An elimination tree for a connected graph~$G$ is a rooted tree on the vertices of~$G$ obtained by choosing a root~$x$ and recursing on the connected components of~$G-x$ to produce the subtrees of~$x$. Elimination trees appear in many guises in computer science and discrete mathematics, and they encode many interesting combinatorial objects, such as bitstrings, permutations and binary trees. We apply the recent Hartung-Hoang-M\"utze-Williams combinatorial generation framework to elimination trees, and prove that all elimination trees for a chordal graph~$G$ can be generated by tree rotations using a simple greedy algorithm. This yields a short proof for the existence of Hamilton paths on graph associahedra of chordal graphs. Graph associ...
Thesis: S.M., Massachusetts Institute of Technology, Department of Electrical Engineering and Comput...
AbstractWe re-consider perfect elimination digraphs, that were introduced by Haskins and Rose in 197...
AbstractSeveral efficient algorithms have been proposed to construct a perfect elimination ordering ...
An elimination tree for a connected graph $G$ is a rooted tree on the vertices of $G$ obtained by ch...
In 1993, Savage, Squire, and West described an inductive construction for generating every acyclic o...
A chordal graph is a graph which contains no chordless cycle of at least four edges as an induced su...
Several efficient algorithms have been proposed to construct a perfect elimination ordering of the v...
While the problem of generating random graphs has received much attention, the problem of generating...
"Reprinted from Electronics Letters, Vol. 2, No. 8, August 1966."An efficient method of generating a...
AbstractA partitioning problem on chordal graphs that arises in the solution of sparse triangular sy...
We develop a constant time transposition "oracle" for the set of perfect elimination orderings of ch...
In this paper two methods for automatic generation of connected chordal graphs are proposed: the fir...
AbstractThe notion of a clique tree plays a central role in obtaining an intersection graph represen...
A graph is chordal if all its cycles of length greater than or equal to four contain a chord, i.e., ...
AbstractPaths along faces of a polyhedron can be assimilated to paths along the branches of a tree g...
Thesis: S.M., Massachusetts Institute of Technology, Department of Electrical Engineering and Comput...
AbstractWe re-consider perfect elimination digraphs, that were introduced by Haskins and Rose in 197...
AbstractSeveral efficient algorithms have been proposed to construct a perfect elimination ordering ...
An elimination tree for a connected graph $G$ is a rooted tree on the vertices of $G$ obtained by ch...
In 1993, Savage, Squire, and West described an inductive construction for generating every acyclic o...
A chordal graph is a graph which contains no chordless cycle of at least four edges as an induced su...
Several efficient algorithms have been proposed to construct a perfect elimination ordering of the v...
While the problem of generating random graphs has received much attention, the problem of generating...
"Reprinted from Electronics Letters, Vol. 2, No. 8, August 1966."An efficient method of generating a...
AbstractA partitioning problem on chordal graphs that arises in the solution of sparse triangular sy...
We develop a constant time transposition "oracle" for the set of perfect elimination orderings of ch...
In this paper two methods for automatic generation of connected chordal graphs are proposed: the fir...
AbstractThe notion of a clique tree plays a central role in obtaining an intersection graph represen...
A graph is chordal if all its cycles of length greater than or equal to four contain a chord, i.e., ...
AbstractPaths along faces of a polyhedron can be assimilated to paths along the branches of a tree g...
Thesis: S.M., Massachusetts Institute of Technology, Department of Electrical Engineering and Comput...
AbstractWe re-consider perfect elimination digraphs, that were introduced by Haskins and Rose in 197...
AbstractSeveral efficient algorithms have been proposed to construct a perfect elimination ordering ...