Abstract. We consider the proportional allocation mechanism first studied by Kelly (1997) in the context of congestion control algorithms for communication networks. A single infinitely divisible resource is to be allocated efficiently to competing players whose individual utility func-tions are unknown to the resource manager. If players anticipate the ef-fect of their bids on the price of the resource and their utility functions are concave, strictly increasing and continuously differentiable, Johari and Tsitsiklis (2004) proved that the price of anarchy is 4/3. The question was raised whether there is a relationship between this result and that of Roughgarden and Tardos (2002), who had earlier shown exactly the same bound for nonatomic s...
This work studies the price of anarchy and the price of stability of cost-sharing methods in weighte...
International audienceThis paper examines the behavior of the price of anarchy as a function of the ...
This paper provides new bounds on the quality of equilibria in finite congestion games with affine c...
We present a short, geometric proof for the price-of-anarchy results that have recently been establi...
Affine congestion games are a well-studied model for selfish behavior in distributed systems, such a...
We study the design of price mechanisms for communication network problems in which a user's utility...
A prelimiary version of this paper titled Efficiency and Stability of Nash Equilibria in Resource Al...
Abstract. We study the efficiency of equilibria in atomic splittable congestion games on networks. W...
This paper examines the behavior of the price of anarchy as a function of the traffic inflow in nona...
Network routing games, and more generally congestion games play a central role in algorithmic game t...
AbstractWe derive several bounds for the price of anarchy of the noncooperative congestion games wit...
According to the proportional allocation mechanism from the network optimization literature, users c...
Abstract. We study computational and coordination efficiency issues of Nash equilibria in symmetric ...
We consider a resource allocation problem where individual users wish to send data across a network...
This work studies the price of anarchy and the price of stability of cost-sharing methods in weighte...
International audienceThis paper examines the behavior of the price of anarchy as a function of the ...
This paper provides new bounds on the quality of equilibria in finite congestion games with affine c...
We present a short, geometric proof for the price-of-anarchy results that have recently been establi...
Affine congestion games are a well-studied model for selfish behavior in distributed systems, such a...
We study the design of price mechanisms for communication network problems in which a user's utility...
A prelimiary version of this paper titled Efficiency and Stability of Nash Equilibria in Resource Al...
Abstract. We study the efficiency of equilibria in atomic splittable congestion games on networks. W...
This paper examines the behavior of the price of anarchy as a function of the traffic inflow in nona...
Network routing games, and more generally congestion games play a central role in algorithmic game t...
AbstractWe derive several bounds for the price of anarchy of the noncooperative congestion games wit...
According to the proportional allocation mechanism from the network optimization literature, users c...
Abstract. We study computational and coordination efficiency issues of Nash equilibria in symmetric ...
We consider a resource allocation problem where individual users wish to send data across a network...
This work studies the price of anarchy and the price of stability of cost-sharing methods in weighte...
International audienceThis paper examines the behavior of the price of anarchy as a function of the ...
This paper provides new bounds on the quality of equilibria in finite congestion games with affine c...