Abstract
For a simple graph G = (V, E) with the vertex set V(G) and the edge set E(G), a vertex labeling phi : V(G) -{1, 2, ... , k} is called a k-labeling. The weight of an edge under the vertex labeling phi is the sum of the labels of its end vertices and the modular edge-weight is the remainder of the division of this sum by |E(G)|. A vertex k-labeling is called a modular edge irregular if for every two different edges their modular edge-weights are different. The maximal integer k minimized over all modular edge irregular k-labelings is called the modular edge irregularity strength of G. In the paper we estimate the bounds on the modular edge irregularity strength and for caterpillar, cycle, friendship graph and n-sun we determine the precise values of this parameter that prove the sharpness of the lower bound.