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 2024s laut KUSSS wieder; diese sind durch die LVA-Nummer identifiziert. Datenstand: 7.2.2024 [Nur angebotene LVAs anzeigen]
Klassencode bzw. LVA-Nummer und TitelLehrende(r)WECTSSSt.
404COSU23: Core Subjects
Three core subjects (12,00 ECTS each) have to be fully completed. Courses from the other core subjects can be counted towards the Electvies.		36,00
........ 404ALBR23: Algebra0,00/12,00
................ 404ALBRALGV23: VL Algebra6,004,0
................ 404ALBRALVC23: VL Algebraic Combinatorics3,002,0
................ 404ALBRDEMV23: VL Discrete Mathematics3,002,0
........................ 368.001: VL Discrete MathematicsOliver Roche-Newton
........ 404ANAC23: Analysis0,00/12,00
................ 404ANACCANV23: VL Complex Analysis4,503,0
........................ 324.005: VL Complex AnalysisMichael Schmuckenschläger
................ 404ANACDSCV23: VL Dynamical Systems and Chaos3,002,0
........................ 357.430: VO Dynamical Systems and Chaos Weitere InfosLuca Gerardo-Giorda
................ 404ANACSTDV23: VL Spectral theory and distributions4,503,0
........................ 324.104: VL Spectral theory and distributionsPaul Müller
........ 404CANC23: Computer Algebra and Number Theory0,00/12,00
................ 404CANCACAV23: VL Advanced Computer Algebra3,002,0
........................ 368.302: VL Advanced Computer AlgebraManuel Kauers
................ 404CANCNUTV23: VL Number Theory4,503,0
................ 404CANCSSIV23: VL Symbolic Summation and Integration4,503,0
........ 404GEOC23: Geometry0,00/12,00
................ 404GEOCCAAV23: VL Commutative algebra and algebraic geometry3,002,0
................ 404GEOCCOGV23: VL Computational Geometry3,002,0
................ 404GEOCCGDV23: VL Computer-aided geometric design3,002,0
........................ 356.161: VO Computer-aided geometric designBert Jüttler
................ 404GEOCDGEV23: VL Differential Geometry3,002,0
........ 404MMMC23: Mathematical Methods in Modeling and Data Analysis0,00/12,00
................ 403MAMOIEBV22: VL Integral equations and boundary value problems6,004,0
................ 404MMMCSTMV23: VL Statistical Methods3,002,0
................ 404MMMCWFAV23: VL Wavelets – Functional Analytical Basics3,002,0
........................ 323.009: VL Wavelets – Functional Analytical Basics Weitere InfosRonny Ramlau
........ 404MAMC23: Mathematical Models0,00/12,00
................ 404MAMCCMMV23: VL Computational Modeling in Medicine and Life Science3,002,0
........................ 357.197: VL Computational Modeling in Medicine and Life Science: Computergestützte Modellierung in Medizin und Biowissenschaften Weitere InfosLuca Gerardo-Giorda
................ 403MAMOMMCV22: VL Mathematical methods in continuum mechanics6,004,0
................ 404MAMCNLIV23: VL Non-Life Insurance Mathematics3,002,0
........ 404NUMC23: Numerical Methods0,00/12,00
................ 403MAMOINPV22: VL Inverse problems3,002,0
........................ 323.001: VO Inverse Problems Weitere InfosAndreas Neubauer
................ 403NUSINMEV22: VL Numerical Methods for Elliptic Equations6,004,0
........................ 327.003: VO Numerical Methods for Elliptic EquationsAndreas Schafelner
................ 403NUSINMCV22: VL Numerical Methods in Continuum Mechanics3,002,0
........ 404STCC23: Stochastics0,00/12,00
................ 403MAMOFIMV22: VL Financial Mathematics4,503,0
................ 404STCCSDEV23: VL Stochastic Differential Equations4,503,0
........................ 325.007: VL Stochastic Differential EquationsSascha Desmettre
................ 403MAMOSTPV22: VL Stochastic Processes3,002,0
........ 404SLOC23: Symbolic Logic0,00/12,00
................ 404SLOCAURV23: VL Automated Reasoning4,503,0
................ 921SOENFMSK13: KV Formal Methods in Software Development4,503,0
................ 404SLOCMALV23: VL Mathematical Logic3,002,0
........................ 326.019: VL Mathematical Logic Weitere InfosTeimuraz Kutsia; Tudor Jebelean
404ELEC21: Electives
Take account of upper bounds on ECTS for Soft Skills and Supplementary Subjects.		31,50
........ 404ANAS23: Analysis0,00-31,50
................ 201MASEANAS23: SE Analysis W3,002,0
