Cooperative Games on Combinatorial Structures Basic Concepts

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Cooperative Games on Combinatorial Structures Basic Concepts

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Title: Cooperative Games on Combinatorial Structures Basic Concepts

1
Cooperative Games on Combinatorial
Structures----Basic Concepts Several Examples
in OR
2
Outline of this lecture

1. Basic Concepts
2. Examples in OR
3. Problems Methodology
4. Some of my own ideas

3
Basic Concepts(1/9)

Def. 1 cooperative games vs. noncooperative games

4
1. Basic Concepts(2/9)

Def. 2 Transferable utility game
Players elements of N1,2,, n
Coalitions subsets of N
Worth the value of S, v(S), is called the worth
of S
Characteristic function V
Profit games cost games

5
1. Basic Concepts(3/9)

Subgame
Efficient
Pre-imputation set
Imputation set
Polyhedron associated to a game

6
1. Basic Concepts(4/9)

Def. 3 core
Balanced games
Totally balanced games
Dual game
Pro. 1 (N,v) is a profit game and (N,v) is a
cost game, then

7
1. Basic Concepts(5/9)

Excess of S at x e(S,x)v(S)-x(S)
Stronge-core
Least core

8
1. Basic Concepts(6/9)

Multiplicative core
Def. 4 The nucleolus of Y is the set of
pre-imputations in Y that minimize T in the
lexicographic ordering

9
1. Basic Concepts(7/9)

Shapley value
Banzhaf value

10
1. Basic Concepts(8/9)

Unanimity game
Every game is a unique linear combination of
unanimity games

11
1. Basic Concepts(9/9)

Tijs value
Upper value
Utopia payoff
Lower value
Def. 5 quasi-balanced
(QB1)
(QB2)

12
2. Examples

1. Assignment and matching games (Shapley and
Shubik,1972)
2. Min-cost spanning tree games (Granot and
Huberman,1981)

13
2. Examples

3. Linear production games (Owen,1975)
4. Tax games (Tijs and Driessen,1986)

14
2. Examples

5. Bin packing games (Faigle and Kern, 1993)
6. Simple flow games (Kalai and
Zemel, 1982 Reijnierse,Maschler,Potters and
Tijs,1996)
7. Permutation games
(Tijs, Parthasarathy,Potters and Prasad,1984)

15
2. Examples

8. Travelling salesman games (Potters, Curiel and
Tijs, 1992)
9. Delivery games (Hamers, 1995)
10. Sequencing games (Curiel,Pederzoli and
Tijs,1989)
11. Restricted games (Myerson, 1977 Owen, 1986)

16
2. Examples
17
3. Problems Methodology

Problems
1. Is a cooperative game balanced\totally
balanced?
1.1 cooperative games determined by combinatorial
optimization problems
1.2 restricted games
2. How to allocate the profit among the grand
coalition?
2.1 axiomatic approach efficiency, linearity,
dummy axiom, chain axiom
2.2 computing of Shapley values
3. Complexity analysis
3.1 testing nonemptiness
3.2 checking membership
3.3 finding a core member

18
3. Problems Methodology

Methodology
1. to characterize the structure
Graph theory
Algebra poset, lattice, closure space, convex
geometry, matroid, greedoid, antimatroid,
partition system, unionstable system

19
3. Problems Methodology

2. to characterize and analyze v
Optimization theory dual theory, integer and
combinatorial optimization
Discrete convex analysis supermodular functions,
subdifferentials, indirect functions, least
increment functions
Basic ideas (relaxing, transforming, extending)
Bicooperative games, Fenchel conjugation, Lovasz
extension
3. to analyze the complexity
Computational complexity theory

20
4. Some of my own ideas

1. A more realistic definition of v
We call a situation, the worth of a
coalition is situation depended.
More realistic (at least in certain situations)
It embodies more of the essence of game theory.

21
4. Some of my own ideas

2. Equilibrium problems
balancedness a kind of Nash Equilibrium
Allocation rule before equilibrium
Under this assumption, cooperative games can be
converted to non-cooperative ones. Every one
makes his decision to prefer a situation to
maximize his profit.

22
4. Some of my own ideas