The EV Project: Difference between revisions

==Purpose==

These probabilities are calculated by attempting to reduce games to basic scenarios that have already had their probabilities found.  Thus, this guide starts small and builds itself up to larger games.  Even games such as [[Basic Twelve Player]], with a breaking strategy, are tedious and time-consuming to analyze without a basis for calculations.  (Ask me how I know.)

**A smaller 6:2 version of Polygamist has an expected Town win rate of 1/2, or 50.0%.

*The [[Open Setup]] [[Lovers Mafia]] has an expected Town win rate of 3/5, or 60.0%.

*The [[Open Setup]] [[White Flag]] has an expected Town win rate of 1436/3003, or 47.8%.

**The number of additional players to make four scum work in this format is not known, but considerably higher.

==Mountainous Setups==

===3P: 2 - 1===

(1/3) 33.3% Town win<br>

(2/3) 66.7% Scum win

===5P: 4 - 1===

(4/5) 80.0% GOTO 3P: 2 - 1 (1/3 Town win)

(8/15) 53.3% Scum win

===7P: 6 - 1===

(1/7 + 6/7*7/15 = 19/35) 54.3% Town win<br>

===9P: 8 - 1===

(128/315) 40.6% Scum win

(1/11) 9.1% Town win<br>

(10/11) 90.9% GOTO 9P: 8 - 1 (187/315 Town win)

(2/13*437/693 + 11/13*244/693 = 1186/3003) 39.5% Town win<br>

(1817/3003) 60.5% Scum win

==Plus Innocent==

===3P 2 - 1===

===4P 3 - 1===

(1/3) 33.3% Town win<br>

===5P 4 - 1===

(1/4) 25.0% Town win<br>

(1/4 + 3/4*1/3 = 1/2) 50.0% Town win<br>

===6P 5 - 1===

(1/5) 20.0% Town win<br>

(1/5 + 4/5*1/3 = 7/15) 46.7% Town win<br>

===7P 6 - 1===

(1/6) 16.7% Town win<br>

(1/6 + 5/6*7/15 = 5/9) 55.6% Town win<br>

===7P 5 - 2===

(2/6*7/15 + 4/6*2/15 = 11/45) 24.4% Town win<br>

===8P 7 - 1===

(1/7) 14.3% Town win<br>

(1/7 + 6/7*7/15 = 19/35) 54.3% Town win<br>

===8P 6 - 2===

(2/7*7/15 + 5/7*2/15 = 8/35) 22.8% Town win<br>

===8P 5 - 3===

(4/7) 57.1% Scum win

===9P 8 - 1===

(1/8) 12.5% Town win<br>

(1/8 + 7/8*19/35 = 3/5) 60.0% Town win<br>

===9P 7 - 2===

(2/8*19/35 + 6/8*8/35 = 43/140) 30.7% Town win<br>

===9P 6 - 3===

(3/8*8/35 + 5/8*2/35 = 17/140) 12.1% Town win<br>

===9P 5 - 4===

(4/8) 50.0% Scum win

===10P 9 - 1===

(1/9) 11.1% Town win<br>

(1/9 + 8/9*19/35 = 187/315) 59.4% Town win<br>

===10P 8 - 2===

(2/9*19/35 + 7/9*8/35 = 94/315) 29.8% Town win<br>

===10P 7 - 3===

(3/9*8/35 + 6/9*2/35 = 4/35) 11.4% Town win<br>

===10P 6 - 4===

(5/9) 55.6% Scum win

===11P 10 - 1===

(1/10) 10.0% Town win<br>

(1/10 + 9/10*187/315 = 111/175) 63.4% Town win<br>

===11P 9 - 2===

(2/10*187/315 + 8/10*94/315 = 563/1575) 35.7% Town win<br>

===11P 8 - 3===

(3/10*94/315 + 7/10*4/35 = 89/525) 16.9% Town win<br>

===11P 7 - 4===

(4/10*4/35 + 6/10*8/315 = 32/525) 6.1% Town win<br>

==Plus 2xInnocent==

===5P 4 - 1===

(1/3) 33.3% Town win<br>

(1/3 + 2/3*1/2 = 2/3) 66.7% Town win<br>

===5P 3 - 2===

(1/3) 33.3% Scum win

===6P 5 - 1===

(1/4) 25.0% Town win<br>

(1/4 + 3/4*1/3 = 1/2) 50.0% Town win<br>

===7P 6 - 1===

(1/5) 20.0% Town win<br>

(1/5+4/5*1/2 = 3/5) 60.0% Town win<br>

===7P 5 - 2===

(2/5*1/2 + 3/5*1/6 = 3/10) 30% Town win<br>

===9P 7 - 2===

(2/7*5/9 + 5/7*11/45 = 1/3) 33.3% Town win<br>

===11P 8 - 3===

(3/9*43/140 + 6/9*17/140 = 11/60) 18.3% Town win<br>

*Premise:  Scum cannot automatically win without killing off all other members of the scum team.

*Premise:  Depending on the moderator, if only an even number of scum are alive, either both teams will win or they will draw.  Here, it is considered a draw.

===2P 0 - 1 - 1===

*Premise: This is a [[Dilemma]].  This is assumed to be a Draw.

(1/4) Town win<br>

(1/4) Scum A win<br>

===4P 1 - 2 - 1===

===4P 2 - 1 - 1 (Night)===

===5P 3 - 1 - 1===

(2*1/5*1/3 + 3/5*7/27 = 13/45) 28.9% Town win<br>

===5P 2 - 2 - 1===

(2/5*7/27 = 14/135) 10.4% Town win<br>

===5P 1 - 2 - 2===

===5P 1 - 3 - 1===

===6P 4 - 1 - 1===

(2*1/6*1/3 + 2/3*3/8 = 13/36) 36.1% Town win<br>

===6P 3 - 2 - 1===

(2/6*3/8 + 1/2*1/18 = 11/72) 15.3% Town win<br>