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Chaotic Elections! A Mathematician Looks at Voting
 
Donald G. Saari University of California, Irvine, Irvine, CA
Chaotic Elections! A Mathematician Looks at Voting
Softcover ISBN:  978-0-8218-2847-2
Product Code:  ELECT
List Price: $39.00
MAA Member Price: $35.10
AMS Member Price: $31.20
eBook ISBN:  978-1-4704-2487-9
Product Code:  ELECT.E
List Price: $30.00
MAA Member Price: $27.00
AMS Member Price: $24.00
Softcover ISBN:  978-0-8218-2847-2
eBook: ISBN:  978-1-4704-2487-9
Product Code:  ELECT.B
List Price: $69.00 $54.00
MAA Member Price: $62.10 $48.60
AMS Member Price: $55.20 $43.20
Chaotic Elections! A Mathematician Looks at Voting
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Chaotic Elections! A Mathematician Looks at Voting
Donald G. Saari University of California, Irvine, Irvine, CA
Softcover ISBN:  978-0-8218-2847-2
Product Code:  ELECT
List Price: $39.00
MAA Member Price: $35.10
AMS Member Price: $31.20
eBook ISBN:  978-1-4704-2487-9
Product Code:  ELECT.E
List Price: $30.00
MAA Member Price: $27.00
AMS Member Price: $24.00
Softcover ISBN:  978-0-8218-2847-2
eBook ISBN:  978-1-4704-2487-9
Product Code:  ELECT.B
List Price: $69.00 $54.00
MAA Member Price: $62.10 $48.60
AMS Member Price: $55.20 $43.20
  • Book Details
     
     
    2001; 159 pp
    MSC: Primary 91; 00

    What does the 2000 U.S. presidential election have in common with selecting a textbook for a calculus course in your department? Was Ralph Nader's influence on the election of George W. Bush greater than the now-famous chads? In Chaotic Elections!, Don Saari analyzes these questions, placing them in the larger context of voting systems in general. His analysis shows that the fundamental problems with the 2000 presidential election are not with the courts, recounts, or defective ballots, but are caused by the very way Americans vote for president.

    This expository book shows how mathematics can help to identify and characterize a disturbingly large number of paradoxical situations that result from the choice of a voting procedure. Moreover, rather than being able to dismiss them as anomalies, the likelihood of a dubious election result is surprisingly large. These consequences indicate that election outcomes—whether for president, the site of the next Olympics, the chair of a university department, or a prize winner—can differ from what the voters really wanted. They show that by using an inadequate voting procedure, we can, inadvertently, choose badly. To add to the difficulties, it turns out that the mathematical structures of voting admit several strategic opportunities, which are described.

    Finally, mathematics also helps identify positive results: By using mathematical symmetries, we can identify what the phrase “what the voters really want” might mean and obtain a unique voting method that satisfies these conditions.

    Saari's book should be required reading for anyone who wants to understand not only what happened in the presidential election of 2000, but also how we can avoid similar problems from appearing anytime any group is making a choice using a voting procedure. Reading this book requires little more than high school mathematics and an interest in how the apparently simple situation of voting can lead to surprising paradoxes.

    Readership

    Students, general mathematical audience, political scientists, economists, physical scientists, engineers interested in decision theory.

  • Table of Contents
     
     
    • Cover
    • Title
    • Copyright
    • Contents
    • Preface
    • Chapter 1. A Mess of an Election
    • §1. Electoral College
    • §2. Other procedures
    • Chapter 2. Voter Preferences, or the Procedure?
    • §1. Some examples
    • §2. Representation triangle and profiles
    • §3. Procedure lines and elections
    • §4. Approval or Cumulative voting?
    • §5. More candidates — toward Lincoln's election
    • Chapter 3. Chaotic Election Outcomes
    • §1. Deanna had to withdraw
    • §2. General results
    • §3. Consequences
    • §4. Chaotic notions for chaotic results
    • Chapter 4. How to Be Strategic
    • §1. Choice of a procedure
    • §2. Strategic voting
    • §3. Debate and selecting amendments
    • §4. Any relief?
    • §5. Changing the outcome
    • Chapter 5. What Do the Voters Want?
    • §1. Breaking ties and cycles
    • §2. Reversal effects
    • §3. A profile coordinate system
    • Chapter 6. Other Procedures; Other Assumptions
    • §1. Beyond voting; other aggregation methods
    • §2. Apportioning congressional seats on a torus
    • §3. Other procedures, and other assumptions
    • §4. Concluding comment
    • Bibliography
    • Index
    • A
    • B
    • C
    • D
    • E
    • F
    • G
    • H
    • I
    • J
    • K
    • L
    • M
    • N
    • O
    • P
    • R
    • S
    • T
    • U
    • V
    • W
    • Y
    • Back Cover
  • Additional Material
     
     
  • Reviews
     
     
    • Take a look at this interesting book. It will cause you to reexamine ranking and voting methods that you may have come to rely on.

      Math Horizons
    • The book presents a very clear picture of how the author views the central issues of voting theory and provides an excellent entrée into his work.

