analysis, d. Mathematische Methoden in den Naturwissenschaften, k. Funktionalanalysis, l. Geometrie zu wählen.		 36,00
........ 402ANAS21: a. Analysis 0,00-36,00
................ TM1WAVOHARM: VL Classical harmonic analysis 3,00 2,0
................ TM1WAUEHARM: UE Classical harmonic analysis 1,50 1,0
................ TM1WAUEFUNK: UE Complex variables 3,00 2,0
........................ 324.006: UE Complex Analysis Weitere Infos Markus Passenbrunner
................ 201ANASDSCU22: UE Dynamical Systems and Chaos 1,50 1,0
........................ 357.431: UE Dynamical Systems and Chaos Weitere Infos Luca Gerardo-Giorda
................ TM1WAVOFRAK: VL Fractals 3,00 2,0
................ TM1WAUEFRAK: UE Fractals 1,50 1,0
................ 403COEXIEBU22: UE Integral Equations and Boundary Value Problems 1,50 1,0
................ 403MAMOIEBV22: VL Integral equations and boundary value problems 6,00 4,0
................ 201ANASPOFU22: UE Pseudodifferential Operators and Fourier Integral Operators 1,50 1,0
................ 201MASEANAS18: SE Seminar Analysis W 3,00 2,0
........................ 324.158: SE Analysis: Spektraltheorie Paul Müller; Richard Lechner
................ 402WAFAMDSS12: SE Seminar for graduate and doctoral students W 3,00 2,0
................ 201ANASSIPV22: VL Singular Integrals and Potential Theory 3,00 2,0
........................ 324.126: VO Singular Integrals and Potential Theory Paul Müller
................ 201ANASSIPU22: UE Singular Integrals and Potential Theory 1,50 1,0
........................ 324.127: UE Singular Integrals and Potential Theory Weitere Infos Paul Müller
................ 201ANASSP1V12: VL Special course Analysis (1,5 ECTS) W 1,50 1,0
................ 201ANASSP2V12: VL Special course analysis W 3,00 2,0
................ 201ANASSP1U12: UE Special course analysis 1,50 1,0
........ 402NUMA18: b. Numerische Mathematik 0,00-12,00
................ 201MASENUAS22: SE Numerical Analysis W 3,00 2,0
........................ 327.006: SE Numerical Analysis: Forschungsseminar Herbert Egger
........................ 327.014: SE Numerical Analysis: Methodenseminar Herbert Egger
................ 403NUSINMCV22: VL Numerical Methods in Continuum Mechanics 3,00 2,0
................ 201NUMANMCU22: UE Numerical Methods in Continuum Mechanics 1,50 1,0
................ TM1WBVONKM2: VL Numerical methods in continuum mechanics 2 3,00 2,0
................ TM1WBUENKM2: UE Numerical methods in continuum mechanics 2 1,50 1,0
........ 402WTMS18: c. Wahrscheinlichkeitstheorie und Mathematische Statistik 0,00-19,50
................ 201WTMSMACV22: VL Markov Chains 3,00 2,0
................ 201WTMSMACU22: UE Markov Chains 1,50 1,0
................ 201MASEPTMS22: SE Probability Theory and Mathematical Statistics W 3,00 2,0
................ 201WTMSSTMU22: UE Statistical Methods 1,50 1,0
................ 201WTMSSDEU22: UE Stochastic Differential Equations 1,50 1,0
........................ 369.005: UE Stochastic Differential Equations Amira Meddah
................ 403MAMOSTPV22: VL Stochastic Processes 3,00 2,0
................ 201WTMSSTPU22: UE Stochastic Processes 1,50 1,0
................ 201WTMSSTSV22: VL Stochastic Simulation 3,00 2,0
........................ 369.116: VO Stochastic Simulation Weitere Infos Amira Meddah
................ 201WTMSSTSU22: UE Stochastic Simulation 1,50 1,0
........................ 369.117: UE Stochastic Simulation Weitere Infos Amira Meddah
........ 402MMNW21: d. Mathematische Methoden in den Naturwissenschaften 0,00-19,50
................ 402WAFAMDSS12: SE Seminar for graduate and doctoral students W 3,00 2,0
