Please use this identifier to cite or link to this item: http://dr.iiserpune.ac.in:8080/xmlui/handle/123456789/3358
Title: Covering Arrays on Product Graphs
Authors: AKHTAR, YASMEEN
MAITY, SOUMEN
Dept. of Mathematics
Keywords: Covering Arrays
Product Graphs
Covering arrays
Orthogonal arrays
Cartesian product
Graphs Covering arrays
Graphs Cayley
Graphs Approximation algorithm
2017
Issue Date: Jul-2017
Publisher: Springer Nature
Citation: Graphs and Combinatorics, 33(4), 635-652.
Abstract: Two vectors x, y in ℤ𝑛𝑔 are qualitatively independent if for all pairs (𝑎,𝑏)∈ℤ𝑔×ℤ𝑔, there exists 𝑖∈{1,2,…,𝑛} such that (𝑥𝑖,𝑦𝑖)=(𝑎,𝑏). A covering array on a graph G, denoted by CA(n, G, g), is a |𝑉(𝐺)|×𝑛 array on ℤ𝑔 with the property that any two rows which correspond to adjacent vertices in G are qualitatively independent. The number of columns in such array is called its size. Given a graph G, a covering array on G with minimum size is called optimal. Our primary concern in this paper is with constructions that make optimal covering arrays on large graphs that are obtained from product of smaller graphs. We consider four most extensively studied graph products in the literature and give upper and lower bounds on the size of covering arrays on product graphs. We find families of graphs for which the size of covering array on the Cartesian product graphs achieves the lower bound. Finally, we present a polynomial time approximation algorithm with approximation ratio ⌈log(|𝑉|2𝑘−1)⌉ for constructing covering array on graph 𝐺=(𝑉,𝐸) with 𝑘>1 prime factors with respect to the Cartesian product.
URI: http://dr.iiserpune.ac.in:8080/xmlui/handle/123456789/3358
https://doi.org/10.1007/s00373-017-1800-9
ISSN: 0911-0119
1435-5914
Appears in Collections:JOURNAL ARTICLES

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