      Zentralblatt MATH
    • This exceedingly timely and lively book is a mostly non-technical, highly personalized account of author Don Saari's views on and contributions to voting theory and practice. It has perhaps as many surprises and subplots as the extraordinary 2000 United States presidential election ... Some of the surprises are mathematical ones, such as the robustness of the various paradoxes that pervade voting theory. The relevance of chaotic dynamics to these matters is intriguing and gives the book title a delightful double meaning ... written with flair and imagination, making it entertaining and interesting to read ... Saari has written an original, topical, and enjoyable book combining thoughtful social commentary with interesting and accessible mathematics. Read it and read it soon so that you can expand your mathematical horizons, upgrade your civic awareness, and sparkle at social events.

      MAA Online
  • Requests
     
     
    Review Copy – for publishers of book reviews
    Permission – for use of book, eBook, or Journal content
    Accessibility – to request an alternate format of an AMS title
2001; 159 pp
MSC: Primary 91; 00

What does the 2000 U.S. presidential election have in common with selecting a textbook for a calculus course in your department? Was Ralph Nader's influence on the election of George W. Bush greater than the now-famous chads? In Chaotic Elections!, Don Saari analyzes these questions, placing them in the larger context of voting systems in general. His analysis shows that the fundamental problems with the 2000 presidential election are not with the courts, recounts, or defective ballots, but are caused by the very way Americans vote for president.

This expository book shows how mathematics can help to identify and characterize a disturbingly large number of paradoxical situations that result from the choice of a voting procedure. Moreover, rather than being able to dismiss them as anomalies, the likelihood of a dubious election result is surprisingly large. These consequences indicate that election outcomes—whether for president, the site of the next Olympics, the chair of a university department, or a prize winner—can differ from what the voters really wanted. They show that by using an inadequate voting procedure, we can, inadvertently, choose badly. To add to the difficulties, it turns out that the mathematical structures of voting admit several strategic opportunities, which are described.

Finally, mathematics also helps identify positive results: By using mathematical symmetries, we can identify what the phrase “what the voters really want” might mean and obtain a unique voting method that satisfies these conditions.

Saari's book should be required reading for anyone who wants to understand not only what happened in the presidential election of 2000, but also how we can avoid similar problems from appearing anytime any group is making a choice using a voting procedure. Reading this book requires little more than high school mathematics and an interest in how the apparently simple situation of voting can lead to surprising paradoxes.

Readership

Students, general mathematical audience, political scientists, economists, physical scientists, engineers interested in decision theory.

  • Cover
  • Title
  • Copyright
  • Contents
  • Preface
  • Chapter 1. A Mess of an Election
  • §1. Electoral College
  • §2. Other procedures
  • Chapter 2. Voter Preferences, or the Procedure?
  • §1. Some examples
  • §2. Representation triangle and profiles
  • §3. Procedure lines and elections
  • §4. Approval or Cumulative voting?
  • §5. More candidates — toward Lincoln's election
  • Chapter 3. Chaotic Election Outcomes
  • §1. Deanna had to withdraw
  • §2. General results
  • §3. Consequences
  • §4. Chaotic notions for chaotic results
  • Chapter 4. How to Be Strategic
  • §1. Choice of a procedure
  • §2. Strategic voting
  • §3. Debate and selecting amendments
  • §4. Any relief?
  • §5. Changing the outcome
  • Chapter 5. What Do the Voters Want?
  • §1. Breaking ties and cycles
  • §2. Reversal effects
  • §3. A profile coordinate system
  • Chapter 6. Other Procedures; Other Assumptions
  • §1. Beyond voting; other aggregation methods
  • §2. Apportioning congressional seats on a torus
  • §3. Other procedures, and other assumptions
  • §4. Concluding comment
  • Bibliography
  • Index
  • A
  • B
  • C
  • D
  • E
  • F
  • G
  • H
  • I
  • J
  • K
  • L
  • M
  • N
  • O
  • P
  • R
  • S
  • T
  • U
  • V
  • W
  • Y
  • Back Cover
  • Take a look at this interesting book. It will cause you to reexamine ranking and voting methods that you may have come to rely on.

    Math Horizons
  • The book presents a very clear picture of how the author views the central issues of voting theory and provides an excellent entrée into his work.

    Zentralblatt MATH
  • This exceedingly timely and lively book is a mostly non-technical, highly personalized account of author Don Saari's views on and contributions to voting theory and practice. It has perhaps as many surprises and subplots as the extraordinary 2000 United States presidential election ... Some of the surprises are mathematical ones, such as the robustness of the various paradoxes that pervade voting theory. The relevance of chaotic dynamics to these matters is intriguing and gives the book title a delightful double meaning ... written with flair and imagination, making it entertaining and interesting to read ... Saari has written an original, topical, and enjoyable book combining thoughtful social commentary with interesting and accessible mathematics. Read it and read it soon so that you can expand your mathematical horizons, upgrade your civic awareness, and sparkle at social events.

    MAA Online
Review Copy – for publishers of book reviews
Permission – for use of book, eBook, or Journal content
Accessibility – to request an alternate format of an AMS title
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