On the odd girth and the circular chromatic number of generalized Petersen graphs

Abstract: A class G of simple graphs is said to be girth-closed (odd-girth-closed) if for any positive integer g there exists a graph G ∈ G such that the girth (odd-girth) of G is ≥ g. A girth-closed (odd-girth-closed) class G of graphs is said to be pentagonal (oddpentagonal) if there exists a positive integer g * depending on G such that any graph G ∈ G whose girth (odd-girth) is greater than g * admits a homomorphism to the five cycle (i.e. is C 5 -colourable). Although, the question "Is the class of simple 3-regular… Show more

Determining the edge metric dimension of the generalized Petersen graph P(n, 3)

Determining the edge metric dimension of the generalized Petersen graph P(n, 3)

On the minimum vertex cover of generalized Petersen graphs

The edge metric dimension of the generalized Petersen graph $P(n,3)$ is 4