The study of competitive and non-competitive games, equilibrium concepts such as Nash equilibrium, and related subjects. Combinatorial games such as Nim are under (combinatorial-game-theory), and algorithmic aspects (e.g. auctions) are under (algorithmic-game-theory).

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11 views

Game theory:Baye's rule for tournament [on hold]

I'm having challenge with Baye's rule from the book I'm using. How are the steps obtain from the preceding step. Prob{E_i> e_j^+ E_j- e_i} = ∫_(E_j ) Prob{E_i> e_j^+ E_j- e_i ┤| E_j} f(E_j )dE_j = ...
14
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3answers
434 views

Optimal strategy for the Rope Climbing Game

Define a two-player, turn-based climbing game as follows. Each turn, players have the option to climb or tie a knot at his current position. If the player chooses to climb, there is a 50% chance ...
0
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1answer
34 views

Game Theory and Uniform Distribution question?

In an Auction , two players are bidding. Their bids will be a unknown fraction of their valuations. The valuations come from a uniform distribution $$[0,1] $$ If Player 2 bids $$ v/2 $$ and Player ...
0
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0answers
58 views

Game Theory Help

My professor posted this question and arrived with the following answer, but I am unsure how. Can someone please help me understands this? Alice and Bob play a game Simultaneously Alice picks ...
0
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2answers
21 views

Joint Game Theory?

I am confused. A Game is, generally, defined by: $\mathcal{G}=(\mathcal{P}, \mathcal{A}, \mathcal{U})$ where $\mathcal{P}$ is the set of players, $\mathcal{A}$ is the set of actions $\mathcal{U}$ is ...
1
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2answers
40 views

Probability Theory $\Rightarrow$ Game Theory?

It is a very simple question. I would like to learn Game Theory but I am not that good at Probability Theory. I would like to know it is necessary to be good at probability theory in order to learn ...
2
votes
1answer
37 views

puzzle on [13,10,3] perfect Hamming code over $\mathbb F_{3}$

The soccer betting form contains a list of 13 games. There are three possible outcomes for each game: “the first team won”, “the second team won” and “draw”. Each betting form allows to chose one ...
2
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2answers
85 views

Unbalanced game: probability of winning over an infinite number of possible match sequences

We have 2 players, A and B, competing. The probability that A wins a match is p, making the probability that B wins a match (1-p) = q. The game is won by player A as soon as he gets one more win than ...
1
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1answer
24 views

How to solve this problem? Distributed Game theory?

I have this problem: We dispose of some resources, say $\{f_1, f_2, \dotsc, f_m\}$; We have some agents or players, say $\{\mathrm{p}_1, \mathrm{p}_2, \dotsc, \mathrm{p}_n\}$; Every player has some ...
1
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2answers
67 views

How practically relevant is game theory?

I usually don't care too much about the practical relevance of nice mathematics :-) But this time, as I am looking to find some areas where I can apply maths and possibly collaborate with ...
0
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1answer
29 views

Why all games are not Potential?

A definition given in wikipedia of an exact potential game as follow: A game $G=(N,A=A_{1}\times\ldots\times A_{N}, u: A \rightarrow \mathbb{R}^N)$ is: an exact potential game if there is a ...
0
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0answers
32 views

Solving Matrix Value and Optimal Strategy (Matrix Games)

How would I solve this matrix game ? I'd like to find the value of the matrix and the optimal strategies for each player. $$ \left[ \begin{array}{cccc} 0 & 3 & -2 & 2 \\ -3 & 0 ...
1
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0answers
29 views

Game Theory - Voting

In this setup there are 4 candidates running. For a candidate to be eliminated, the candidate needs to receive less than 1/3 of the votes when paired up with another candidate. This process ...
0
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0answers
33 views

Is it possible to represent any arbitrary game as a 2 player game?

[I'm sorry that I wasn't more specific. Please bare with me I'm a curious novice and a new comer here to stack exchange.] original question: "Is it possible to represent any arbitrary game as a 2 ...
1
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0answers
36 views

Proof that 12 in a row tic-tac-toe is a tie game?

