We associate with a general (0, 1)-matrixM an ordered setP(M) and derive lower and upper bounds for the deterministic communication complexity ofM in terms of the order dimension ofP(M). We furthermore consider the special class of communication matricesM obtained as cliques vs. stable sets incidence matrices of comparability graphsG. We bound their complexity byO((logd)·(logn)), wheren is the number of nodes ofG andd is the order dimension of an orientation ofG. In this special case, our bound is shown to improve other well-known bounds obtained for the general cliques vs. stable set problem
AbstractThe notion of communication complexity seeks to capture the amount of communication between ...
AbstractThe communcation complexity of functions defined in lattices is bounded from above and below...
We prove that several measures in communication complexity are equivalent, up to polynomial factors ...
We associate with a general (0, 1)-matrixM an ordered setP(M) and derive lower and upper bounds for ...
AbstractIn a recent paper, Hajnal, Maass, and Turán analyzed the communication complexity of graph c...
AbstractThe rank of a matrix seems to play a role in the context of communication complexity, a fram...
We show that deterministic communication complexity can be super logarithmic in the partition number...
We show that deterministic communication complexity can be superlogarithmic in the partition number ...
We consider the following game: Two players independently choose a chain in a partially ordered set....
Identifying complexity measures that bound the communication complexity of a {0,1}-valued matrix M i...
The goal of this thesis is to prove lower bounds in communication complexity by exploiting new conne...
AbstractIn this paper we consider communication complexity introduced by Papadimitriou and Sipser (1...
This paper concerns the open problem of Lov'asz and Saks regarding the relationship between th...
This lecture builds on the material from our first lecture, providing more tools for studying commun...
The communication complexity of lattice operations in linearly ordered sets is studied. If the latti...
AbstractThe notion of communication complexity seeks to capture the amount of communication between ...
AbstractThe communcation complexity of functions defined in lattices is bounded from above and below...
We prove that several measures in communication complexity are equivalent, up to polynomial factors ...
We associate with a general (0, 1)-matrixM an ordered setP(M) and derive lower and upper bounds for ...
AbstractIn a recent paper, Hajnal, Maass, and Turán analyzed the communication complexity of graph c...
AbstractThe rank of a matrix seems to play a role in the context of communication complexity, a fram...
We show that deterministic communication complexity can be super logarithmic in the partition number...
We show that deterministic communication complexity can be superlogarithmic in the partition number ...
We consider the following game: Two players independently choose a chain in a partially ordered set....
Identifying complexity measures that bound the communication complexity of a {0,1}-valued matrix M i...
The goal of this thesis is to prove lower bounds in communication complexity by exploiting new conne...
AbstractIn this paper we consider communication complexity introduced by Papadimitriou and Sipser (1...
This paper concerns the open problem of Lov'asz and Saks regarding the relationship between th...
This lecture builds on the material from our first lecture, providing more tools for studying commun...
The communication complexity of lattice operations in linearly ordered sets is studied. If the latti...
AbstractThe notion of communication complexity seeks to capture the amount of communication between ...
AbstractThe communcation complexity of functions defined in lattices is bounded from above and below...
We prove that several measures in communication complexity are equivalent, up to polynomial factors ...