Abstract. We prove a lower bound on the communication complexity of pointer jumping for multiparty one-way protocols in the number on the forehead model that satisfy a certain information theoretical restriction: We consider protocols for which the ith player may only reveal information about the first i + 1 inputs. To this end we extend the information complexity approach of Chakrabarti, Shi, Wirth, and Yao (2001) and Bar-Yossef, Jayram, Kumar, and Sivakumar (2004) to our restricted version of the multiparty number on the forehead model. The best currently known multiparty protocol for pointer jumping by Damm, Jukna, and Sgall (1998) works in this model
Information-theoretic methods are a powerful tool in communication complexity, providing, in particu...
We study the k-round two-party communication complexity of the pointer chasing problem for fixed k. ...
AbstractWe derive a general technique for obtaining lower bounds on the multiparty communication com...
We introduce the model of conservative one-way multiparty complexity and prove lower and upper bound...
We study the one-way number-on-the-forehead (NOF) communication complexity of the k-layer pointer ju...
. We introduce the model of conservative one-way multiparty complexity and prove lower and upper bou...
We consider the multiparty communication complexity of the pointer jumping function Jump_k"n. O...
We study the one-way number-on-the-forehead (NOF) communication complexity of the $k$-layer point...
Communication complexity is an area of complexity theory that studies an abstract model of computati...
We prove an n Ω(1) /2 O(k) lower bound on the randomized k-party communication complexity of read-on...
Communication Complexity represents one of the premier techniques for proving lower bounds in theore...
Abstract — We prove an nΩ(1)/4k lower bound on the random-ized k-party communication complexity of d...
We initiate a study of a relaxed version of the standard Erdős-Rényi random graph model, where each ...
We study the multiparty communication complexity of high dimensional permutations in the Number On t...
AbstractWe study the k-round two-party communication complexity of the pointer chasing problem for f...
Information-theoretic methods are a powerful tool in communication complexity, providing, in particu...
We study the k-round two-party communication complexity of the pointer chasing problem for fixed k. ...
AbstractWe derive a general technique for obtaining lower bounds on the multiparty communication com...
We introduce the model of conservative one-way multiparty complexity and prove lower and upper bound...
We study the one-way number-on-the-forehead (NOF) communication complexity of the k-layer pointer ju...
. We introduce the model of conservative one-way multiparty complexity and prove lower and upper bou...
We consider the multiparty communication complexity of the pointer jumping function Jump_k"n. O...
We study the one-way number-on-the-forehead (NOF) communication complexity of the $k$-layer point...
Communication complexity is an area of complexity theory that studies an abstract model of computati...
We prove an n Ω(1) /2 O(k) lower bound on the randomized k-party communication complexity of read-on...
Communication Complexity represents one of the premier techniques for proving lower bounds in theore...
Abstract — We prove an nΩ(1)/4k lower bound on the random-ized k-party communication complexity of d...
We initiate a study of a relaxed version of the standard Erdős-Rényi random graph model, where each ...
We study the multiparty communication complexity of high dimensional permutations in the Number On t...
AbstractWe study the k-round two-party communication complexity of the pointer chasing problem for f...
Information-theoretic methods are a powerful tool in communication complexity, providing, in particu...
We study the k-round two-party communication complexity of the pointer chasing problem for fixed k. ...
AbstractWe derive a general technique for obtaining lower bounds on the multiparty communication com...