Randomized Algorithms: Approximation, Generation and Counting
Randomized Algorithms: Approximation, Generation and Counting (Distinguished Dissertations)
This study discusses two problems of fine pedigree - counting and generation - both of which are of fundamental importance to discrete mathematics and probability. When asking questions like "How many are there?" and "What does it look like on average?" of families of combinatorial structures, answers are often difficult to find - we can be blocked by seemingly intractable algorithms. This text shows how to get around the problem of intractability with the Markov chain Monte Carlo method, as well as highlighting the method's natural limits. It uses the technique of coupling before introducing "path coupling", a technique which radically simplifies and improves upon other methods in the area.
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Markov Chain Monte Carlo Markov Chain Monte Combinatorial Structures Discrete Mathematics Intractability Easy Share Fundamental Importance Approximation Coupling Monte Carlo Method Area Code Pedigree Probability
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