Shortest Path Embeddings of Graphs on Surfaces

Shortest Path Embeddings of Graphs on Surfaces

The classical theorem of Fáry states that every planar graph can be represented by an embedding in which every edge is represented by a straight line segment. We consider generalizations of Fáry’s theorem to surfaces equipped with Riemannian metrics. In this setting, we require that every edge is drawn as a shortest path between its two endpoints and we call an embedding with this property a sh...

Generalized Shortest Path Kernel on Graphs

We consider the problem of classifying graphs using graph kernels. We define a new graph kernel, called the generalized shortest path kernel, based on the number and length of shortest paths between nodes. For our example classification problem, we consider the task of classifying random graphs from two well-known families, by the number of clusters they contain. We verify empirically that the ...

Embeddings of symmetric graphs in surfaces

The context of this paper is the study of <::~n'TIrnpl~rv Every object, concrete or abstract, real or imaginary, has a certain amount of symmetry which is measured by a group. Since the days of Cayley [1), a group has been a mathematical object obeying certain a'doms and the question arises: given an abstract group, of what is it a group of ""71rnrnpj'.rH'''' A very answer, described in more de...

Polynomial Invariants of Embeddings of Graphs on Closed Surfaces

Labeling Subgraph Embeddings and Cordiality of Graphs

Let $G$ be a graph with vertex set $V(G)$ and edge set $E(G)$, a vertex labeling $f : V(G)rightarrow mathbb{Z}_2$ induces an edge labeling $ f^{+} : E(G)rightarrow mathbb{Z}_2$ defined by $f^{+}(xy) = f(x) + f(y)$, for each edge $ xyin E(G)$.  For each $i in mathbb{Z}_2$, let $ v_{f}(i)=|{u in V(G) : f(u) = i}|$ and $e_{f^+}(i)=|{xyin E(G) : f^{+}(xy) = i}|$. A vertex labeling $f$ of a graph $G...