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computational complexity

, Volume 7, Issue 2, pp 109–127 | Cite as

Some bounds on multiparty communication complexity of pointer jumping

  • C. Damm
  • S. Jukna
  • J. Sgall

Abstract.

We introduce the model of conservative one-way multiparty complexity and prove lower and upper bounds on the complexity of pointer jumping.¶ The pointer jumping function takes as its input a directed layered graph with a starting node and k layers of n nodes, and a single edge from each node to one node from the next layer. The output is the node reached by following k edges from the starting node. In a conservative protocol, the ith player can see only the node reached by following the first i–1 edges and the edges on the jth layer for each j > i. This is a restriction of the general model where the ith player sees edges of all layers except for the ith one. In a one-way protocol, each player communicates only once in a prescribed order: first Player 1 writes a message on the blackboard, then Player 2, etc., until the last player gives the answer. The cost is the total number of bits written on the blackboard.¶Our main results are the following bounds on k-party conservative one-way communication complexity of pointer jumping with k layers:¶ (1) A lower bound of order \(\Omega(n/k^2)\) for any \(k = O(n^{1/3-\varepsilon})\).¶(2) Matching upper and lower bounds of order \(\Theta(n\,{\rm log}^{(k-1)}n)\) for \(k\,{\rm\le\,log^\ast}\,n\).

Key words. Multiparty communication complexity; one-way protocols; pointer jumping. 

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Copyright information

© Birkhäuser Verlag, Basel, 1998

Authors and Affiliations

  • C. Damm
    • 1
  • S. Jukna
    • 2
  • J. Sgall
    • 3
  1. 1.Fachbereich IV – Informatik, Universität Trier, D-54286 Trier, damm@uni-trier.deDE
  2. 2.Institute of Mathematics, Akademijos 4, 2600 Vilnius, Lithuania LT
  3. 3.Mathematical Institute, AV ČR, Žitná 25, 115 67 Praha 1, Czech Republic, sgallj@beba.cesnet.czCS

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