........................ 324.158: SE Analysis: SobolevräumePaul Müller; Richard Lechner; Markus Passenbrunner
................ TM1WAVOHARM: VL Classical harmonic analysis3,002,0
........................ 324.100: VO Classical harmonic analysisMario Ullrich
................ TM1WAUEHARM: UE Classical harmonic analysis1,501,0
........................ 324.120: UE Classical harmonic analysisMario Ullrich
................ 201ANASCANU23: UE Complex Analysis3,002,0
........................ 324.006: UE Complex AnalysisMichael Schmuckenschläger
................ 201ANASDSCU22: UE Dynamical Systems and Chaos1,501,0
........................ 357.431: UE Dynamical Systems and Chaos Weitere InfosLuca Gerardo-Giorda
................ TM1WAVOFRAK: VL Fractals3,002,0
........................ 324.118: VO FractalsMarkus Passenbrunner
................ TM1WAUEFRAK: UE Fractals1,501,0
........................ 324.129: UE FractalsMarkus Passenbrunner
................ 403COEXIEBU22: UE Integral Equations and Boundary Value Problems1,501,0
................ 201ANASPOFV23: VL Pseudodifferential Operators and Fourier Integral Operators3,002,0
........................ 324.013: VO Pseudodifferential Operators and Fourier Integral Operators Weitere InfosMarkus Passenbrunner
................ 201ANASPOFU22: UE Pseudodifferential Operators and Fourier Integral Operators1,501,0
........................ 324.020: UE Pseudodifferential Operators and Fourier Integral Operators Weitere InfosMarkus Passenbrunner
................ 201ANASSIPV22: VL Singular Integrals and Potential Theory3,002,0
................ 201ANASSIPU22: UE Singular Integrals and Potential Theory1,501,0
................ 201ANASSP1V12: VL Special course Analysis (1,5 ECTS) W1,501,0
................ 201ANASSP2V12: VL Special course analysis W3,002,0
................ 201ANASSP1U12: UE Special course analysis1,501,0
........ 404NUAN23: Numerical analysis0,00-31,50
................ 403NUMACELV22: VL Computational Electromagnetics3,002,0
................ 201MASENUAS22: SE Numerical Analysis W3,002,0
........................ 327.006: SE Numerical Analysis: ForschungsseminarHerbert Egger; Helmut Gfrerer
........................ 327.014: SE Numerical Analysis: MethodenseminarHerbert Egger; Helmut Gfrerer
................ 403COEXNMEU22: UE Numerical Methods for Elliptic Equations1,501,0
........................ 327.004: UE Numerical Methods for Elliptic EquationsAndreas Schafelner
................ 201NUMANMCU22: UE Numerical Methods in Continuum Mechanics1,501,0
................ TM1WBVONKM2: VL Numerical methods in continuum mechanics 23,002,0
................ TM1WBUENKM2: UE Numerical methods in continuum mechanics 21,501,0
................ 201NUMASP1V22: VL Special Topics Numerical Analysis (1.5 ECTS) W1,501,0
................ 201NUMASP2V22: VL Special Topics Numerical Analysis W3,002,0
........................ 327.024: VL Special Topics Numerical Analysis: Numerical methods for differential-algebraic equationsHerbert Egger
................ 201NUMASP1U22: UE Special Topics Numerical Analysis W1,501,0
........................ 327.015: UE Special Topics Numerical Analysis: Numerical methods for differential-algebraic equationsHerbert Egger
........ 404PTMS23: Probability theory and mathematical statistics0,00-31,50
................ 201WTMSMACV22: VL Markov Chains3,002,0
........................ 369.124: VO Markov Chains Weitere InfosDmitry Efrosinin
................ 201WTMSMACU22: UE Markov Chains1,501,0
........................ 369.001: UE Markov Chains Weitere InfosDmitry Efrosinin
................ 201MASEPTMS22: SE Probability Theory and Mathematical Statistics W3,002,0
........................ 369.203: SE Probability Theory and Mathematical Statistics: Spezielle Kapitel der Stochastik Weitere InfosEvelyn Buckwar
................ 201WTMSQUTV22: VL Queueing theory3,002,0
................ 201WTMSQUTU22: UE Queueing theory1,501,0
................ 201WTMSRETV22: VL Reliability Theory3,002,0
................ 201WTMSRETU22: UE Reliability Theory1,501,0
................ 201WTMSSP1V22: VL Special Topics Probability Theory and Mathematical Statistics (1.5 ECTS) W1,501,0
................ 201WTMSSP2V22: VL Special Topics Probability Theory and Mathematical Statistics W3,002,0
