Some Problems in Cordial Labelings of Graphs - Samina Boxwala - Books - LAP LAMBERT Academic Publishing - 9783659633423 - November 18, 2014
In case cover and title do not match, the title is correct

Some Problems in Cordial Labelings of Graphs

Price
€ 42.99

Ordered from remote warehouse

Expected delivery Aug 5 - 13
Get notified about new Samina Boxwala releases
Add to your iMusic wish list

Not rated yet

In a seminal paper in 1987, I. Cahit introduced cordial labelings. We take G to be a finite, simple, undirected graph with vertex set V and edge set E. Let f be a surjection from the vertex set V to the set {0,1}. This function induces an edge labeling |f(u)-f(v)| to each edge uv of the graph G. Let v_f (0), v_f (1) denote respectively the number of vertices in G labeled 0 and 1 by f. Let e_f (0), e_f (1) denote respectively the number of edges in G labeled 0 and 1. Then f is called a cordial labeling of G if |v_f (0)- v_f (1)|?1 and |e_f (0)-e_f (1) |?. A graph G is said to be cordial if it has a cordial labeling. I. Cahit proved that every tree is cordial, all fans are cordial; an Eulerian graph is not cordial if the number of edges e is congruent to 2(mod 4). In this book, we have investigated the cordiality of various types of graphs viz. Corona graphs, t-ply graphs, elongated plys and some wheel related graphs.

Media Books     Paperback Book   (Book with soft cover and glued back)
Released November 18, 2014
ISBN13 9783659633423
Publishers LAP LAMBERT Academic Publishing
Pages 180
Dimensions 10 × 150 × 220 mm   ·   286 g
Language German