Anybody out there thinks that there exists a frequency of nuts above which no nash equilibrium co-ordinates can exist in EV space? If yes what is it? If no, why?
:conf used:
After 16 hours of solving differential equations and optimizing, applying limits and throwing in polynomials (just kidding), i can say that such special frequency exists (for 2 last streets Turn & river so far)
Anybody out there thinks that there exists a frequency of nuts above which no nash equilibrium co-ordinates can exist in EV space? If yes what is it? If no, why?
:conf used:
There is a point were the indifference breaks but this is still a nash equilibrium. It's bet 100% for player A and call with nuts and fold everything else for player b