Normal view MARC view ISBD view

The mathematics of voting and apportionment : an introduction / Sherif El-Helaly.

Material type: TextSeries: Compact Textbooks in Mathematics.Publisher: New York, NY : Springer Science+Business Media, 2019Description: xv, 264 pages; E 39.99 24 cms.Content type: text Media type: unmediated Carrier type: volumeISBN: 9783030147679 (pbk).
Contents:
Chapter 1: Social Choice -- Introduction -- Elimination Procedures -- Condorcet Ideas and Related Procedures -- Scoring Procedures: Borda Count -- A Glimpse into Social Welfare Theory -- Social Choice Procedures: Indifference and Ties Allowed -- Manipulability of Social Choice Procedures: Indifference and Ties Allowed -- Exercises -- Chapter 2: Yes-No Voting -- Introduction -- Quantification of Power in a Yes-No Voting System -- Some Combinatorics -- Banzhaf and Shapley-Shubik Indices in One View -- Weightable Yes-No Voting Systems -- Exercises -- Chapter 3: Apportionment -- Introduction -- Axioms of Apportionment -- Quota Procedures -- Divisor Procedures -- Equity Criteria -- Apportionment Paradoxes -- Applications of Priority Formulas -- Exercises.
Summary: a| This textbook contains a rigorous exposition of the mathematical foundations of two of the most important topics in politics and economics: voting and apportionment, at the level of upper undergraduate and beginning graduate students. It stands out among comparable books by providing, in one volume, an extensive and mathematically rigorous treatment of these two topics. The text’s three chapters cover social choice, yes-no voting, and apportionment, respectively, and can be covered in any order, allowing teachers ample flexibility. Each chapter begins with an elementary introduction and several examples to motivate the concepts and to gradually lead to more advanced material. Landmark theorems are presented with detailed and streamlined proofs; those requiring more complex proofs, such as Arrow’s theorems on dictatorship, Gibbard’s theorem on oligarchy, and Gärdenfors’ theorem on manipulation, are broken down into propositions and lemmas in order to make them easier to grasp. Simple and intuitive notations are emphasized over non-standard, overly complicated symbols. Additionally, each chapter ends with exercises that vary from computational to “prove or disprove” types. The Mathematics of Voting and Apportionment will be particularly well-suited for a course in the mathematics of voting and apportionment for upper-level undergraduate and beginning graduate students in economics, political science, or philosophy, or for an elective course for math majors. In addition, this book will be a suitable read for to any curious mathematician looking for an exposition to these unpublicized mathematical applications. No political science prerequisites are needed. Mathematical prerequisites (included in the book) are minimal: elementary concepts in combinatorics, graph theory, order relations, and the harmonic and geometric means. What is needed most is the level of maturity that enables the student to think logically, derive results from axioms and hypotheses, and intuitively grasp logical notions such as “contrapositive” and “counterexample.”.
List(s) this item appears in: 2024-02-07
Item type Current location Call number Status Date due Barcode Item holds
Book Chennai Mathematical Institute
General Stacks
515.223 EL (Browse shelf) Available 11142
Total holds: 0
Browsing Chennai Mathematical Institute Shelves , Shelving location: General Stacks Close shelf browser
 515.1 JOR Analysis and probability, GTM 234 wavelets, signals, fractals / 515.1 LI Geometric analysis / 515.22 BOR Representations of the infinite symmetric group / 515.223 EL The mathematics of voting and apportionment : an introduction / 515.223 FOR Lectures on Riemann surfaces / 515.234 ERD Asymptotic expansions. 515.24 KOR Tauberian theory : a century of developments /

Chapter 1: Social Choice -- Introduction -- Elimination Procedures -- Condorcet Ideas and Related Procedures -- Scoring Procedures: Borda Count -- A Glimpse into Social Welfare Theory -- Social Choice Procedures: Indifference and Ties Allowed -- Manipulability of Social Choice Procedures: Indifference and Ties Allowed -- Exercises -- Chapter 2: Yes-No Voting -- Introduction -- Quantification of Power in a Yes-No Voting System -- Some Combinatorics -- Banzhaf and Shapley-Shubik Indices in One View -- Weightable Yes-No Voting Systems -- Exercises -- Chapter 3: Apportionment -- Introduction -- Axioms of Apportionment -- Quota Procedures -- Divisor Procedures -- Equity Criteria -- Apportionment Paradoxes -- Applications of Priority Formulas -- Exercises.

a| This textbook contains a rigorous exposition of the mathematical foundations of two of the most important topics in politics and economics: voting and apportionment, at the level of upper undergraduate and beginning graduate students. It stands out among comparable books by providing, in one volume, an extensive and mathematically rigorous treatment of these two topics. The text’s three chapters cover social choice, yes-no voting, and apportionment, respectively, and can be covered in any order, allowing teachers ample flexibility. Each chapter begins with an elementary introduction and several examples to motivate the concepts and to gradually lead to more advanced material. Landmark theorems are presented with detailed and streamlined proofs; those requiring more complex proofs, such as Arrow’s theorems on dictatorship, Gibbard’s theorem on oligarchy, and Gärdenfors’ theorem on manipulation, are broken down into propositions and lemmas in order to make them easier to grasp. Simple and intuitive notations are emphasized over non-standard, overly complicated symbols. Additionally, each chapter ends with exercises that vary from computational to “prove or disprove” types. The Mathematics of Voting and Apportionment will be particularly well-suited for a course in the mathematics of voting and apportionment for upper-level undergraduate and beginning graduate students in economics, political science, or philosophy, or for an elective course for math majors. In addition, this book will be a suitable read for to any curious mathematician looking for an exposition to these unpublicized mathematical applications. No political science prerequisites are needed. Mathematical prerequisites (included in the book) are minimal: elementary concepts in combinatorics, graph theory, order relations, and the harmonic and geometric means. What is needed most is the level of maturity that enables the student to think logically, derive results from axioms and hypotheses, and intuitively grasp logical notions such as “contrapositive” and “counterexample.”.