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| 008 | 250312042019xx 23 eng | ||
| 020 | _a9781351241403 | ||
| 037 |
_bTaylor & Francis _cGBP 71.99 _fBB |
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| 040 | _a01 | ||
| 041 | _aeng | ||
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| 100 | 1 | _aEncarnación Algaba | |
| 245 | 1 | 0 | _aHandbook of the Shapley Value |
| 250 | _a1 | ||
| 260 |
_bChapman and Hall/CRC _c20191206 |
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| 300 | _a606 p | ||
| 520 | _bHandbook of the Shapley Value contains 24 chapters and a foreword written by Alvin E. Roth, who was awarded the Nobel Memorial Prize in Economic Sciences jointly with Lloyd Shapley in 2012. The purpose of the book is to highlight a range of relevant insights into the Shapley value. Every chapter has been written to honor Lloyd Shapley, who introduced this fascinating value in 1953. The first chapter, by William Thomson, places the Shapley value in the broader context of the theory of cooperative games, and briefly introduces each of the individual contributions to the volume. This is followed by a further contribution from the editors of the volume, which serves to introduce the more significant features of the Shapley value. The rest of the chapters in the book deal with different theoretical or applied aspects inspired by this interesting value and have been contributed specifically for this volume by leading experts in the area of Game Theory. Chapters 3 through to 10 are more focused on theoretical aspects of the Shapley value, Chapters 11 to 15 are related to both theoretical and applied areas. Finally, from Chapter 16 to Chapter 24, more attention is paid to applications of the Shapley value to different problems encountered across a diverse range of fields. As expressed by William Thomson in the Introduction to the book, "The chapters contribute to the subject in several dimensions: Mathematical foundations; axiomatic foundations; computations; applications to special classes of games; power indices; applications to enriched classes of games; applications to concretely specified allocation problems: an ever-widening range, mapping allocation problems into games or implementation." Nowadays, the Shapley value continues to be as appealing as when it was first introduced in 1953, or perhaps even more so now that its potential is supported by the quantity and quality of the available results. This volume collects a large amount of work that definitively demonstrates that the Shapley value provides answers and solutions to a wide variety of problems. | ||
| 700 | 1 |
_aVito Fragnelli _4B01 |
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| 700 | 1 |
_aJoaquín Sánchez-Soriano _4B01 |
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| 999 |
_c5115 _d5115 |
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