................ 201WTMSSP1U22: UE Special Topics Probability Theory and Mathematical Statistics W1,501,0
................ 201WTMSSTMU22: UE Statistical Methods1,501,0
................ 403PTMSSDEV22: VL Stochastic Differential Equations 23,002,0
................ 201WTMSSDEU22: UE Stochastic Differential Equations1,501,0
................ 201WTMSSTPU22: UE Stochastic Processes1,501,0
................ 201WTMSSTSV22: VL Stochastic Simulation3,002,0
........................ 369.116: VO Stochastic Simulation Weitere InfosAmira Meddah
................ 201WTMSSTSU22: UE Stochastic Simulation1,501,0
........................ 369.117: UE Stochastic Simulation Weitere InfosDevika Khurana
........ 404MMNS23: Mathematical methods in the natural sciences0,00-31,50
................ 201MASEMMNS23: SE Mathematical Methods in the Natural Sciences W3,002,0
................ 201MMNWSP1V12: VL Special Topics mathematical methods in the natural sciences (1,5 ECTS)1,501,0
................ 201MMNWSP2V12: VL Special Topics mathematical methods in the natural sciences W3,002,0
................ 201MMNWSP1U12: UE Special Topics mathematical methods in the natural sciences W1,501,0
................ 404MMNSTPMV23: VL Theoretical physics for mathematicians6,004,0
................ 201MMNWTPMU23: UE Theoretical physics for mathematicians1,501,0
........ 404MMEN23: Mathematical methods in engineering0,00-31,50
................ 201MMTKINPU23: UE Inverse problems1,501,0
................ 403COEXMMEU22: UE Mathematical Methods in Continuum Mechanics1,501,0
................ 201MMTKMMEV22: VL Mathematical Methods in Electrodynamics3,002,0
................ 201MMTKMMEU23: UE Mathematical Methods in Electrodynamics1,501,0
................ 201MASEMMES22: SE Mathematical Methods in Engineering W3,002,0
........................ 323.008: SE Mathematical Methods in EngineeringRonny Ramlau
........................ 323.005: SE Mathematical Methods in Engineering: Linz - Fudan SeminarRonny Ramlau
................ 201MMTKSP1V22: VL Special Topics Mathematical Methods in Engineering (1.5 ECTS)1,501,0
................ 201MMTKSP2V22: VL Special Topics Mathematical Methods in Engineering3,002,0
................ 201MMTKSP1U22: UE Special Topics Mathematical Methods in Engineering1,501,0
................ 404MMENWFAU23: UE Wavelets – Functional Analytical Basics1,501,0
........................ 323.010: UE Wavelets – Functional Analytical BasicsRonny Ramlau
........ 404MMES23: Mathematical methods in the economic sciences0,00-31,50
................ 201MMWWFIMV22: UE Financial Mathematics1,501,0
................ 201MASEMIES22: SE Mathematical Methods in the Economic Sciences W3,002,0
........................ 325.003: SE Mathematical Methods in the Economic SciencesGerhard Larcher
................ TM1WFVOVERS: VL Mathematics in the actuarial sciences3,002,0
................ 201MMWWSP1V22: VL Special Topics Mathematical Methods in the Economic Sciences (1.5 ECTS)1,501,0
................ 201MMWWSP2V22: VL Special Topics Mathematical Methods in the Economic Sciences W3,002,0
................ 201MMWWSP1U22: UE Special Topics Mathematical Methods in the Economic Sciences W1,501,0
........ 404OPTI23: Optimization0,00-31,50
................ 201OPTICOVV22: VL Calculus of Variation3,002,0
................ 201OPTICOVU22: UE Calculus of Variation1,501,0
................ 201MASEOPTS22: SE Optimization W3,002,0
................ 201OPTISP1V22: VL Special Topics Optimization (1.5 ECTS) W1,501,0
................ 201OPTISP2V22: VL Special Topics Optimization W3,002,0
........................ 327.020: VL Special Topics Optimization: AusgleichsrechnungEwald Lindner
................ 201OPTISP1U22: UE Special Topics Optimization W1,501,0
........................ 327.008: UE Special Topics Optimization: AusgleichsrechnungEwald Lindner
........ 404SYCO23: Symbolic computation0,00-31,50
................ 201SYMRACOU20: UE Algebraic combinatorics1,501,0
................ 201SYMBAURU23: UE Automated Reasoning1,501,0
................ 201SYMRCAGU20: UE Commutative algebra and algebraic geometry1,501,0
................ 201SYMBCTHV23: VL Computability theory3,002,0
