Our website is made possible by displaying online advertisements to our visitors.
Please consider supporting us by disabling your ad blocker.

Responsive image


Expanding approvals rule

An expanding approvals rule (EAR) is a rule for multi-winner elections, which allows agents to express weak ordinal preferences (i.e., ranking with indifferences), and guarantees a form of proportional representation called proportionality for solid coalitions. The family of EAR was presented by Aziz and Lee.[1][2]

In general, the EAR algorithm works as follows. Let n denote the number of voters, and k the number of seats to be filled. Initially, each voter is given 1 unit of virtual money. Groups of voters can use their virtual money to "buy" candidates, where the "price" of each candidate is (though the divisor can be slightly different; see highest averages method). The EAR goes rank by rank, starting at rank 1 which corresponds to the top candidates of the voters, and increasing the rank in each iteration. (This is where the term "expanding approvals" comes from: as the rank increases, the number of approved candidates expands.) For each rank r:

  1. EAR checks if there is a candidate who can be afforded by all voters who rank this candidate r-th or better. If there is such a candidate, EAR selects one such candidate c (there are different variants regarding how to select this candidate), and adds c to the committee.
  2. The "price" of n/k is deducted from the balance of voters who rank c r-th or better (there are different variants regarding how exactly the price is split among them).
  1. ^ Aziz, Haris; Lee, Barton E. (2020-01-01). "The expanding approvals rule: improving proportional representation and monotonicity". Social Choice and Welfare. 54 (1): 1–45. arXiv:1708.07580. doi:10.1007/s00355-019-01208-3. ISSN 1432-217X.
  2. ^ Aziz, Haris; Lee, Barton E. (2021-05-18). "Proportionally Representative Participatory Budgeting with Ordinal Preferences". Proceedings of the AAAI Conference on Artificial Intelligence. 35 (6): 5110–5118. arXiv:1911.00864. doi:10.1609/aaai.v35i6.16646. ISSN 2374-3468.

Previous Page Next Page








Responsive image

Responsive image