Representations of Sparse Distributed Networks: A Locality-Sensitive Approach
February 26, 2018 Β· Declared Dead Β· π ACM Symposium on Parallelism in Algorithms and Architectures
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Authors
Haim Kaplan, Shay Solomon
arXiv ID
1802.09515
Category
cs.DS: Data Structures & Algorithms
Citations
8
Venue
ACM Symposium on Parallelism in Algorithms and Architectures
Last Checked
4 months ago
Abstract
In 1999, Brodal and Fagerberg (BF) gave an algorithm for maintaining a low outdegree orientation of a dynamic uniformly sparse graph. Specifically, for a dynamic graph on $n$-vertices, with arboricity bounded by $Ξ±$ at all times, the BF algorithm supports edge updates in $O(\log n)$ amortized update time, while keeping the maximum outdegree in the graph bounded by $O(Ξ±)$. Such an orientation provides a basic data structure for uniformly sparse graphs, which found applications to a plethora of dynamic graph algorithms. A significant weakness of the BF algorithm is the possible \emph{temporary} blowup of the maximum outdegree, following edge insertions. Although BF eventually reduces all outdegrees to $O(Ξ±)$, local memory usage at the vertices, which is an important quality measure in distributed systems, cannot be bounded. We show how to modify the BF algorithm to guarantee that the outdegrees of all vertices are bounded by $O(Ξ±)$ at all times, without hurting any of its other properties, and present an efficient distributed implementation of the modified algorithm. This provides the \emph{first} representation of distributed networks in which the local memory usage at all vertices is bounded by the arboricity (which is essentially the average degree of the densest subgraph) rather than the maximum degree. For settings where there are no local memory constraints, we take the temporary outdegree blowup to the extreme and allow a permanent outdegree blowup. This allows us to address the second significant weakness of the BF algorithm -- its inherently \emph{global} nature: An insertion of an edge $(u,v)$ may trigger changes in the orientations of edges that are far away from $u$ and $v$. We suggest an alternative \emph{local} scheme, which does not guarantee any outdegree bound on the vertices, yet is just as efficient as the BF scheme for various applications.
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