| Description |
1 online resource (86 pages) : illustrations |
| Series |
Memoirs of the American Mathematical Society, 0065-9266 ; Volume 110, Number 531 |
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Memoirs of the American Mathematical Society ; Volume 100, no. 531.
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| Contents |
Contents -- List of Figures -- Index of Notation -- Abstract -- Chapter 0. Introduction -- Chapter 1. The Green Function -- 1. Random Walks on a Tree -- 2. The Method of Paths -- 3. The Nearest Neighbor Case -- 4. The Case of a Finitely Supported Measure -- 5. Algebraicity of the Green Function -- 6. Notes and Remarks -- Chapter 2. The Spectrum and the Plancherel Measure -- 1. The Spectrum of the Random Walk in l[sup(r)]{G) -- 2. The l[sup(2)]-spectrum and the Real l[sup(1)]-spectrum -- 3. The Plancherel Formula -- 4. Notes and Remarks |
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Chapter 3. Representations and their Realization on the Boundary1. Boundary Theory for Eigenfunctions of the Random Walk -- 2. The Principal Series -- 3. The Complementary Series -- 4. Notes and Remarks -- Chapter 4. Irreducibility and Inequivalence -- 1. Irreducibility -- 2. Inequivalence -- 3. Notes and Remarks -- References |
| Notes |
"July 1994, Volume 110, Number 531 (end of volume)." |
| Bibliography |
Includes bibliographical references |
| Notes |
English |
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Print version record |
| Subject |
Locally compact groups.
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Representations of groups.
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Random walks (Mathematics)
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Trees (Graph theory)
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Locally compact groups
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Random walks (Mathematics)
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Representations of groups
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Trees (Graph theory)
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| Form |
Electronic book
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| Author |
Steger, Tim, 1957- author.
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| ISBN |
9781470401108 |
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147040110X |
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