|
| |
| Uuganbaatar Ninjbat |
| |
| ''Symmetry vs. complexity in proving the Muller-Satterthwaite theorem'' |
| ( 2012, Vol. 32 No.2 ) |
| |
| |
| In this short note, we first provide two rather straightforward proofs for the Muller - Satterthwaite theorem in the baseline cases of 2 person 3 alternatives, and 2 person n� ≥ 3 alternatives. We also show that it suffices to prove the result in the special case of 3 alternatives (with arbitrary N individuals) as it then can easily be extended to the general case. We then prove the result in the decisive case of 3 alternatives (with arbitrary N individuals) by induction on N. |
| |
| |
| Keywords: the Muller-Satterthwaite Theorem, Monotone social choice functions |
JEL: D7 - Analysis of Collective Decision-Making: General
|
| |
| Manuscript Received : Nov 10 2011 | | Manuscript Accepted : May 14 2012 |
|
