Add to ORKGWe derive an O(n2)-time algorithm for calculating the genus distribution of a given 3-regular Halin graph G; that is, we calculate the sequence of numbers g0(G), g1(G), g2(G),... on the respective orientable surfaces S0, S1, S2,.... Key topological features are a quadrangular decomposition of plane Halin graphs and a new recombinant-strands reassembly process that fits pieces together three-at-a-vertex. Key algorithmic features are reassembly along a post-order traversal, with just-in-time dynamic assignment of roots for quadrangular pieces encountered along the tour
The set of orientable imbeddings of a graph can be partitioned according to the genus of the imbeddi...
AbstractWe derive a recursion for the genus distribution of the graph family P3□Pn, with the aid of ...
The genus distribution of a graph G is defined to be the sequence {gm} such that gm is the number of...
Abstract. We derive a quadratic-time algorithm for the genus distribution of any 3-regular, biconnec...
Abstract. We derive a quadratic-time algorithm for the genus distribution of any 3-regular, biconnec...
We derive a quadratic-time algorithm for the genus distribution of any 3-regular, biconnected series...
The set of orient able imbeddings of a graph can be partitioned according to the genus of the imbedd...
AbstractWe derive a recursion for the genus distribution of the graph family P3□Pn, with the aid of ...
ABSTRACT. The genus distribution of a graph G is defined to be the sequence {gm} such that gm is the...
AbstractThe genus distribution of a graph G is defined to be the sequence {gm} such that gm is the n...
Abstract: In this paper we develop the technique of a distribution decomposition for a graph. A form...
The set of orientable imbeddings of a graph can be partitioned according to the genus of the imbeddi...
AbstractThe set of orientable imbeddings of a graph can be partitioned according to the genus of the...
In this paper we develop the technique of a distribution decomposition for a graph. A formula is giv...
A basic problem in graph embedding theory is to determine distinct embeddings of planar graphs on hi...
The set of orientable imbeddings of a graph can be partitioned according to the genus of the imbeddi...
AbstractWe derive a recursion for the genus distribution of the graph family P3□Pn, with the aid of ...
The genus distribution of a graph G is defined to be the sequence {gm} such that gm is the number of...
Abstract. We derive a quadratic-time algorithm for the genus distribution of any 3-regular, biconnec...
Abstract. We derive a quadratic-time algorithm for the genus distribution of any 3-regular, biconnec...
We derive a quadratic-time algorithm for the genus distribution of any 3-regular, biconnected series...
The set of orient able imbeddings of a graph can be partitioned according to the genus of the imbedd...
AbstractWe derive a recursion for the genus distribution of the graph family P3□Pn, with the aid of ...
ABSTRACT. The genus distribution of a graph G is defined to be the sequence {gm} such that gm is the...
AbstractThe genus distribution of a graph G is defined to be the sequence {gm} such that gm is the n...
Abstract: In this paper we develop the technique of a distribution decomposition for a graph. A form...
The set of orientable imbeddings of a graph can be partitioned according to the genus of the imbeddi...
AbstractThe set of orientable imbeddings of a graph can be partitioned according to the genus of the...
In this paper we develop the technique of a distribution decomposition for a graph. A formula is giv...
A basic problem in graph embedding theory is to determine distinct embeddings of planar graphs on hi...
The set of orientable imbeddings of a graph can be partitioned according to the genus of the imbeddi...
AbstractWe derive a recursion for the genus distribution of the graph family P3□Pn, with the aid of ...
The genus distribution of a graph G is defined to be the sequence {gm} such that gm is the number of...