................ 201MASEMMNS18: SE Seminar mathematical methods in the natural sciences W 3,00 2,0
................ 201MMNWSP1V12: VL Special Topics mathematical methods in the natural sciences (1,5 ECTS) 1,50 1,0
................ 201MMNWSP2V12: VL Special Topics mathematical methods in the natural sciences W 3,00 2,0
................ 201MMNWSP1U12: UE Special Topics mathematical methods in the natural sciences W 1,50 1,0
................ TMAPAVOTHPH: VL Theoretical physics for mathematicians 6,00 4,0
................ TM1WDUETHPH: UE Theoretical physics for mathematicians 1,50 1,0
........ 402MMTK18: e. Mathematische Methoden in der Technik 0,00-21,00
................ 403MAMOINPV22: VL Inverse problems 3,00 2,0
........................ 323.001: VO Inverse Problems Weitere Infos Andreas Neubauer
................ TM1WEUEINVE: UE Inverse problems 1,50 1,0
................ 403COEXMMEU22: UE Mathematical Methods in Continuum Mechanics 1,50 1,0
................ 201MMTKMMEV22: VL Mathematical Methods in Electrodynamics 3,00 2,0
................ 201MASEMMES22: SE Mathematical Methods in Engineering W 3,00 2,0
........................ 323.005: SE Mathematical Methods in Engineering: Linz - Fudan Seminar Ronny Ramlau
................ 403MAMOMMCV22: VL Mathematical methods in continuum mechanics 6,00 4,0
................ TM1WEUEMETE: UE Mathematical methods in electrical engineering 1,50 1,0
........ 402MMWW12: f. Mathematische Methoden in den Wirtschaftswissenschaften 0,00-3,00
................ 201MASEMIES22: SE Mathematical Methods in the Economic Sciences W 3,00 2,0
........................ 325.003: SE Mathematical Methods in the Economic Sciences Sascha Desmettre
........ 402OPTI12: g. Optimierung 0,00-7,50
................ 201OPTICOVV22: VL Calculus of Variation 3,00 2,0
................ 201OPTICOVU22: UE Calculus of Variation 1,50 1,0
................ 201MASEOPTS22: SE Optimization W 3,00 2,0
........ 402SYMR12: h. Symbolisches Rechnen 0,00-3,00
................ 201MASESYMS20: SE Seminar symbolic computation W 3,00 2,0
........................ 326.060: SE Symbolic Computation: Geschichte und Philosophie der Mathematik Weitere Infos Josef Schicho
........................ 326.CA1: SE Symbolic Computation: Computer Algebra and Applications Weitere Infos Carsten Schneider
........................ 326.063: SE Symbolic Computation: Projektseminar Formale Methoden und Automatisches Beweisen Weitere Infos Wolfgang Schreiner; Teimuraz Kutsia; Wolfgang Windsteiger
........ 402LOSD12: i. Logik und Softwaredesign 0,00-3,00
................ 201MASELSDS20: SE Seminar logic and software design W 3,00 2,0
........ 402ADMA18: j. Algebra und Diskrete Mathematik 0,00-10,50
................ 201ADMAALGV20: VL Algebra 6,00 4,0
................ 201ADMAALGU20: UE Algebra 1,50 1,0
................ 201MASEADMS20: SE Seminar algebra and discrete mathematics W 3,00 2,0
........................ 368.303: SE Algebra and Discrete Mathematics: Projektseminar Mathematische Talente Georg Grasegger; Manuel Kauers
........................ 368.000: SE Algebra and Discrete Mathematics: Research Seminar Weitere Infos Manuel Kauers
........ 402FUAN12: k. Funktionalanalysis 0,00-33,00
................ TM1WKVODIST: VL Distributions and locally convex spaces 3,00 2,0
........................ 324.139: VO Distributions and locally convex spaces Weitere Infos Richard Lechner
................ TM1WKUEDIST: UE Distributions and locally convex spaces 1,50 1,0
