English

Line-Broadcasting in Complete k-Trees

Discrete Mathematics 2015-04-13 v1

Abstract

A line-broadcasting model in a connected graph G=(V,E)G=(V,E), V=n|V|=n, is a model in which one vertex, called the {\it originator} of the broadcast holds a message that has to be transmitted to all vertices of the graph through placement of a series of calls over the graph. In this model, an informed vertex can transmit a message through a path of any length in a single time unit, as long as two transmissions do not use the same edge at the same time. Farley \cite{f} has shown that the process is completed within at most log2n\lceil \log_{2}n \rceil time units from any originator in a tree (and thus in any connected undirected graph). and that the cost of broadcasting one message from any vertex is at most (n1)log2n(n-1) \lceil \log_{2}n \rceil. In this paper, we present lower and upper bounds for the cost to broadcast one message in a complete kk-tree, from any vertex using the line-broadcasting model. We prove that if B(u)B(u) is the minimum cost to broadcast in a graph G=(V,E)G=(V,E) from a vertex uVu \in V using the line-broadcasting model, then (1+o(1))nB(u)(2+o(1))n(1+o(1))n \le B(u) \le (2+o(1))n, where uu is any vertex in a complete kk-tree. Furthermore, for certain conditions, B(u)(2o(1))nB(u) \le (2-o(1))n.

Cite

@article{arxiv.1504.02491,
  title  = {Line-Broadcasting in Complete k-Trees},
  author = {Revital Hollander Shabtai and Yehuda Roditty},
  journal= {arXiv preprint arXiv:1504.02491},
  year   = {2015}
}
R2 v1 2026-06-22T09:13:50.870Z