AbstractTwo vectors v,w in Zgn are qualitatively independent if for all pairs (a,b)∈Zg×Zg there is a position i in the vectors where (a,b)=(vi,wi). A covering array on a graph G, 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 smallest possible n is denoted by CAN(G,g). These are an extension of covering arrays. It is known that CAN(Kω(G),g)⩽CAN(G,g)⩽CAN(Kχ(G),g). The question we ask is, are there graphs with CAN(G,g)<CAN(Kχ(G),g)? We find an infinite family of graphs that satisfy this inequality. Further we define a family of graphs QI(n,g) that have the property that there exists a CAN(n,G,g) if and only if there is a homomorphism to QI(...
AbstractA graph is well-covered if every independent set can be extended to a maximum independent se...
Using algebraic and graph theoretical methods we provide an algorithm to determine the integer latti...
AbstractLet WC(C4^) be the set of well-covered graphs with no cycles of length 4. The main result is...
There has been a good deal of research on covering arrays over the last 20 years. Most of this work ...
The main focus of this thesis is a generalization of covering arrays, covering arrays on graphs. Two...
Covering arrays generalize orthogonal arrays by requiring that t -tuples be covered, but not requiri...
AbstractA family of concepts involving maximum independent sets which have been under recent study a...
Covering arrays are combinatorial objects that have been successfully applied in the design of test ...
AbstractCovering arrays are combinatorial structures which extend the notion of orthogonal arrays an...
The definitions of four previously studied parameters related to total coverings and total matchings...
Binary covering arrays of strength t are 0–1 matrices having the property that for each t columns an...
AbstractThe definitions of four previously studied parameters related to total coverings and total m...
AbstractLet G be a simple graph of order n(G). A vertex set D of G is dominating if every vertex not...
AbstractTwo common invariants of a graph G are its node clique cover number, θ0(G), and its edge cli...
A graph is called well-covered if all of its maximal independent sets have the same cardinality. We ...
AbstractA graph is well-covered if every independent set can be extended to a maximum independent se...
Using algebraic and graph theoretical methods we provide an algorithm to determine the integer latti...
AbstractLet WC(C4^) be the set of well-covered graphs with no cycles of length 4. The main result is...
There has been a good deal of research on covering arrays over the last 20 years. Most of this work ...
The main focus of this thesis is a generalization of covering arrays, covering arrays on graphs. Two...
Covering arrays generalize orthogonal arrays by requiring that t -tuples be covered, but not requiri...
AbstractA family of concepts involving maximum independent sets which have been under recent study a...
Covering arrays are combinatorial objects that have been successfully applied in the design of test ...
AbstractCovering arrays are combinatorial structures which extend the notion of orthogonal arrays an...
The definitions of four previously studied parameters related to total coverings and total matchings...
Binary covering arrays of strength t are 0–1 matrices having the property that for each t columns an...
AbstractThe definitions of four previously studied parameters related to total coverings and total m...
AbstractLet G be a simple graph of order n(G). A vertex set D of G is dominating if every vertex not...
AbstractTwo common invariants of a graph G are its node clique cover number, θ0(G), and its edge cli...
A graph is called well-covered if all of its maximal independent sets have the same cardinality. We ...
AbstractA graph is well-covered if every independent set can be extended to a maximum independent se...
Using algebraic and graph theoretical methods we provide an algorithm to determine the integer latti...
AbstractLet WC(C4^) be the set of well-covered graphs with no cycles of length 4. The main result is...