On the Total Vertex Irregular Labeling of Proper Interval Graphs

Abstract: A labeling of a graph is a mapping that maps some set of graph elements to a set of numbers (usually positive integers).  For a simple graph G = (V, E) with vertex set V and edge set E, a labeling  Φ: V ∪ E → {1, 2, ..., k} is called total k-labeling. The associated vertex weight of a vertex x∈ V under a total k-labeling  Φ is defined as wt(x) = Φ(x) + ∑y∈N(x) Φ(xy) where N(x) is the set of neighbors of the vertex x. A total k-labeling is defined to be a vertex irregular total labeling of a graph, if for every … Show more

“…Also, Amanathulla et al shown that λ 0,1 (G) ≤ ∆ and λ 1,1 (G) ≤ 2∆ for CAGs [10]. In 2020, Rana have studied graph a new variation of graph labeling problem [3,4]. Also, in 2020, Amanathulla et al have studied L(3,2,1)-labeling of trapezoid graph and obtained good result for it [18].…”

L(2,1,1)-Labeling of Circular-Arc Graphs

“…Also, Amanathulla et al shown that λ 0,1 (G) ≤ ∆ and λ 1,1 (G) ≤ 2∆ for CAGs [10]. In 2020, Rana have studied graph a new variation of graph labeling problem [3,4]. Also, in 2020, Amanathulla et al have studied L(3,2,1)-labeling of trapezoid graph and obtained good result for it [18].…”

L(2,1,1)-Labeling of Circular-Arc Graphs