We initiate the study of a quantity that we call coordination complexity. In a distributed optimization problem, the information defining a problem instance is distributed among n parties, who need to each choose an action, which jointly will form a solution to the optimization problem. The coordination complexity represents the minimal amount of information that a centralized coordinator, who has full knowledge of the problem instance, needs to broadcast in order to coordinate the n parties to play a nearly optimal solution. We show that upper bounds on the coordination complexity of a problem imply the existence of good jointly differentially private algorithms for solving that problem, which in turn are known to upper bound the price ...
Many results on repeated games played by finite automata rely on the complexity of the exact impleme...
How long does it take until economic agents converge to an equilibrium? By studying the complexity o...
Complexity theory allows to classify problems by their algorithmic hardness. The classical framework...
We initiate the study of a quantity that we call coordination complexity. In a distributed optimizat...
We discuss settings where several "agents" combine efforts to solve problems. This is a we...
The problem of finding or computing Nash equilibria has been an important problem in economics and c...
Distributed systems are fundamental to today's world. Many modern problems involve multiple agents e...
This paper studies the complexity of solving the class G of all N-player non-cooperative games with ...
Title: Combinatorial Games Theory Author: Tomáš Valla Department / Institute: IUUK MFF UK Supervisor...
We define a two-player N x N game called the 2-cycle game, that has a unique pure Nash equilibrium w...
We investigate the computational complexity of several decision problems in a simple strategic game ...
Coordination problems resembling weakest-link games with multiple Pareto ranked equilibria are ubiqu...
The problem of Nash equilibrium seeking is investigated in a networked game. The game is defined as ...
International audienceWe investigate the computational complexity of several decision problems in a ...
We consider polymatrix coordination games with individual preferences where every player corresponds...
Many results on repeated games played by finite automata rely on the complexity of the exact impleme...
How long does it take until economic agents converge to an equilibrium? By studying the complexity o...
Complexity theory allows to classify problems by their algorithmic hardness. The classical framework...
We initiate the study of a quantity that we call coordination complexity. In a distributed optimizat...
We discuss settings where several "agents" combine efforts to solve problems. This is a we...
The problem of finding or computing Nash equilibria has been an important problem in economics and c...
Distributed systems are fundamental to today's world. Many modern problems involve multiple agents e...
This paper studies the complexity of solving the class G of all N-player non-cooperative games with ...
Title: Combinatorial Games Theory Author: Tomáš Valla Department / Institute: IUUK MFF UK Supervisor...
We define a two-player N x N game called the 2-cycle game, that has a unique pure Nash equilibrium w...
We investigate the computational complexity of several decision problems in a simple strategic game ...
Coordination problems resembling weakest-link games with multiple Pareto ranked equilibria are ubiqu...
The problem of Nash equilibrium seeking is investigated in a networked game. The game is defined as ...
International audienceWe investigate the computational complexity of several decision problems in a ...
We consider polymatrix coordination games with individual preferences where every player corresponds...
Many results on repeated games played by finite automata rely on the complexity of the exact impleme...
How long does it take until economic agents converge to an equilibrium? By studying the complexity o...
Complexity theory allows to classify problems by their algorithmic hardness. The classical framework...