How can be it proved that tic-tac-toe on an infinite grid (winning with 12 in a row, a column or a diagonal) can always end in a tie (with optimal strategies of both players)? There is a hint: to use ...
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0answers
59 views

Multiplying the candies game

How to solve this game . At start am given with 0 candies and I gain candies at a rate of 2 candies per second. Any time if I have at least C candies, I can buy a bigger candy. Every time I buy a ...
2
votes
3answers
104 views

Precise definition of a “game of incomplete information” (Game Theory)

Question: In game theory, what is the precise definition of a "game of incomplete information"? What I've found so far: In the standard first year graduate economics textbook on microeconomics ...
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2answers
33 views

The Fundamental Theorem of Matrix Games, and the “indifference” method of solving games

In the following we will consider two-person zero-sum games. Let $A = (a_{ij})$ be the payoff-matrix of such a game. In this book the fundamental theorem of such games is states as: Theorem: Given ...
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3answers
30 views

A little question about payoff functions being continuous.

In the mixed extension of a finite game $G$, why are the payoff functions of players continuous? Does it has something to do with being von Neumann and Morgenstern utility functions? Is there other ...
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2answers
30 views

Game theory: inheritance distribution

An old man is dying and wishes to split his $2^n$-dollar fortune between his two sons. It shall be distributed this way: (1) The older brother should propose a way to split the money. If the younger ...
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0answers
13 views

Minimum number of steps to guess an item in a database

Let's say I have a database of N*N size (N rows N columns) My friend wants me to guess the location of an item. We start by binary guess, means I ask him if it is in upper half, he says yes or no, if ...
3
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1answer
42 views

Best strategy for rolling 20-sided and 10-sided dices

There are a 20-sided (face value of 1-20) dice and a 10-sided (face value of 1-10) dice. A and B respectively roll the 20 and 10-sided dices. Both of them can roll the dice twice. They may choose ...
0
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2answers
31 views

Pure vs mixed strategy Nash Equilibria

Just learning about Nash Equilibria. The pure strategy one is explained as an outcome where both/all players feel like they couldn't have done better given what the others were doing. Mixed strategy ...
0
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1answer
30 views

Overview of game theory

I have a good high school math background, and I am interested in game theory, so I wanted to know something more about it, but I found very technical things or wikipedia. I am looking for something ...
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2answers
38 views

Committee Voting Choice

Let's say you're in a group of 20 people, and each person has 3 votes for different people. They're all voting for a 5 member committee, and the 5 people who get the most votes win. Ties are resolved ...
2
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0answers
64 views

The name of a game from the 2013 Putnam

Does the following game from the 2013 Putnam have an official name? Based on my searches, it seems to have been created just for the exam. Let $n\geq 1$ be an odd integer. Alice and Bob play the ...
0
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1answer
99 views

What is the probability of a $4$ appearing in the game $2048$? [closed]

I'm not sure if this is the appropriate SE, so please suggest a more appropriate website if not. I'm making a facsimile of $2048$, and I've just one question I've been unable to work out: what is the ...
0
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0answers
19 views

n-player zero-sum rating

I am trying to make a rating system like Elo-rating for n-players in SET with rules here. In each game 1 player plays against n-1 other players. The player collects a number of SETs, $s$. Based on ...
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0answers
20 views

game theory : negotiation equilibrium

Consider the extensive form game below, which includes two joint decision nodes. The variables t, b, and r are contractual terms that can take any real number values. The variable k is the choice of ...
4
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1answer
37 views

A game problem- double or increment by 1

Its a two player game. Initially $P=1$, and there is some fixed integer $Q>1$. A valid move consists of either increasing $P$ by $1$ or doubling it iff on doing so $P$ does NOT exceed $Q$.The ...
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0answers
30 views

Game theory Zero Sum Game Proof

Zerosum games. A coailitional game with transferable payoff is zerosum if $v(S) + v(N - S) = v(N)$ for every coalition $S$; it is additive if $v(S) + v(T) = v(S \cup T)$ for all disjoint $S$ and $T$. ...
8
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2answers
183 views

A modified NIM game

Let's play a game of NIM, but with a catch! We have exactly three piles of stones with sizes $a$, $b$ and $c$, all of which are different. We move in turns. In every move, we can select a pile and ...
12
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0answers
104 views

The Right Triangle Game

I am looking for a deeper understanding, particularly the optimum strategy and the maximum score as a function of grid size, of the following (single-player) game played with an $n$ by $m$ grid: ($6 ...
1
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1answer
50 views

What is the definition of “Winning Strategy” in an Ehrenfeucht-Fraïssé game?