........................ 326.055: VL Computability theory: Berechenbarkeitstheorie Weitere InfosNikolaj Popov
................ 201SYMBDAAV23: VL Design and Analysis of Algorithms3,002,0
................ 201SYMBFPLV23: VL Formal Semantics of Programming Languages3,002,0
................ 201SYMBIPDV23: VL Introduction to parallel and distributed computing3,002,0
........................ 326.081: VL Introduction to parallel and distributed computing: Einführung in paralleles und verteiltes Rechnen Weitere InfosWolfgang Schreiner
................ 201SYMBML1U23: UE Mathematical logic1,501,0
........................ 326.021: UE Mathematical logic Weitere InfosTeimuraz Kutsia; Tudor Jebelean
................ 404PCSDPSTK20: KV Practical Software Technology4,503,0
................ 201SYMBPLSK23: KV Practical in Symbolic Computation W3,002,0
........................ 326.062: KV Practical in Symbolic Computation: Programmieren in MathematicaRalf Hemmecke
........................ 326.054: KV Practical in Symbolic Computation: Funktionales Programmieren Weitere InfosTeimuraz Kutsia
................ 201SYMRPSRK20: KV Programming project symbolic computation W3,002,0
................ 201SYMBRCLV23: VL Rewriting in Computer Science and Logic3,002,0
................ 921CGELSASK19: KV SAT Solving3,002,0
........................ 338.021: KV SAT SolvingMartina Seidl; Adrian Rebola Pardo
................ 201SYMRSF2V20: VL Special Functions and Symbolic Summation3,002,0
................ 201SYMRSF2U21: UE Special Functions and Symbolic Summation1,501,0
................ 201SYMRSP1V20: VL Special Topics symbolic computation (1.5 ECTS) W1,501,0
................ 201SYMRSP2V20: VL Special Topics symbolic computation W3,002,0
........................ 326.069: VL Special Topics symbolic computation: Abelsche Kategorien - Spektralsequenzen und AnwendungenGünter Landsmann
........................ 326.076: VL Special Topics symbolic computation: Formale Spezifikation Abstrakter Datentypen Weitere InfosWolfgang Schreiner
........................ 326.097: VL Special Topics symbolic computation: UnifikationstheorieTeimuraz Kutsia
........................ 326.0SR: VL Special Topics symbolic computation: Mathematische Methoden in der Kinematik Weitere InfosJosef Schicho
................ 201SYMRSP2U20: UE Special Topics symbolic computation W1,501,0
................ 201MASESYMS23: SE Symbolic Computation W3,002,0
........................ 326.0CA: SE Symbolic Computation: Computer-Algebra IICarsten Schneider; Koustav Banerjee; Silviu Radu
........................ 326.099: SE Symbolic Computation: Projektseminar Formale Methoden und Automatisches Beweisen II Weitere InfosWolfgang Schreiner; Teimuraz Kutsia; Wolfgang Windsteiger
........................ 326.060: SE Symbolic Computation: Geschichte und Philosophie der MathematikJosef Schicho
................ 201SYMRSSIU23: UE Symbolic Summation and Integration1,501,0
................ TM1WIVOTHSW: VL Thinking, Speaking, Writing W3,002,0
........ 404ADMA23: Algebra and discrete mathematics0,00-31,50
................ 201ADMAACAU23: UE Advanced Computer Algebra1,501,0
........................ 368.312: UE Advanced Computer AlgebraN.N. N.N.
................ 201ADMAALGU20: UE Algebra1,501,0
................ 201MASEADMS23: SE Algebra and Discrete Mathematics W3,002,0
........................ 368.000: SE Algebra and Discrete Mathematics: Research SeminarErhard Aichinger; Manuel Kauers
........................ 368.303: SE Algebra and Discrete Mathematics: Projektseminar Mathematische TalenteGeorg Grasegger; Manuel Kauers
................ 201ADMADEMU23: UE Discrete Mathematics1,501,0
................ 201ADMAGRBV20: VL Groebner Bases3,002,0
................ 201ADMASP1V20: VL Special Topics algebra and discrete mathematics (1.5 ECTS) W1,501,0
................ 201ADMASP2V20: VL Special Topics algebra and discrete mathematics W3,002,0
................ 201ADMASP1U20: UE Special Topics algebra and discrete mathematics W1,501,0
........ 404FUAN23: Functional analysis0,00-31,50
................ TM1WKVODIST: VL Distributions and locally convex spaces W3,002,0
................ TM1WKUEDIST: UE Distributions and locally convex spaces W1,501,0
................ TM1WKVOERGO: VL Ergodic theory3,002,0
