Studienhandbuch | Technische Mathematik

Inhalt

Bachelor's programme Technical Mathematics (UK 033/201)

Overview	ECTS Credits
Mandatory subjects	132,00
........ Algebra and geometry	33,00
................ UE Algebra and discrete mathematics	1,50
................ VL Algebra and discrete mathematics	4,50
................ UE Introduction to Geometry	1,50
................ VL Introduction to Geometry	4,50
................ UE Linear algebra and analytic geometry 2	3,00
................ VL Linear algebra and analytic geometry 2	7,50
................ VL Linear algebra and analytic geometry 1	7,50
................ UE Linear algebra and analytic geometry 1	3,00
........ Analysis	39,00
................ UE Analysis 1	3,00
................ VL Analysis 1	7,50
................ UE Analysis 2	3,00
................ VL Analysis 2	7,50
................ UE Functional Analysis	1,50
................ VL Functional Analysis	4,50
................ UE Ordinary differential equations and dynamical systems	1,50
................ VL Ordinary differential equations and dynamical systems	4,50
................ VL Partial differential equations	6,00
........ Working techniques in mathematics	16,50
................ KV Algorithmic methods in numerical analysis	3,00
................ KV Algorithmic methods	3,00
................ KV Logic as a working language	3,00
................ KV Programming 2	3,00
................ KV Programming 1	4,50
........ Computer Mathematics	13,50
................ VL Algorithms and data structures	3,00
................ VL Algortithmic Combinatorics	3,00
................ VL Computational Logic	3,00
................ UE Computer Algebra	1,50
................ VL Computer Algebra	3,00
........ Numerical analysis and optimization	16,50
................ VL Numerical methods for partial differential equations	6,00
................ UE Numerical analysis	1,50
................ VL Numerical analysis	3,00
................ UE Optimization	1,50
................ VL Optimization	4,50
........ Stochastics and Statistics	13,50
................ UE Measure and Integral	1,50
................ VL Measure and Integral	3,00
................ UE Probability theory and statistics	3,00
................ VL Probability theory and statistics	6,00
Electives	30,00
........ Mathematical Modelling	6,00-9,00
................ VL Formal Modelling	3,00
................ VL Mathematical models in the natural sciences	3,00
................ VL Mathematical models in the economic sciences	3,00
................ VL Mathematical models in engineering	3,00
................ VL Knowledge and Data Based Modelling	3,00
........ Mathematical Seminars	3,00-6,00
................ PS Formal Modelling	3,00
................ PS Mathematical models in the natural sciences	3,00
................ PS Mathematical models in the economic sciences	3,00
................ PS Mathematical models in engineering	3,00
................ SE Seminar algebra and discrete mathematics	3,00
................ SE Seminar Analysis	3,00
................ SE Seminar Functional analysis	3,00
................ SE Seminar Geometry	3,00
................ SE Seminar logic and software design	3,00
................ SE Seminar mathematical methods in the natural sciences	3,00
................ SE Seminar mathematical methods in the economic sciences	3,00
................ SE Seminar mathematical methods in engineering	3,00
................ SE Seminar numerical analysis	3,00
................ SE Seminar optimization	3,00
................ SE Seminar symbolic computation	3,00
................ SE Seminar probability theory and mathematical statistics	3,00
................ SE Seminar Knowledge-based Mathematical Systems	3,00
................ SE Seminar Number theory	3,00
................ PS Knowledge and Data Based Modelling	3,00
........ Exercises in Partial Differential Equations	3,00-6,00
................ UE Numerical methods for partial differential equations	3,00
................ UE Partial differential equations	3,00
........ Exercises in Computational Mathematics	1,50-4,50
................ UE Algorithms and data structures	1,50
................ UE Algortithmic Combinatorics	1,50
................ UE Computational Logic	1,50
........ Gender Studies	3,00-6,00
................ KV Gender Studies and Social Competence	3,00
................ KV Gender Studies TNF - Introduction	3,00
................ VL Special Topics Gender Studies	3,00
........ a. Analysis	0,00-13,50
................ VL Integral equations and boundary value problems	6,00
................ VL Dynamical systems and chaos	3,00
................ VL Complex variables	6,00
................ VL Pseudodifferential operators and Fourier integral operators	3,00
................ KO Analysis 1	0,00
................ KO Analysis 2	0,00
................ UE Dynamical systems and chaos	1,50
................ UE Fractals	1,50
