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Algebraic Methods for Computing the Reliability of Networks / Algebraische Methoden zur Berechnung der Zuverlässigkeit von NetzwerkenSimon, Frank 11 December 2012 (has links) (PDF)
In the first part of this thesis we generalise the well-known K-terminal reliability R(G,K) to different kinds of terminal vertices. By means of lattice theoretic tools, we propose a divide and conquer approach to compute this new reliability measure efficiently. The first part concludes with an improved path decomposition algorithm that computes R(G,K) much more memory and time efficient compared to current state-of-the-art algorithms. In the second part we discuss the counting of connected set partitions of a graph G and its application to network reliability problems. Again we utilise the lattice theoretic approach to carry out the counting efficiently. Finally, we investigate the domination reliability DR(G) of a graph G as an interesting network reliability measure.
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Algebraic Methods for Computing the Reliability of NetworksSimon, Frank 01 November 2012 (has links)
In the first part of this thesis we generalise the well-known K-terminal reliability R(G,K) to different kinds of terminal vertices. By means of lattice theoretic tools, we propose a divide and conquer approach to compute this new reliability measure efficiently. The first part concludes with an improved path decomposition algorithm that computes R(G,K) much more memory and time efficient compared to current state-of-the-art algorithms. In the second part we discuss the counting of connected set partitions of a graph G and its application to network reliability problems. Again we utilise the lattice theoretic approach to carry out the counting efficiently. Finally, we investigate the domination reliability DR(G) of a graph G as an interesting network reliability measure.
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