........................ 324.111: VO Ergodic theoryMichael Schmuckenschläger
................ TM1WKUEERGO: UE Ergodic theory1,501,0
........................ 324.113: UE Ergodic theoryMichael Schmuckenschläger
................ 201MASEFUAS23: SE Functional analysis W3,002,0
................ TM1WKVOOPER: VL Operator theory3,002,0
................ TM1WKUEOPER: UE Operator theory1,501,0
................ TM1WKVOSOBO: VL Sobolev spaces W3,002,0
................ TM1WKUESOBO: UE Sobolev spaces1,501,0
................ 201FUANSP1V12: VL Special Topics Functional analysis (1,5 ECTS) W1,501,0
................ 201FUANSP2V12: VL Special Topics Functional analysis W3,002,0
................ 201FUANSP1U12: UE Special Topics Functional analysis W1,501,0
................ 201FUANSTDU23: UE Spectral theory and distributions3,002,0
........................ 324.007: UE Spectral theory and distributionsPaul Müller
........ 404GEOM23: Geometry0,00-31,50
................ TM1WLVOHDGE: VL Advanced differential geometry3,002,0
................ TM1WLUEHDGE: UE Advanced differential geometry1,501,0
................ TM1WLVOHTOP: VL Advanced topolopy3,002,0
................ TM1WLUEHTOP: UE Advanced topolopy1,501,0
................ 201GEOMCOGU14: UE Computational Geometry1,501,0
................ TM1WLUECAGD: UE Computer-aided geometric design1,501,0
........................ 356.162: UE Computer-aided geometric designPhilipp Langgruber
................ 201GEOMDGEU22: UE Differential Geometry1,501,0
................ 201MASEGEOS22: SE Geometry W3,002,0
........................ 356.300: SE Geometry: Algebraic Spline Curves and Surfaces Weitere InfosBert Jüttler
........................ 356.212: SE Geometry: Geometrikum Weitere InfosFelix Scholz; Jana Vrablikova
................ TM1WLVOTOPO: VL Introduction to topology3,002,0
........................ 356.010: VO Introduction to topology: Infos unter http://www.ag.jku.at/2023STopologyPoster.pdf Weitere InfosFelix Scholz
................ TM1WLUETOPO: UE Introduction to topology1,501,0
........................ 356.011: UE Introduction to topology Weitere InfosSofia Trautner
................ 201GEOMSP1V22: VL Special Topics Geometry (1.5 ECTS) W1,501,0
................ 201GEOMSP2V22: VL Special Topics Geometry W3,002,0
................ 201GEOMSP1U22: UE Special Topics Geometry W1,501,0
................ TM1WLVOSPLI: VL Splines3,002,0
................ TM1WLUESPLI: UE Splines1,501,0
........ 404KBMS23: Knowledge-based Mathematical Systems0,00-31,50
................ 201WIMSFUSV18: VL Fuzzy Systems3,002,0
................ 201WIMSFUSU18: UE Fuzzy Systems1,501,0
................ 201WIMSMVLV23: VL Manyvalued Logic3,002,0
................ 201WIMSMVLU20: UE Manyvalued Logic1,501,0
................ 201MASEWISS23: SE Mathematical Modelling W3,002,0
........................ 357.507: SE Mathematical Modelling Weitere InfosSusanne Saminger-Platz; Thomas Vetterlein
................ 404KBMSPKBK20: KV Practical Knowledge-Based Systems3,002,0
................ 201WIMSSP1V12: VL Special topics Knowledge-based Mathematical Systems (1,5 ECTS) W1,501,0
................ 201WIMSSP2V12: VL Special topics Knowledge-based Mathematical Systems W3,002,0
................ 201WIMSSP1U12: UE Special topics Knowledge-based Mathematical Systems W1,501,0
........ 404NUTH23: Number theory0,00-31,50
................ 201ZATHANTV23: VL Applied Number Theory3,002,0
................ 201ZATHANTU20: UE Applied Number Theory1,501,0
................ 201ZATHCRGV20: VL Cryptography3,002,0
................ 201ZATHCRGU20: UE Cryptography1,501,0
................ 201ZAHLEKOV20: VL Finite combinatorics3,002,0
................ 201ZATHEZTV20: VL Introduction in number theory 13,002,0
........................ 325.004: VO Introduction in number theory 1Friedrich Pillichshammer
................ 201ZATHEZTU20: UE Introduction in number theory1,501,0
........................ 325.005: UE Introduction in number theoryGerhard Larcher
................ 201ZATHNTHU23: UE Number Theory1,501,0
................ 201MASENTHS23: SE Number Theory W3,002,0
........................ 325.002: SE Number TheoryGerhard Larcher
................ 201ZATHNMNV22: VL Number-theoretic Methods in Numerical Analysis W3,002,0
