자료유형 | E-Book |
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개인저자 | Gohar, Neelam, author. |
서명/저자사항 | Manipulative voting dynamics /by NeelamGohar. |
발행사항 | Newcastle upon Tyne : Cambridge Scholars Publishing, 2017. |
형태사항 | 1 online resource. |
소장본 주기 | eBooks on EBSCOhostAll EBSCO eBooks |
ISBN | 9781443892308 1443892300 |
서지주기 | Includes bibliographical references. |
내용주기 | Abstract; Acknowledgments; List of Figures; Chapter One; 1.1 Background; 1.1.1 Manipulative Dynamics; 1.1.2 Tactical Voting Dynamics; 1.2 Related Work; 1.3 Problem Statement; 1.3.1 Contribution and Comparison with Previous Work; 1.3.2 Significance and Importance of the Problem; 1.3.3 Specific Research Questions; 1.4 Structure of Book; Chapter Two; 2.1 Notation and Assumptions; 2.2 Definitions; 2.2.1 Manipulations; 2.2.1.1 Types of Moves; 2.2.1.2 Types of Manipulations; 2.2.1.3 Weights Settings; 2.2.2 Existence of Potential Functions and Pure Nash Equilibria; 2.3 Summary Chapter Three3.1 Tactical Voting; 3.1.1 Process Termination for Plurality Rule; 3.1.2 Process Termination for other Positional Scoring Rules; 3.1.2.1 Borda; 3.1.2.2 Veto and K-approval Voting Rule; 3.2 Weighted Votes; 3.2.1 The Plurality Rule; 3.2.2 Borda; 3.3 Conclusions; Chapter Four; 4.1 Increased Support Manipulative Dynamics with Weighted Votes; 4.1.1 A Few Examples of Manipulative Dynamics with Increased Support for the Winning Candidate at Each State; 4.1.2 Upper Bound for General Weight Setting; 4.1.3 Bound for a Small Number of Voters 4.1.3.1 Upper Bound for Bounded Real Weight Setting4.1.4 Upper Bound when the Smallest Weight is < 1; 4.1.5 An Upper Bound under Bounded Integer Weight Setting; 4.1.6 Efficient Process; 4.2 Other Voting Rules like Copeland; 4.2.1 Process Termination; 4.2.2 A Few Examples of Manipulative Dynamics with Copeland Voting Scheme; 4.3 Decreased Support Manipulative Dynamics; 4.3.1 How Long is the Sequence of Moves?; 4.4 Conclusions; Chapter Five; 5.1 Mixture of Different Moves; 5.2 Bounds in Terms of the Number of Distinct Weights; 5.2.1 Manipulation dynamics with un-weighted voters 5.3 ConclusionsChapter Six; 6.1 Termination with a Tie-breaking Rule; 6.1.1 Veto Rule; 6.1.2 Borda Rule; 6.1.3 k-Ma jority Rule or k-Approval Voting Rule; 6.1.4 Copeland's Rule; 6.1.5 Bucklin Scheme; 6.1.6 Plurality with Run-off; 6.2 Process Termination when in Initial Settings, True and Declared Preferences of Voters are the same; 6.2.1 Borda Rule; 6.2.2 k-Approval Voting Rule; 6.2.3 Copeland's Rule; 6.2.4 Bucklin Scheme; 6.2.5 Veto Rule; 6.3 Conclusions; Chapter Seven; 7.1 Summary of Major Findings; 7.2 Implications of the Findings; 7.3 Suggestions for Further Research; Endnotes |
요약 | One of the most actively growing subareas in multi-agent systems is computational social choice theory, which provides a theoretical foundation for preference aggregation and collective decision-making in multi-agent domains. It is concerned with the application of techniques developed in computer science, including complexity analysis and algorithm design, in the study of social choice mechanisms, such as voting. It seeks to import concepts from social choice theory into Artificial Intelligence and computing.People often have to reach a joint decision despite conflicting preferences over the. |
일반주제명 | Artificial intelligence. Intelligent agents (Computer software) Voting. COMPUTERS / General Artificial intelligence. Intelligent agents (Computer software) Voting. |
언어 | 영어 |
기타형태 저록 | Original14438987919781443898799 |
대출바로가기 | http://search.ebscohost.com/login.aspx?direct=true&scope=site&db=nlebk&AN=1517769 |
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No. | 등록번호 | 청구기호 | 소장처 | 도서상태 | 반납예정일 | 예약 | 서비스 | 매체정보 |
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1 | WE00011776 | 006.3 | 가야대학교/전자책서버(컴퓨터서버)/ | 대출가능 |