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Demonstration of Graph Algorithms
Varadinek, Jakub ; Zámečníková, Eva (referee) ; Křivka, Zbyněk (advisor)
This bachelor thesis deals with the development of the application for demonstration and visualization of several graph algorithms. The application allows the user to create a graph, rate edges or name and layout vertices. The individual algorithms can be performed in created graph for visual observation how the algorithm works. There is also the possibility of stepping through the chosen algorithm and an interactive mode where next steps are selected by the user and the application checks the correctness of these steps.
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Shortest Paths in a Graph
Krauter, Michal ; Křivka, Zbyněk (referee) ; Masopust, Tomáš (advisor)
This thesis deals with shortest paths problem in graphs. Shortest paths problem is the basic issue of graph theory with many pracitcal applications. We can divide this problem into two following generalizations: single-source shortest path problem and all-pairs shortest paths problem. This text introduces principles and algorithms for generalizations. We describe both classical and new more efficient methods. It contains information about how some of these algorithms were implemented and offers an experimental comparison of these algorithms.
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Demonstration of Graph Algorithms
Varadinek, Jakub ; Zámečníková, Eva (referee) ; Křivka, Zbyněk (advisor)
This bachelor thesis deals with the development of the application for demonstration and visualization of several graph algorithms. The application allows the user to create a graph, rate edges or name and layout vertices. The individual algorithms can be performed in created graph for visual observation how the algorithm works. There is also the possibility of stepping through the chosen algorithm and an interactive mode where next steps are selected by the user and the application checks the correctness of these steps.
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Shortest Paths in a Graph
Krauter, Michal ; Křivka, Zbyněk (referee) ; Masopust, Tomáš (advisor)
This thesis deals with shortest paths problem in graphs. Shortest paths problem is the basic issue of graph theory with many pracitcal applications. We can divide this problem into two following generalizations: single-source shortest path problem and all-pairs shortest paths problem. This text introduces principles and algorithms for generalizations. We describe both classical and new more efficient methods. It contains information about how some of these algorithms were implemented and offers an experimental comparison of these algorithms.
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