................ 201ZATHNMNU22: UE Number-theoretic Methods in Numerical Analysis1,501,0
................ 201ZATHSP1V20: VL Special Topics Number theory (1,5 ECTS) W1,501,0
................ 201ZATHSP2V20: VL Special Topics Number theory W3,002,0
................ 201ZATHSP1U20: UE Special Topics Number theory W1,501,0
........ 404SOSK23: Soft Skills0,00-6,00
................ GS-BC: VL Ethics and Gender Studies3,002,0
........................ 536.020: VO Ethics and Gender Studies: Gender in Technological ProcessesWaltraud Ernst
................ GS-ME-TN: KV Gender Studies Managing Equality TN3,002,0
........................ 536.027: KV Gender Studies Managing Equality TN: Gender in Naturwissenschaft und TechnikDoris Allhutter
................ 404SOSKPWPU20: UE Planning, writing and presenting an academic paper3,002,0
........................ 547.07E: UE Planning, writing and presenting an academic paperMaria Christine Pree
........ 404ELEC23: Supplementary Subjects0,00-9,00
................ 281SYRTRETV20: VL Automatic Control4,503,0
........................ 361.001: VL Automatic ControlMarkus Schöberl
................ 281SYRTRETU20: UE Automatic Control1,501,0
........................ 361.008: UE Automatic ControlJohannes Schrotshamer
........................ 361.009: UE Automatic ControlJohannes Schrotshamer
........................ 361.007: UE Automatic ControlGeorg Hartl
................ 481WVERBIIK22: KV Biology for Engineers3,002,0
................ 951STCOCSTK14: KV Computational Statistics4,002,0
................ INBIPVOCOGR: VL Computer Graphics3,002,0
........................ 364.000: VO Computer Graphics Weitere InfosOliver Bimber
................ INBIPUECOGR: UE Computer Graphics1,501,0
........................ 364.002: UE Computer Graphics Weitere InfosGünter Wallner; Rakesh John Amala Arokia Nathan; Oliver Bimber; Letian Wang
........................ 364.003: UE Computer Graphics Weitere InfosGünter Wallner; Rakesh John Amala Arokia Nathan; Oliver Bimber; Letian Wang
........................ 364.004: UE Computer Graphics Weitere InfosLetian Wang; Rakesh John Amala Arokia Nathan; Oliver Bimber; Günter Wallner
........................ 364.001: UE Computer Graphics Weitere InfosGünter Wallner; Rakesh John Amala Arokia Nathan; Oliver Bimber; Letian Wang
........................ 364.005: UE Computer Graphics Weitere InfosLetian Wang; Rakesh John Amala Arokia Nathan; Oliver Bimber; Günter Wallner
........................ 364.006: UE Computer Graphics Weitere InfosLetian Wang; Rakesh John Amala Arokia Nathan; Oliver Bimber; Günter Wallner
........................ 364.007: UE Computer Graphics Weitere InfosRakesh John Amala Arokia Nathan; Oliver Bimber; Günter Wallner; Letian Wang
................ 993MLPEDN1V19: VL Deep Learning and Neural Nets I3,002,0
................ 993MLPEDN1U19: UE Deep Learning and Neural Nets I1,501,0
................ 993MLPEDN2V19: VL Deep Learning and Neural Nets II3,002,0
........................ 365.111: VL Deep Learning and Neural Nets IIGünter Klambauer; Richard Freinschlag; Wei Lin
................ 993MLPEDN2U19: UE Deep Learning and Neural Nets II1,501,0
........................ 365.322: UE Deep Learning and Neural Nets IIWei Lin
........................ 365.324: UE Deep Learning and Neural Nets IIWei Lin
........................ 365.321: UE Deep Learning and Neural Nets IIWei Lin
........................ 365.323: UE Deep Learning and Neural Nets IIWei Lin
........................ 365.114: UE Deep Learning and Neural Nets IIRichard Freinschlag; Günter Klambauer
........................ 365.246: UE Deep Learning and Neural Nets IIRichard Freinschlag; Günter Klambauer
........................ 365.247: UE Deep Learning and Neural Nets IIRichard Freinschlag; Günter Klambauer
........................ 365.248: UE Deep Learning and Neural Nets IIRichard Freinschlag; Günter Klambauer
................ 536DASCDSPV19: VL Digital Signal Processing3,002,0
........................ 382.063: VL Digital Signal Processing Weitere InfosMario Huemer
................ 536DASCDSPU19: UE Digital Signal Processing1,501,0
........................ 382.047: UE Digital Signal Processing Weitere InfosMatthias Wagner
