Maskin monotonicity

Maskin monotonicity is a desired property of voting systems, suggested by Eric Maskin.^[1]

Each voter reports his entire preference relation over the set of alternatives. The set of reports is called a preference profile. A social choice rule maps the preference profile to the selected alternative.

For a preference profile ${\displaystyle P_{1}}$ with a chosen alternative ${\displaystyle A_{1}}$, there is another preference profile ${\displaystyle P_{2}}$ such that the position of ${\displaystyle A_{1}}$ relative to each of the other alternatives either improves or stays the same as in ${\displaystyle P_{1}}$. With Maskin monotonicity, ${\displaystyle A_{1}}$ should still be chosen at ${\displaystyle P_{2}}$.^[2]

Maskin monotonicity is a necessary condition for implementability in Nash equilibrium. Moreover, any social choice rule that satisfies Maskin monotonicity and another property called "no veto power" can be implemented in Nash equilibrium form if there are three or more voters.^[1]

See also

• Monotonicity (mechanism design)
• The monotonicity criterion in voting systems

References