Daniel Cates on Game Theory Optimal Poker Play
Daniel Cates on Game Theory Optimal Poker Play
This paper will focus on exploitative strategies and game theory optimal play in heads-up poker based on examples of game scenarios from Keywords: Discrete
Daniel Cates on Game Theory Optimal Poker Play What is GTO poker? Game Theory Optimal, or GTO poker for short, refers to a perfectly balanced poker strategy that can't be exploited If a
This paper will focus on exploitative strategies and game theory optimal play in heads-up poker based on examples of game scenarios from Keywords: Discrete
poker card terms Bluffing in poker is examined as a problem in game theory A very common situa- tion occurs where the 'kitty'contains K, player B has the apparent high hand
If you are playing poker to make money , then being in a situation where you need to play GTO is a sign that you
poker playable hands chart Game Theory Optimal represents the highest strategic play in the realm of poker, especially in the competitive environment of online
Game theory is a study of mathematical models of strategic interaction conceived by mathematician John Nash Its application has shaped the
Materials
Materials
Crafted from Italian cow leather, and suede. Comes with switchable straps, can be used as top handle bag or shoulder bag. Ultrasuede® interior.
Shipping & Returns
Shipping & Returns
Free shipping and returns available on all
orders!
We ship all US domestic orders
within 5-10 business days!
Dimensions
Dimensions
h:14 X w:19 cm (5 1/2 X 7 1/2 in)
Care Instructions
Care Instructions
Share
Daniel Cates on Game Theory Optimal Poker Play
In 1921, Emile Borel, a French mathematician, published several papers on the theory of games He used poker as an example and addressed the problem of
-
Free Shipping
We offer free worldwide express shipping on all orders. You'll receive your order an estimated 1–4 days after shipment.
-
Hassle-Free Exchanges
Exchanges are free. Try from the comfort of your home. We will collect from your home, work or an alternative address.