................ VL Fractals	3,00
................ UE Complex variables	3,00
................ UE Integral equations and boundary value problems	3,00
................ UE Classical harmonic analysis	1,50
................ VL Classical harmonic analysis	3,00
................ UE Pseudodifferential operators and Fourier integral operators	1,50
................ UE Singular integrals and potential theory	1,50
................ VL Singular integrals and potential theory	3,00
................ VL Special course Analysis (1,5 ECTS)	1,50
................ UE Special course analysis	1,50
................ VL Special course analysis	3,00
........ b. Numerical analysis	0,00-13,50
................ VL Numerical methods for elliptic equations	6,00
................ VL Numerical methods in continuum mechanics 1	3,00
................ UE Numerical methods for elliptic equations	3,00
................ UE Numerical methods in continuum mechanics 1	1,50
................ UE Numerical methods in continuum mechanics 2	1,50
................ VL Numerical methods in continuum mechanics 2	3,00
................ VL Special topics numerical analysis (1,5 ECTS)	1,50
................ UE Special topics numerical analysis	1,50
................ VL Special topics numerical analysis	3,00
........ c. Probability theory and mathematical statistics	0,00-13,50
................ UE Stochastic simulation	1,50
................ VL Stochastic simulation	3,00
................ VL Stochastic processes	3,00
................ VL Statistical methods	3,00
................ VL Stochastic differential equations	3,00
................ UE Queueing theory	1,50
................ VL Queueing theory	3,00
................ UE Markov chains	1,50
................ VL Markov chains	3,00
................ VL Special topcis probability theory and mathematical statistics (1,5 ECTS)	1,50
................ UE Special topcis probability theory and mathematical statistics	1,50
................ VL Special topcis probability theory and mathematical statistics	3,00
................ UE Statistical methods	1,50
................ UE Stochastic differential equations	1,50
................ UE Stochastic processes	1,50
................ UE Reliability theory	1,50
................ VL Reliability theory	3,00
........ d. Mathematical methods in the natural sciences	0,00-13,50
................ VL Theoretical physics for mathematicians	6,00
................ VL Special Topics mathematical methods in the natural sciences (1,5 ECTS)	1,50
................ UE Special Topics mathematical methods in the natural sciences	1,50
................ VL Special Topics mathematical methods in the natural sciences	3,00
................ UE Theoretical physics for mathematicians	1,50
........ e. Mathematical methods in engineering	0,00-13,50
................ VL Inverse problems	3,00
................ VL Mathematical methods in continuum mechanics	6,00
................ UE Inverse problems	1,50
................ UE Mathematical methods in electrical engineering	1,50
................ VL Mathematical methods in electrical engineering	3,00
................ UE Mathematical methods in continuum mechanics	3,00
................ VL Special topics mathematical methods in engineering	1,50
................ UE Special topics mathematical methods in engineering	1,50
................ VL Special topics mathematical methods in engineering	3,00
........ f. Mathematical methods in the economic sciences	0,00-13,50
................ VL Financial mathematics	4,50
................ UE Financial mathematics	1,50
................ VL Special topics mathematical methods in the economic sciences (1,5 ECTS)	1,50
................ UE Special topics mathematical methods in the economic sciences	1,50
................ VL Special topics mathematical methods in the economic sciences	3,00
................ VL Mathematics in the actuarial sciences	3,00
........ g. Optimization	0,00-13,50
................ VL Special Topics optimization (1,5 ECTS)	1,50
................ UE Special Topics optimization	1,50
................ VL Special Topics optimization	3,00
................ UE Calculus of variation	1,50
................ VL Calculus of variation	3,00
........ h. Symbolic computation	0,00-13,50
................ VL Algebraic combinatorics	3,00
................ VL Commutative algebra and algebraic geometry	6,00
................ UE Algebraic combinatorics	1,50
................ VL Computer analysis	3,00
................ UE Computer Algebra for Concrete Mathematics	1,50
................ VL Computer Algebra for Concrete Mathematics	3,00
................ VL Elimination theory	3,00
................ UE Commutative algebra and algebraic geometry	1,50
................ KV Programming in Mathematica	3,00
................ KV Programming project symbolic computation	3,00
................ VL Special Topics symbolic computation (1,5 ECTS)	1,50
