FpA-fpC

fpA-fpC (for first preference A minus first preference C) is a three-candidate Condorcet method based on first preference Copeland.^[1] Its election cases are:

If there's a Condorcet winner, then that candidate wins.
If the Smith set is size two, then the winner is according to majority rule.
If the Smith set is size three, then for each candidate, assume without loss of generality that the candidate is A in an A>B>C>A cycle. A's score is A's first preferences minus C's first preferences. The candidate with the highest score wins.

This method shares the strategy resistance of Smith-IRV hybrids, such as chicken dilemma compliance and dominant mutual third burial resistance; yet, unlike them, is monotone. It is open (not obvious) how to extend the method to more than three candidates in a way that retains both monotonicity and strategy resistance.^{[fn 1]}

It produces similar results to Condorcet,IFPP.

This page is a stub - please add to it.

Notes

↑ Any generalization will preserve its chicken dilemma compliance, as that criterion is only defined on three-candidate elections. However, this is not true of dominant mutual third burial resistance.

References

↑ Munsterhjelm, K. (2016-02-07). "Strategy-resistant monotone methods". Election-methods mailing list archives.

[Footnote-2] Any generalization will preserve its chicken dilemma compliance, as that criterion is only defined on three-candidate elections. However, this is not true of dominant mutual third burial resistance.

[1] Munsterhjelm, K. (2016-02-07). "Strategy-resistant monotone methods". Election-methods mailing list archives.

[1]

[fn 1]