Course of Study Computer Science (Study Cohort w19)

Sample course plan A  Bachelor Computer Science (CSBS)
Specialisation Computational Mathematics
Legend:
Core qualification CompulsorySpecialisation CompulsoryFocus CompulsoryThesis Compulsory
Core qualification Elective CompulsorySpecialisation Elective CompulsoryFocus Elective CompulsoryInterdisciplinary complement
LP
Semester 1FormHrs/wk
Semester 2FormHrs/wk
Semester 3FormHrs/wk
Semester 4FormHrs/wk
Semester 5FormHrs/wk
Semester 6FormHrs/wk
1
Discrete Algebraic Structures
Discrete Algebraic StructuresVL2
Discrete Algebraic StructuresUE2
Objectoriented Programming, Algorithms and Data Structures
Objectoriented Programming, Algorithms and Data StructuresVL4
Objectoriented Programming, Algorithms and Data StructuresUE1
Computer Engineering
Computer EngineeringVL3
Computer EngineeringUE1
Computability and Complexity Theory
Computability and Complexity TheoryVL2
Computability and Complexity TheoryUE2
Seminars Computer Science and Mathematics
Seminar Computational Engineering ScienceSE2
Seminar Computational Mathematics/Computer ScienceSE2
Seminar Engineering Mathematics/Computer ScienceSE2
Graph Theory and Optimization
Graph Theory and OptimizationVL2
Graph Theory and OptimizationUE2
2
3
4
5
6
7
Procedural Programming
Procedural ProgrammingVL1
Procedural Programming1
Procedural ProgrammingPR2
Automata Theory and Formal Languages
Automata Theory and Formal LanguagesVL2
Automata Theory and Formal LanguagesUE2
Computernetworks and Internet Security
Computer Networks and Internet SecurityVL3
Computer Networks and Internet SecurityUE1
Signals and Systems
Signals and SystemsVL3
Signals and SystemsUE2
Software Industrial Internship
Algebra and Control
Algebra and ControlVL2
Algebra and ControlUE2
8
9
10
11
12
13
Functional Programming
Functional ProgrammingVL2
Functional Programming2
Functional ProgrammingUE2
Mathematical Analysis
Mathematical AnalysisVL4
Mathematical Analysis2
Mathematical AnalysisUE2
Mathematics III
Analysis IIIVL2
Analysis IIIUE1
Analysis III1
Differential Equations 1 VL2
Differential Equations 1 UE1
Differential Equations 1 1
Stochastics
StochasticsVL2
StochasticsUE2
Computational Geometry
Computational GeoemetryVL2
Computational GeoemetryUE2
Solvers for Sparse Linear Systems
Solvers for Sparse Linear SystemsVL2
Solvers for Sparse Linear SystemsUE2
14
15
16
17
18
19
Linear Algebra
Linear AlgebraVL4
Linear Algebra2
Linear AlgebraUE2
Software Engineering
Software EngineeringVL2
Software EngineeringUE2
Numerical Mathematics I
Numerical Mathematics IVL2
Numerical Mathematics IUE2
Mathematics IV
Complex FunctionsVL2
Complex FunctionsUE1
Complex Functions1
Differential Equations 2 VL2
Differential Equations 2 UE1
Differential Equations 2 1
20
21
Foundations of Management
Introduction to ManagementVL3
Management Tutorial2
Introduction to Information Security
Introduction to Information SecurityVL3
Introduction to Information SecurityUE2
22
23
24
25
Operating Systems
Operating SystemsVL2
Operating SystemsUE2
Combinatorial Structures and Algorithms
Combinatorial Structures and AlgorithmsVL3
Combinatorial Structures and AlgorithmsUE1
Bachelor Thesis
26
27
28
29
30
31
32
33
34
35
36
Nontechnical Complementary Courses for Bachelors (from catalogue) - 6LP

The choice of courses from the catalogue is flexible (depends on the semestral work load), provided the necessary number of required credits is reached.