................ UE Special Topics symbolic computation	1,50
................ VL Special Topics symbolic computation	3,00
........ i. Logic and software design	0,00-13,50
................ KV Formal methods in software development	6,00
................ VL Mathematical logic 1	6,00
................ KV Practical software technology	6,00
................ UE Automated Reasoning	1,50
................ VL Automated Reasoning	3,00
................ VL Computability theory	3,00
................ VL Design and Analysis of Algorithms	3,00
................ VL Introduction to parallel and distributed computing	3,00
................ VL Decidable logical theories	3,00
................ VL Decidibility and complexity classes	3,00
................ VL Formal Semantics of Programming Languages	3,00
................ KV Functional programming	3,00
................ KV Logic programming	3,00
................ UE Mathematical logic 1	1,50
................ VL Mathematical logic 2	3,00
................ VL Rewriting in Computer Science and Logic	3,00
................ VL Special topics logic and software design (1,5 ECTS)	1,50
................ UE Special topics logic and software design	1,50
................ VL Special topics logic and software design	3,00
................ VL Thinking, Speaking, Writing	3,00
........ j. Algebra and discrete mathematics	0,00-13,50
................ UE Algebra	1,50
................ VL Algebra	6,00
................ UE Discrete mathematics	1,50
................ VL Discrete mathematics	3,00
................ UE Information and coding theory	1,50
................ VL Information and coding theory	3,00
................ UE Cryptography	1,50
................ VL Cryptography	3,00
................ KO Linear algebra and analytic geometry 1	0,00
................ KO Linear algebra and analytic geometry 2	0,00
................ VL Special Topics algebra and discrete mathematics (1,5 ECTS)	1,50
................ UE Special Topics algebra and discrete mathematics	1,50
................ VL Special Topics algebra and discrete mathematics	3,00
........ k. Functional analysis	0,00-13,50
................ VL Spectral theory and distributions	6,00
................ UE Distributions and locally convex spaces	1,50
................ VL Distributions and locally convex spaces	3,00
................ UE Ergodic theory	1,50
................ VL Ergodic theory	3,00
................ UE Operator theory	1,50
................ VL Operator theory	3,00
................ UE Sobolev spaces	1,50
................ VL Sobolev spaces	3,00
................ UE Spectral theory and distributions	3,00
................ VL Special Topics Functional analysis (1,5 ECTS)	1,50
................ UE Special Topics Functional analysis	1,50
................ VL Special Topics Functional analysis	3,00
........ l. Geometry	0,00-13,50
................ VL Differential geometry	3,00
................ UE Computational Geometry	1,50
................ VL Computational Geometry	3,00
................ UE Computer-aided geometric design	1,50
................ VL Computer-aided geometric design	3,00
................ UE Differential geometry	1,50
................ UE Introduction to topology	1,50
................ VL Introduction to topology	3,00
................ UE Advanced differential geometry	1,50
................ VL Advanced differential geometry	3,00
................ UE Advanced topolopy	1,50
................ VL Advanced topolopy	3,00
................ VL Special Topics Geometry (1,5 ECTS)	1,50
................ UE Special Topics Geometry	1,50
................ VL Special Topics Geometry	3,00
................ UE Splines	1,50
................ VL Splines	3,00
........ m. Knowledge-based Mathematical Systems	0,00-13,50
................ UE Fuzzy logic	1,50
................ VL Fuzzy logic	3,00
................ UE Fuzzy Systems	1,50
................ VL Fuzzy Systems	3,00
................ VL Special topics Knowledge-based Mathematical Systems (1,5 ECTS)	1,50
................ UE Special topics Knowledge-based Mathematical Systems	1,50
................ VL Special topics Knowledge-based Mathematical Systems	3,00
........ n. Number theory	0,00-13,50
................ VL Finite combinatorics	3,00
................ VL Special Topics Number theory (1,5 ECTS)	1,50
................ UE Special Topics Number theory	1,50
................ VL Special Topics Number theory	3,00
................ UE Number-theoretic methods in numerical analysis	1,50
................ VL Number-theoretic methods in numerical analysis	3,00
................ UE Number theory 1	1,50
................ VL Number theory 1	3,00
................ UE Number theory 2	1,50
................ VL Number theory 2	3,00
........ o. Ethic in mathematics and its applications	0,00-3,00
................ KV Ethic in mathematics and its applications	3,00
Bachelor Thesis	9,00
........ SE Bachelor Seminar with Bachelor Thesis	9,00
Free electives	9,00