Given a graph G with weighting w: E(G) Z+, the Strength of G(w) is the maximum weight on any edge. The sum of a vertex in G(w) is the sum of the weights of all its incident edges. The network G(w) is irregular if the vertex sums are distinct. The irregularity strength of G is the minimum strength of the graph under all irregular weightings. In this paper we determine the irregularity strength of the m × n grid for certain m and n. In particular, for every positive integer d we find the irregularity strength for all but a finite number of m × n grids where n - m = d. In addition, we present a general lower bound for the irregularity strength of graphs. © 1992 John Wiley & Sons, Inc.
[1]
Michael S. Jacobson,et al.
Irregularity strength of dense graphs
,
1991,
Discret. Math..
[2]
C. Zheng,et al.
; 0 ;
,
1951
.
[3]
Jenö Lehel,et al.
The irregularity strength of tP3
,
1991,
Discret. Math..
[4]
Richard H. Schelp,et al.
Irregular networks, regular graphs and integer matrices with distinct row and column sums
,
1989,
Discret. Math..
[5]
David K. Garnick,et al.
Heuristic Algorithms for Finding Irregularity Strengths of Graphs
,
2022
.
[6]
András Gyárfás.
The irregularity strength of Km, m is 4 for odd m
,
1988,
Discret. Math..