Mark Anthony C Tolentino scite author profile

Mark Anthony C Tolentino

5Publications

5Citation Statements Received

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Ateneo de Manila University

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Twin chromatic indices of some graphs with maximum degree 3

Tolentino

Marcelo

Tolentino

2020

J. Phys.: Conf. Ser.

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Let k ≥ 2 be an integer and G be a connected graph of order at least 3. A twin k-edge coloring of G is a proper edge coloring of G that uses colors from ℤ k and that induces a proper vertex coloring on G where the color of a vertex v is the sum (in ℤ k ) of the colors of the edges incident with v. The smallest integer k for which G has a twin k-edge coloring is the twin chromatic index of G and is denoted by χ t ′ ( G ) . In this paper, we determine the twin chromatic indices of circulant graphs C n ( 1 , n 2 ) , and some generalized Petersen graphs such as GP(3s, k), GP(m, 2), and GP(4s, l) where n ≥ 6 and n ≡ 0 (mod 4), s ≥ 1, k ≢ 0 (mod 3), m ≥ 3 and m ∉ {4, 5}, and l is odd. Moreover, we provide some sufficient conditions for a connected graph with maximum degree 3 to have twin chromatic index greater than 3.

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On the Total Set Chromatic Number of Graphs

Tolentino

Eugenio

Ruiz

2022

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On twin edge colorings in m-ary trees

Tolentino

Marcelo

Tolentino

2022

EJGTA

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The set chromatic numbers of the middle graph of graphs

Eugenio

Ruiz

Tolentino

2021

J. Phys.: Conf. Ser.

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For a simple connected graph G, let c : V(G) → ℕ be a vertex coloring of G, where adjacent vertices may be colored the same. The neighborhood color set of a vertex v, denoted by NC(v), is the set of colors of the neighbors of v. The coloring c is called a set coloring provided that NC(u) ≠ NC(v) for every pair of adjacent vertices u and v of G. The minimum number of colors needed for a set coloring of G is referred to as the set chromatic number of G and is denoted by χs(G). In this work, the set chromatic number of graphs is studied in relation to the graph operation called middle graph. Our results include the exact set chromatic numbers of the middle graph of cycles, paths, star graphs, double-star graphs, and some trees of height 2. Moreover, we establish the sharpness of some bounds on the set chromatic number of general graphs obtained using this operation. Finally, we develop an algorithm for constructing an optimal set coloring of the middle graph of trees of height 2 under some assumptions.

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On the set chromatic number of the join and comb product of graphs

Felipe

Garciano

Tolentino

2020

J. Phys.: Conf. Ser.

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A vertex coloring c : V(G) → ℕ of a non-trivial connected graph G is called a set coloring if NC(u) ≠ NC(v) for any pair of adjacent vertices u and v. Here, NC(x) denotes the set of colors assigned to vertices adjacent to x. The set chromatic number of G, denoted by χs (G), is defined as the fewest number of colors needed to construct a set coloring of G. In this paper, we study the set chromatic number in relation to two graph operations: join and comb prdocut. We determine the set chromatic number of wheels and the join of a bipartite graph and a cycle, the join of two cycles, the join of a complete graph and a bipartite graph, and the join of two bipartite graphs. Moreover, we determine the set chromatic number of the comb product of a complete graph with paths, cycles, and large star graphs.

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