Satisfaction Approval Voting

We propose a new voting system, satisfaction approval voting (SAV), for multiwinner elections, in which voters can approve of as many candidates or as many parties as they like. However, the winners are not those who receive the most votes, as under approval voting (AV), but those who maximize the sum of the satisfaction scores of all voters, where a voter’s satisfaction score is the fraction of his or her approved candidates who are elected. SAV may give a different outcome from A--in fact, SAV and AV outcomes may be disjoint—but SAV generally chooses candidates representing more diverse interests than does AV (this is demonstrated empirically in the case of a recent election of the Game Theory Society). A decision-theoretic analysis shows that all strategies except approving of a least-preferred candidate are undominated, so voters will often find it optimal to approve of more than one candidate. In party-list systems, SAV apportions seats to parties according to the Jefferson/d’Hondt method with a quota constraint, which favors large parties and gives an incentive to smaller parties to coordinate their policies and forge alliances, even before an election, that reflect their supporters’ coalitional preferences.

[1]  Steven J. Brams,et al.  A minimax procedure for electing committees , 2007 .

[2]  Jorge Alcalde-Unzu,et al.  Size approval voting , 2009, J. Econ. Theory.

[3]  A. Slinko,et al.  Proportional Representation and Strategic Voters , 2009 .

[4]  D. Felsenthal,et al.  Electoral systems : paradoxes, assumptions, and procedures , 2012 .

[5]  D. Marc Kilgour,et al.  Approval Balloting for Multi-winner Elections , 2010 .

[6]  H. Peyton Young,et al.  Fair Representation: Meeting the Ideal of One Man, One Vote , 1982 .

[7]  Michel Regenwetter,et al.  Sophisticated approval voting, ignorance priors, and plurality heuristics: a behavioral social choice analysis in a Thurstonian framework. , 2007, Psychological review.

[8]  Steven J. Brams,et al.  Mathematics and democracy: Designing better voting and fair-division procedures , 2008, Math. Comput. Model..

[9]  Douglas Muzzio,et al.  APPROVAL VOTING , 1983 .

[10]  Michel Balinski,et al.  Stability, Coalitions and Schisms in Proportional Representation Systems , 1978, American Political Science Review.

[11]  Michael Maschler,et al.  Voting for Voters: A Model of Electoral Evolution , 2001, Games Econ. Behav..

[12]  Richard M. Karp,et al.  Reducibility Among Combinatorial Problems , 1972, 50 Years of Integer Programming.

[13]  Miguel A. Ballester,et al.  On the Justice of Decision Rules , 2011 .

[14]  Ariel D. Procaccia,et al.  On the complexity of achieving proportional representation , 2008, Soc. Choice Welf..

[15]  Jonathan W. Still A Class of New Methods for Congressional Apportionment , 1979 .

[16]  Samuel Merrill,et al.  The Effect of Approval Balloting on Strategic Voting under Alternative Decision Rules , 1987, American Political Science Review.

[17]  D. Marc Kilgour,et al.  Approval Balloting for Fixed-Size Committees , 2012 .