AbstractAn edge-coloring of a graph G is called vertex-distinguishing if for any two distinct vertices the multisets of colors assigned to incident edges differ. Let c(G) be the minimum number of colors necessary for such a coloring, and let ni denote the number of vertices of degree i in G. A simple count shows that c(G) ⩾ max {n1, C1n212}. We prove that if G is a tree then c(G) ⩽ max {n1, C2n212}
AbstractThe vertex-distinguishing index χs′(G) of a graph G is the minimum number of colours require...
Abstract. An adjacent vertex distinguishing edge-coloring of a simple graph G is a proper edge-color...
AbstractA vertex irregular total k-labelling λ:V(G)∪E(G)⟶{1,2,…,k} of a graph G is a labelling of ve...
AbstractAn edge-coloring of a graph G is called vertex-distinguishing if for any two distinct vertic...
In the PhD thesis by Burris (Memphis (1993)), a conjecture was made concerning the number of colors ...
The i-local distinguishing number of G, denoted by LD i (G), was defined in [3]. Let T be a tree on ...
A total edge-irregular k-labelling ξ: V (G) ∪ E(G) → {1, 2,..., k} of a graph G is a labelling of ...
The general vertex-distinguishing total chromatic number of a graph G is the minimum integer k, for ...
A vertex coloring of a graph $G$ is called distinguishing if no non-identity automorphism of $G$ pre...
AbstractAigner et al., proved that for the irregular coloring number c(G) of a simple 2-regular grap...
Let $ f $ be a proper total $ k $-coloring of a simple graph $ G $ from $ V(G)\cup E(G) $ to $ \{1, ...
For a proper vertex coloring cc of a graph GG, let φc(G)φc(G) denote the maximum, over all induced s...
Given a positive integer n and a family F of graphs, let R ∗ (n, F) denote the maximum number of col...
AbstractWe prove that the number of colors required to properly color the edges of a graph of order ...
A harmonious colouring of a simple graph G is a proper vertex colouring such that each pair of colou...
AbstractThe vertex-distinguishing index χs′(G) of a graph G is the minimum number of colours require...
Abstract. An adjacent vertex distinguishing edge-coloring of a simple graph G is a proper edge-color...
AbstractA vertex irregular total k-labelling λ:V(G)∪E(G)⟶{1,2,…,k} of a graph G is a labelling of ve...
AbstractAn edge-coloring of a graph G is called vertex-distinguishing if for any two distinct vertic...
In the PhD thesis by Burris (Memphis (1993)), a conjecture was made concerning the number of colors ...
The i-local distinguishing number of G, denoted by LD i (G), was defined in [3]. Let T be a tree on ...
A total edge-irregular k-labelling ξ: V (G) ∪ E(G) → {1, 2,..., k} of a graph G is a labelling of ...
The general vertex-distinguishing total chromatic number of a graph G is the minimum integer k, for ...
A vertex coloring of a graph $G$ is called distinguishing if no non-identity automorphism of $G$ pre...
AbstractAigner et al., proved that for the irregular coloring number c(G) of a simple 2-regular grap...
Let $ f $ be a proper total $ k $-coloring of a simple graph $ G $ from $ V(G)\cup E(G) $ to $ \{1, ...
For a proper vertex coloring cc of a graph GG, let φc(G)φc(G) denote the maximum, over all induced s...
Given a positive integer n and a family F of graphs, let R ∗ (n, F) denote the maximum number of col...
AbstractWe prove that the number of colors required to properly color the edges of a graph of order ...
A harmonious colouring of a simple graph G is a proper vertex colouring such that each pair of colou...
AbstractThe vertex-distinguishing index χs′(G) of a graph G is the minimum number of colours require...
Abstract. An adjacent vertex distinguishing edge-coloring of a simple graph G is a proper edge-color...
AbstractA vertex irregular total k-labelling λ:V(G)∪E(G)⟶{1,2,…,k} of a graph G is a labelling of ve...
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