........................ 324.140: UE Distributions and locally convex spaces Weitere Infos Richard Lechner
................ TM1WKVOERGO: VL Ergodic theory 3,00 2,0
........................ 325.035: VO Ergodic theory Gerhard Larcher
................ TM1WKUEERGO: UE Ergodic theory 1,50 1,0
........................ 325.036: UE Ergodic theory Gerhard Larcher
................ TM1WKVOOPER: VL Operator theory 3,00 2,0
................ TM1WKUEOPER: UE Operator theory 1,50 1,0
................ 201MASEFUAS18: SE Seminar Functional analysis W 3,00 2,0
................ 402WAFAMDSS12: SE Seminar for graduate and doctoral students W 3,00 2,0
................ TM1WKVOSOBO: VL Sobolev spaces 3,00 2,0
................ TM1WKUESOBO: UE Sobolev spaces 1,50 1,0
................ 201FUANSP1V12: VL Special Topics Functional analysis (1,5 ECTS) W 1,50 1,0
................ 201FUANSP2V12: VL Special Topics Functional analysis W 3,00 2,0
................ 201FUANSP1U12: UE Special Topics Functional analysis W 1,50 1,0
................ TM1WKUESPEK: UE Spectral theory and distributions 3,00 2,0
........ 402GEOM21: l. Geometrie 0,00-34,50
................ TM1WLVOHDGE: VL Advanced differential geometry 3,00 2,0
................ TM1WLUEHDGE: UE Advanced differential geometry 1,50 1,0
................ TM1WLVOHTOP: VL Advanced topolopy 3,00 2,0
................ TM1WLUEHTOP: UE Advanced topolopy 1,50 1,0
................ 201GEOMCOGV14: VL Computational Geometry 3,00 2,0
................ 201GEOMCOGU14: UE Computational Geometry 1,50 1,0
................ TM1WLVOCAGD: VL Computer-aided geometric design 3,00 2,0
................ TM1WLUECAGD: UE Computer-aided geometric design 1,50 1,0
................ 201GEOMDGEU22: UE Differential Geometry 1,50 1,0
........................ 356.003: UE Differential Geometry Philipp Langgruber
................ 201MASEGEOS22: SE Geometry W 3,00 2,0
........................ 356.300: SE Geometry: Algebraic Spline Curves and Surfaces Weitere Infos Bert Jüttler
................ TM1WLVOTOPO: VL Introduction to topology 3,00 2,0
................ TM1WLUETOPO: UE Introduction to topology 1,50 1,0
................ 402WAFAMDSS12: SE Seminar for graduate and doctoral students W 3,00 2,0
................ TM1WLVOSPLI: VL Splines 3,00 2,0
........................ 356.012: VO Splines Weitere Infos Bert Jüttler
................ TM1WLUESPLI: UE Splines 1,50 1,0
........................ 356.013: UE Splines Weitere Infos Philipp Langgruber
........ 402WIMS12: m. Wissensbasierte mathematische Systeme 0,00-3,00
................ 201MASEWISS18: SE Seminar Knowledge-based Mathematical Systems W 3,00 2,0
........................ 357.507: SE Mathematical Modelling: nach Vereinbarung Weitere Infos Luca Gerardo-Giorda; Susanne Saminger-Platz
........ 402ZATH12: n. Zahlentheorie 0,00-7,50
................ 201ZATHNMNV22: VL Number-theoretic Methods in Numerical Analysis 3,00 2,0
................ 201ZATHNMNU22: UE Number-theoretic Methods in Numerical Analysis 1,50 1,0
................ 201MASENTHS20: SE Seminar Number theory W 3,00 2,0
........ 402GEND18: o. Gender Studies 0,00-6,00
................ GS-BC: VL Ethics and Gender Studies 3,00 2,0
........................ 536.020: VO Ethics and Gender Studies: Gender in Technological Processes Waltraud Ernst
................ GS-ME-TN: KV Gender Studies Managing Equality TN 3,00 2,0
........................ 536.027: KV Gender Studies Managing Equality TN: Gender in Naturwissenschaft und Technik Bettina Bock von Wülfingen
402FRST12: Freie Studienleistungen 10,50
Masterarbeit (keine Masterarbeitsseminare vorgesehen!) 36,00
Masterprüfung 4,50