Non-planar extensions of subdivisions of planar graphs

Non-planar extensions of subdivisions of planar graphs

A graph G is almost 4-connected if it is simple, 3-connected, has at least five vertices, and V (G) cannot be partitioned into three sets A,B,C in such a way that |C| = 3, |A| ≥ 2, |B| ≥ 2, and no edge of G has one end in A and the other end in B. A graph K is a subdivision of a graph G if K is obtained from G by replacing its edges by internally disjoint nonzero length paths with the same ends...

Non-planar Extensions of Planar Graphs

A graph G is almost 4-connected if it is simple, 3-connected, has at least ve vertices, and V (G) cannot be partitioned into three sets A;B;C in such a way that jCj = 3, jAj 2, jBj 2, and no edge of G has one end in A and the other end in B. A graph K is a subdivision of a graph G if K is obtained from G by replacing its edges by internally disjoint nonzero length paths with the same ends, call...

On the M-polynomial of planar chemical graphs

Let $G$ be a graph and let $m_{i,j}(G)$, $i,jge 1$, be the number of edges $uv$ of $G$ such that ${d_v(G), d_u(G)} = {i,j}$. The $M$-polynomial of $G$ is $M(G;x,y) = sum_{ile j} m_{i,j}(G)x^iy^j$. With $M(G;x,y)$ in hands, numerous degree-based topological indices of $G$ can be routinely computed. In this note a formula for the $M$-polynomial of planar (chemical) graphs which have only vertices...

Optimal Search in Planar Subdivisions

Non-Separable and Planar Graphs.

Introduction. In this paper the structure of graphs is studied by purely combinatorial methods. The concepts of rank and nullity are fundamental. The first part is devoted to a general study of non-separable graphs. Conditions that a graph be non-separable are given ; the decomposition of a separable graph into its non-separable parts is studied; by means of theorems on circuits of graphs, a me...