........................ 382.069: UE Digital Signal Processing Weitere InfosMatthias Wagner; Oliver Lang
........................ 382.068: UE Digital Signal ProcessingMatthias Wagner; Oliver Lang
........................ 382.064: UE Digital Signal Processing Weitere InfosMatthias Wagner; Bernhard Plaimer
........................ 382.065: UE Digital Signal Processing Weitere InfosMatthias Wagner; Bernhard Plaimer
........................ 382.066: UE Digital Signal Processing Weitere InfosMatthias Wagner
........................ 382.067: UE Digital Signal Processing: ZusatzgruppeMatthias Wagner
........................ 382.070: UE Digital Signal Processing Weitere InfosMatthias Wagner
................ INBIPVOFOMO: VL Formal Models3,002,0
........................ 338.010: VO Formal Models: Anerkennung für INF B 6.2.2 (ab 2019W) gemeinsam mit UE Formal Models (338.011 / 338.012 / 338.013 / 338.014 / 338.015 / 338.016 / 338.017 / 338.018 / 338.019) Weitere InfosMartina Seidl
................ INBIPUEFOMO: UE Formal Models1,501,0
........................ 338.018: UE Formal Models: Anerkennung für INF B 6.2.2 (ab 2019W) gemeinsam mit VO Formal Models (338.010) Weitere InfosNils Froleyks; Maximilian Heisinger; Simone Heisinger; Peter Pfeiffer; Andreas Plank; Adrian Rebola Pardo; Martina Seidl
........................ 338.015: UE Formal Models: Anerkennung für INF B 6.2.2 (ab 2019W) gemeinsam mit VO Formal Models (338.010) Weitere InfosMaximilian Heisinger; Nils Froleyks; Simone Heisinger; Peter Pfeiffer; Andreas Plank; Adrian Rebola Pardo; Martina Seidl
........................ 338.019: UE Formal Models: Anerkennung für INF B 6.2.2 (ab 2019W) gemeinsam mit VO Formal Models (338.010) Weitere InfosNils Froleyks; Simone Heisinger; Maximilian Heisinger; Peter Pfeiffer; Andreas Plank; Adrian Rebola Pardo; Martina Seidl
........................ 338.013: UE Formal Models: Anerkennung für INF B 6.2.2 (ab 2019W) gemeinsam mit VO Formal Models (338.010) Weitere InfosPeter Pfeiffer; Nils Froleyks; Maximilian Heisinger; Simone Heisinger; Andreas Plank; Adrian Rebola Pardo; Martina Seidl
........................ 338.014: UE Formal Models: Anerkennung für INF B 6.2.2 (ab 2019W) gemeinsam mit VO Formal Models (338.010)Nils Froleyks; Maximilian Heisinger; Simone Heisinger; Peter Pfeiffer; Andreas Plank; Adrian Rebola Pardo; Martina Seidl
........................ 338.012: UE Formal Models: Anerkennung für INF B 6.2.2 (ab 2019W) gemeinsam mit VO Formal Models (338.010) Weitere InfosAdrian Rebola Pardo; Nils Froleyks; Maximilian Heisinger; Simone Heisinger; Peter Pfeiffer; Andreas Plank; Martina Seidl
........................ 338.016: UE Formal Models: Anerkennung für INF B 6.2.2 (ab 2019W) gemeinsam mit VO Formal Models (338.010) Weitere InfosAndreas Plank; Nils Froleyks; Maximilian Heisinger; Simone Heisinger; Peter Pfeiffer; Adrian Rebola Pardo; Martina Seidl
........................ 338.017: UE Formal Models: Anerkennung für INF B 6.2.2 (ab 2019W) gemeinsam mit VO Formal Models (338.010) Weitere InfosSimone Heisinger; Nils Froleyks; Maximilian Heisinger; Peter Pfeiffer; Andreas Plank; Adrian Rebola Pardo; Martina Seidl
........................ 338.011: UE Formal Models: Anerkennung für INF B 6.2.2 (ab 2019W) gemeinsam mit VO Formal Models (338.010)Andreas Plank; Nils Froleyks; Maximilian Heisinger; Simone Heisinger; Peter Pfeiffer; Adrian Rebola Pardo; Martina Seidl
................ 977PADMGATU22: IK Game Theory3,001,0
................ 977PADMGATK22: KS Game Theory3,002,0
................ 993MLPELRNV19: VL LSTM and Recurrent Neural Nets3,002,0
................ 993MLPELRNU19: UE LSTM and Recurrent Neural Nets1,501,0
................ 254AMETMBGV22: VL Medical Imaging4,503,0
........................ 383.030: VL Medical ImagingWerner Baumgartner; Marco Da Silva; Johannes Heitz; Christoph Hintermüller; Sebastian Lifka
................ 254AMETMBGU22: UE Medical Imaging1,501,0
........................ 383.026: UE Medical ImagingSebastian Lifka
........................ 383.027: UE Medical ImagingSebastian Lifka
........................ 383.033: UE Medical ImagingSebastian Lifka
................ 445VCOENMSV23: VL Numerical Methods in Fluid Mechanics3,002,0
