We investigate the uniqueness of factorisation of possibly disconnected finite graphs with respect to the Cartesian, the strong and the direct product. It is proved that if a graph has n connected components, where n is prime, or n = 1, 4, 8, 9, and satisfies some addi-tional natural conditions, it factors uniquely under the given products. If, on the contrary, n = 6 or 10, all cases of nonunique factorisation are described precisely
Let G be a graph with vertex set V (G) and edge set E(G). The isolated toughness of G is defined as ...
AbstractIn the first part we examine bipartite graphs with a unique regular factor and present upper...
Every connected graph G with radius r(G) and independence num-ber α(G) obeys α(G) ≥ r(G). Recently ...
AbstractIn this paper a polynomial algorithm for the prime factorization of finite, connected nonbip...
We show that every simple, (weakly) connected, possibly directed and infinite, hypergraph has a uniq...
By a result of McKenzie [7] all finite directed graphs that satisfy certain connectivity conditions ...
A property of graphs is any class of graphs closed under isomorphism. A property of graphs is induce...
Let K-k(d) denote the Cartesian product of d copies of the complete graph K-k. We prove necessary an...
While it has been known for some time that connected non-bipartite graphs have unique prime factoriz...
We present a polynomial-time algorithm for deciding whether a given connected graph is a non-trivial...
We determine the spectrum of complete bipartite and tripartite graphs that are decomposable into dis...
Every connected graph G with radius r(G) and independence number α(G) obeys α(G) ≥ r(G). Recently th...
AbstractIt is shown that every connected graph has a unique prime factor decomposition with respect ...
An additive hereditary graph property is a set of graphs, closed under isomorphism and under taking ...
AbstractWe investigate transitive decompositions of disconnected graphs, and show that these behave ...
Let G be a graph with vertex set V (G) and edge set E(G). The isolated toughness of G is defined as ...
AbstractIn the first part we examine bipartite graphs with a unique regular factor and present upper...
Every connected graph G with radius r(G) and independence num-ber α(G) obeys α(G) ≥ r(G). Recently ...
AbstractIn this paper a polynomial algorithm for the prime factorization of finite, connected nonbip...
We show that every simple, (weakly) connected, possibly directed and infinite, hypergraph has a uniq...
By a result of McKenzie [7] all finite directed graphs that satisfy certain connectivity conditions ...
A property of graphs is any class of graphs closed under isomorphism. A property of graphs is induce...
Let K-k(d) denote the Cartesian product of d copies of the complete graph K-k. We prove necessary an...
While it has been known for some time that connected non-bipartite graphs have unique prime factoriz...
We present a polynomial-time algorithm for deciding whether a given connected graph is a non-trivial...
We determine the spectrum of complete bipartite and tripartite graphs that are decomposable into dis...
Every connected graph G with radius r(G) and independence number α(G) obeys α(G) ≥ r(G). Recently th...
AbstractIt is shown that every connected graph has a unique prime factor decomposition with respect ...
An additive hereditary graph property is a set of graphs, closed under isomorphism and under taking ...
AbstractWe investigate transitive decompositions of disconnected graphs, and show that these behave ...
Let G be a graph with vertex set V (G) and edge set E(G). The isolated toughness of G is defined as ...
AbstractIn the first part we examine bipartite graphs with a unique regular factor and present upper...
Every connected graph G with radius r(G) and independence num-ber α(G) obeys α(G) ≥ r(G). Recently ...