I've read many descriptions and applications of a Winning Strategy, as much as many for a Strategy tout court, but when a formal, algebraic definition is called upon, I've found close to no input. I ...
3
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0answers
90 views

Which mathematical game or puzzle did you invent?

A couple of weeks ago, a friend of mine showed me a extension of a game we are all familiar with that he was working on. The game we know is called Tic-Tac-Toe, and he was working on his own version ...
0
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0answers
23 views

What is the mixed strategy equilibrium of the below game?

I have trouble in finding mixed strategy equilibrium of the following game: $(9,20), (90,0)\\ (12,14), (40,13)\\ (14,0), (17,-2)$ In fact, I have found that probabilities of row player do not belong ...
0
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0answers
27 views

Solving $2 \times n$ bimatrix game

For $0$-sum games, we can solve all $2\times n$ games. For $2$-person general sum games, we can use the Swastika method to solve all $2 \times 2$ bimatrix games. How can solve all $2 \times n$ general ...
0
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0answers
27 views

Gale Shapley Algorithm with dropouts

How does Gale Shapley Algorithm work in case there is a dropout of students already assigned to schools during stable match?
3
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1answer
89 views

Game Theory - A joint project problem

I'm new to this forum and as such not sure if this is the correct place to ask for help on Game Theory. As such I am currently working out of the Introduction to Game theory book by Martin J Osborne ...
0
votes
1answer
18 views

A game of lines and points

Consider the following scenario: $\mathcal{A}$ and $\mathcal{B}$ play a game inside the unit disc $\mathcal{D}: $ $\mathcal{A}$ chooses a point $p_0\in \mathcal{D}$. At step $n, ...
1
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0answers
41 views

Dilemma at the dining table

I created this problem while I was having my supper a few days back. So there maybe flaw in the formulation. Please point them out as you see one. Suppose, there is a circular dining table with ...
1
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2answers
45 views

Existence of a winning strategy against the probability of winning

Edit: I've made the question clearer. Suppose a game is played between $A$ and $B$, in which there exists a winning strategy for $A$. Suppose $A$ and $B$ play their moves at random, do we have ...
0
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2answers
56 views

Real world application of dominating set?

can anyone tell me about the application of vertex coloring problem and algorithm for vertex color problem in graph or networks.
0
votes
1answer
29 views

What number of robbers, under the model of the prisoner's dilemma, would be optimal?

The prisoner's dilemma is defined as "Two members of a criminal gang are arrested and imprisoned. Each prisoner is in solitary confinement with no means of speaking to or exchanging messages with ...
13
votes
3answers
734 views

The Best Strategy and Highest Possible Score for the “Threes!” Game.

[There's still the strategy to go . . . ] Here's my description of the game: There's a $4\times 4$ grid with some random, numbered cards on. The numbers are either one, two, or multiples of three. ...
0
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1answer
39 views

Finding Nash Equilibria of a finte game of 2 players.

In a finite game, suppose player 1 has strategies $\{\alpha_1,\alpha_2\}$ and player 2 $\{\beta_1,\beta_2\}$ with payoffs as below. \begin{array}{c|c|c} &\beta_1&\beta_2\\ \hline\\ ...
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vote
1answer
51 views

How to 'show your work' with game theoretic notation

Everything I've read on game theory seems to describe the game in notation and solves it in natural language. How do you work with notation in game theory? Could you recommend a straight-forward ...
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0answers
49 views

Game Theory - Nash Equilibria - Payoff Dominant

The game has two Nash equilibria: a payoff dominant and a risk dominant. (a) Assume now that the game is played repeatedly, with an infinite time horizon, and applying a discount factor of δ. What ...
0
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0answers
43 views

Linear Programming with Matrix Game

It seems from an easy google of "learning linear programming" that a common way of learning it is to work with Matrices that represent "games" for two players. Here is one I have stumbled across. We ...
0
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1answer
91 views

Game Theory - trying to find game name by description

My hobby AI research have led me to a thorethical game of particular design. As design is pretty simple, I'm almost sure that such game has well-known name and tons of research already done around it. ...