Let S be a set of n points in and G be a geometric graph with vertex set S. For a fixed real number t 1, G is called a t-spanner of S if, for all pairs of vertices u, v S, the shortest path in G between u and v is no longer than t|uv|, where |uv| is the Euclidean distance between u and v. In this paper, we present an algorithm to construct the gap-greedy spanner that takes O n time and O n space, and another variant of this algorithm that takes O n time and O n space. We also improve the (theoretical) dilation of the gap-greedy spanner. Moreover, we present some other O n time algorithms to construct the gap-greedy spanner and compare their time complexity with the gap-greedy algorithm in practice. Furthermore, we experimentally compare the running time and some geometric properties of the gap-greedy spanner with the greedy spanner.
Bakhshesh,D. and Farshi,M. (2016). Improving Space and Time Complexity of the Gap-Greedy Spanner Algorithm. (e215887). The CSI Journal on Computer Science and Engineering, 14(1), e215887
MLA
Bakhshesh,D. , and Farshi,M. . "Improving Space and Time Complexity of the Gap-Greedy Spanner Algorithm" .e215887 , The CSI Journal on Computer Science and Engineering, 14, 1, 2016, e215887.
HARVARD
Bakhshesh D., Farshi M. (2016). 'Improving Space and Time Complexity of the Gap-Greedy Spanner Algorithm', The CSI Journal on Computer Science and Engineering, 14(1), e215887.
CHICAGO
D. Bakhshesh and M. Farshi, "Improving Space and Time Complexity of the Gap-Greedy Spanner Algorithm," The CSI Journal on Computer Science and Engineering, 14 1 (2016): e215887,
VANCOUVER
Bakhshesh D., Farshi M. Improving Space and Time Complexity of the Gap-Greedy Spanner Algorithm. CSIonJCSE, 2016; 14(1): e215887.
The CSI Journal on Computer Science and Engineering