................ 445VCOENMSP23: PR Numerical Methods in Fluid Mechanics4,503,0
................ 921COENPACK13: KV Parallel Computing4,503,0
........................ 326.295: KV Parallel Computing Weitere InfosWolfgang Schreiner; Alois Zoitl
................ 481MAPHPHGV22: VL Physical Principles of Mechatronics4,503,0
........................ 374.022: VO Physical Principles of MechatronicsJohannes Heitz
................ 993TASMPRAV22: VL Planning and Reasoning in Artificial Intelligence3,002,0
................ 993TASMPRAU22: UE Planning and Reasoning in Artificial Intelligence1,501,0
................ 921CGELQCOV22: VL Quantum Computing3,002,0
................ 536MLPEREIV20: VL Reinforcement Learning3,002,0
................ 536MLPEREIU20: UE Reinforcement Learning1,501,0
................ 281SYRTSUSV20: VL Signals and Systems4,503,0
................ 281SYRTSUSU20: UE Signals and Systems1,501,0
................ 461GTPHSPIV23: VL Statistical Physics I3,002,0
................ 461GTPHSPIU23: UE Statistical Physics I1,501,0
................ 951SMDSSPDK20: KV Statistical Principles of Data Science W6,003,0
........................ 238.241: KV Statistical Principles of Data Science Weitere InfosHelmut Waldl; Haoyu Chen
................ 993MLPETCMV20: VL Theoretical Concepts of Machine Learning3,002,0
........................ 365.041: VO Theoretical Concepts of Machine LearningJohannes Brandstetter
................ 993MLPETCMU20: UE Theoretical Concepts of Machine Learning1,501,0
........................ 365.320: UE Theoretical Concepts of Machine LearningN.N. N.N.
........................ 365.319: UE Theoretical Concepts of Machine LearningN.N. N.N.
........................ 365.042: UE Theoretical Concepts of Machine LearningJohannes Brandstetter; Lukas Gruber
........................ 365.100: UE Theoretical Concepts of Machine LearningJohannes Brandstetter; Lukas Gruber
........................ 365.244: UE Theoretical Concepts of Machine LearningEric Volkmann; Johannes Brandstetter
........................ 365.245: UE Theoretical Concepts of Machine LearningEric Volkmann; Johannes Brandstetter
................ 254MBSITMBV22: VL Theoretical Modelling of Biological Systems3,002,0
................ 254MBSITMBU22: UE Theoretical Modelling of Biological Systems3,002,0
................ 261THPHTQ1V16: VL Theoretical Quantum Mechanics I6,004,0
........................ 313.026: VO Theoretical Quantum Mechanics IThomas Renger
................ 261THPHTQ1U16: UE Theoretical Quantum Mechanics I3,002,0
........................ 313.027: UE Theoretical Quantum Mechanics IDavid Eilmsteiner
........................ 313.029: UE Theoretical Quantum Mechanics IPatrick Perndorfer
................ 461QPCSQM2V23: VL Theoretical Quantum Mechanics II3,002,0
........................ 313.226: VL Theoretical Quantum Mechanics IIMichel Bockstedte
................ 461QPCSQM2U23: UE Theoretical Quantum Mechanics II1,501,0
........................ 313.211: UE Theoretical Quantum Mechanics IIMichel Bockstedte
................ 261THPHTTDV16: VL Theoretical Thermodynamics3,002,0
................ 261THPHTTDU16: UE Theoretical Thermodynamics1,501,0
404MAAR20: Master's Thesis Seminars16,00
........ 403MATSMT1S22: SE Master’s Thesis Seminar I8,002,0
................ 324.159: SE Master’s Thesis Seminar IPaul Müller
........ 403MATSMT2S22: SE Master’s Thesis Seminar II8,002,0
................ 325.006: SE Master’s Thesis Seminar IIFriedrich Pillichshammer; Sascha Desmettre
................ 369.306: SE Master’s Thesis Seminar II Weitere InfosEvelyn Buckwar
................ 356.503: SE Master’s Thesis Seminar IIBert Jüttler
................ 357.511: SE Master’s Thesis Seminar II Weitere InfosLuca Gerardo-Giorda; Susanne Saminger-Platz; Thomas Vetterlein
................ 323.011: SE Master’s Thesis Seminar IIRonny Ramlau
................ 326.113: SE Master’s Thesis Seminar IICarsten Schneider
................ 327.017: SE Master’s Thesis Seminar IIHelmut Gfrerer; Herbert Egger; Stefan Takacs
................ 368.002: SE Master’s Thesis Seminar IIManuel Kauers; Erhard Aichinger; Peter Fuchs; Oliver Roche-Newton
404FREL20: Free electives12,00
Master's Thesis20,00
Master's Examination4,50