AbstractIn this paper we deal with identifying codes in cycles. We show that for all r≥1, any r-identifying code of the cycle Cn has cardinality at least gcd(2r+1,n)⌈n2gcd(2r+1,n)⌉. This lower bound is enough to solve the case n even (which was already solved in [N. Bertrand, I. Charon, O. Hudry, A. Lobstein, Identifying and locating-dominating codes on chains and cycles, European Journal of Combinatorics 25 (7) (2004) 969–987]), but the case n odd seems to be more complicated. An upper bound is given for the case n odd, and some special cases are solved. Furthermore, we give some conditions on n and r to attain the lower bound
AbstractAssume that G=(V,E) is a simple undirected graph, and C is a nonempty subset of V. For every...
The work presented in this document deals with identifying codes in graphs. This notion, introduced ...
AbstractLet G be a finite undirected graph with vertex set V(G). If v∈V(G), let N[v] denote the clos...
AbstractThe problem of the r-identifying code of a cycle Cn has been solved totally when n is even. ...
The concept of identifying codes in a graph was introduced by Karpovsky et al. (in IEEE Trans Inf Th...
AbstractLet G=(V,E) be a graph and let r≥1 be an integer. For a set D⊆V, define Nr[x]={y∈V:d(x,y)≤r}...
AbstractLet G be a graph and B(u) be the set of u with all of its neighbors in G. A set S of vertice...
AbstractConsider a connected undirected graph G=(V,E), a subset of vertices C⊆V, and an integer r≥1;...
In this work we study the associated polyhedra and present some general results on their combinatori...
The smallest cardinality of an r-locating-dominating code in a cycle C_n of length n is denoted by M...
AbstractConsider a connected undirected graph G=(V,E), a subset of vertices C⊆V, and an integer r⩾1;...
Identifying and locating-dominating codes have been widely studied in circulant graphs of type Cn(1,...
AbstractFor a graph G and a set D⊆V(G), define Nr[x]={xi∈V(G):d(x,xi)≤r} (where d(x,y) is graph theo...
AbstractAn identifying code of a graph G is a dominating set C such that every vertex x of G is dist...
AbstractAn identifying code of a graph is a subset of vertices C such that the sets B(v)∩C are all n...
AbstractAssume that G=(V,E) is a simple undirected graph, and C is a nonempty subset of V. For every...
The work presented in this document deals with identifying codes in graphs. This notion, introduced ...
AbstractLet G be a finite undirected graph with vertex set V(G). If v∈V(G), let N[v] denote the clos...
AbstractThe problem of the r-identifying code of a cycle Cn has been solved totally when n is even. ...
The concept of identifying codes in a graph was introduced by Karpovsky et al. (in IEEE Trans Inf Th...
AbstractLet G=(V,E) be a graph and let r≥1 be an integer. For a set D⊆V, define Nr[x]={y∈V:d(x,y)≤r}...
AbstractLet G be a graph and B(u) be the set of u with all of its neighbors in G. A set S of vertice...
AbstractConsider a connected undirected graph G=(V,E), a subset of vertices C⊆V, and an integer r≥1;...
In this work we study the associated polyhedra and present some general results on their combinatori...
The smallest cardinality of an r-locating-dominating code in a cycle C_n of length n is denoted by M...
AbstractConsider a connected undirected graph G=(V,E), a subset of vertices C⊆V, and an integer r⩾1;...
Identifying and locating-dominating codes have been widely studied in circulant graphs of type Cn(1,...
AbstractFor a graph G and a set D⊆V(G), define Nr[x]={xi∈V(G):d(x,xi)≤r} (where d(x,y) is graph theo...
AbstractAn identifying code of a graph G is a dominating set C such that every vertex x of G is dist...
AbstractAn identifying code of a graph is a subset of vertices C such that the sets B(v)∩C are all n...
AbstractAssume that G=(V,E) is a simple undirected graph, and C is a nonempty subset of V. For every...
The work presented in this document deals with identifying codes in graphs. This notion, introduced ...
AbstractLet G be a finite undirected graph with vertex set V(G). If v∈V(G), let N[v] denote the clos...