Course details
Complexity
SLOa Acad. year 2017/2018 Summer semester 5 credits
Turing machines as a basic computational model for computational complexity analysis, time and space complexity on Turing machines. Alternative models of computation, RAM and RASP machines and their relation to Turing machines in the context of complexity. Asymptotic complexity estimations, complexity classes based on time- and space-constructive functions, typical examples of complexity classes. Properties of complexity classes: importance of determinism and non-determinism in the area of computational complexity, Savitch theorem, relation between non-determinism and determinism, closure w.r.t. complement of complexity classes, proper inclusion between complexity classes. Selected advanced properties of complexity classes: Blum theorem, gap theorem. Reduction in the context of complexity and the notion of complete classes. Examples of complete problems for different complexity classes. Deeper discussion of P and NP classes with a special attention on NP-complete problems (SAT problem, etc.). Relationship between decision and optimization problems. Methods for computational solving of hard optimization problems: deterministic approaches, approximation, probabilistic algorithms. Relation between complexity and cryptography. Deeper discussion of PSPACE complete problems, complexity of formal verification methods.
Guarantor
Language of instruction
Completion
Time span
Assessment points
- 68 pts final exam (written part)
- 32 pts projects
Department
Subject specific learning outcomes and competences
Understanding theoretical and practical limits of arbitrary computational systems. Ability to use a selected methods for computationally hard problems.
Learning objectives
Familiarize students with the complexity theory, which is necessary to understand practical limits of algorithmic problem solving on physical computational systems.
Familiarize students with a selected methods for solving hard computational problems.
Recommended prerequisites
Prerequisite knowledge and skills
Formal language theory and theory of computability on master level.
Syllabus of seminars
- Introduction. Complexity, time and space complexity.
- Matematical models of computation, RAM, RASP machines and their relation with Turing machines.
- Asymptotic estimations, complexity classes, determinism and non-determinism from the point of view of complexity.
- Relation between time and space, closure of complexity classes w.r.t. complementation, proper inclusion of complexity classes.
- Blum theorem. Gap theorem.
- Reduction, notion of complete problems, well known examples of complete problems.
- Classes P and NP. NP-complete problems. SAT problem.
- Travelling salesman problem, Knapsack problem and other important NP-complete problems
- NP optimization problems and their deterministic solution: pseudo-polynomial algorithms, parametric complexity
- Approximation algorithms.
- Probabilistic algorithms, probabilistic complexity classes.
- Complexity and cryptography
- PSPACE-complete problems. Complexity and formal verification.
Syllabus - others, projects and individual work of students:
4 projects dedicated on different aspects of the complexity theory.
Progress assessment
Study evaluation is based on marks obtained for specified items. Minimimum number of marks to pass is 50.
The minimal total score of 15 points gained out of the projects.
Controlled instruction
- 4 projects - 8 points each.
- Final exam: max. 68 points
Course inclusion in study plans