AbstractFor a planar point set we consider the graph whose vertices are the crossing-free straight-line spanning trees of the point set, and two such spanning trees are adjacent if their union is crossing-free. An upper bound on the diameter of this graph implies an upper bound on the diameter of the flip graph of pseudo-triangulations of the underlying point set.We prove a lower bound of Ω(logn/loglogn) for the diameter of the transformation graph of spanning trees on a set of n points in the plane. This nearly matches the known upper bound of O(logn). If we measure the diameter in terms of the number of convex layers k of the point set, our lower bound construction is tight, i.e., the diameter is in Ω(logk) which matches the known upper b...
Theorem 1. (1) A planar graph with n vertices has at most 5.33333333... n spanning trees. (2) A plan...
AbstractThomassen has recently shown that a triangulation of the orientable surface of genus g has a...
AbstractWe improve previous lower bounds on the number of simple polygonizations, and other kinds of...
For a planar point set we consider the graph whose vertices are the crossing-free straight-line span...
AbstractLet TS be the set of all crossing-free spanning trees of a planar n-point set S. We prove th...
We prove that any planar graph on n vertices has less than 5:2852n spanning trees. Under the restric...
We give an algorithmic approach for transforming any spanning tree of a 2-connected graph into any o...
We study ¿ip graphs of triangulations whose maximum vertex degree is bounded by a constant k. In par...
Graphs are among the objects that have been studied in Mathematics and Computer Science for decades....
We investigate the complexity of finding a transformation from a given spanning tree in a graph to a...
An edge-flipping operation in a triangulation T of a set of points in the plane is a local restructu...
An edge-flipping operation in a triangulation T of a set of points in the plane is a local restructu...
AbstractLet S be a set of n points in the plane and let TS be the set of all crossing-free spanning ...
Let S be a set of n points in the plane and let TS be the set of all crossing-free spanning trees of...
AbstractWe study the following Ramsey-type problem. Let S=B∪R be a two-colored set of n points in th...
Theorem 1. (1) A planar graph with n vertices has at most 5.33333333... n spanning trees. (2) A plan...
AbstractThomassen has recently shown that a triangulation of the orientable surface of genus g has a...
AbstractWe improve previous lower bounds on the number of simple polygonizations, and other kinds of...
For a planar point set we consider the graph whose vertices are the crossing-free straight-line span...
AbstractLet TS be the set of all crossing-free spanning trees of a planar n-point set S. We prove th...
We prove that any planar graph on n vertices has less than 5:2852n spanning trees. Under the restric...
We give an algorithmic approach for transforming any spanning tree of a 2-connected graph into any o...
We study ¿ip graphs of triangulations whose maximum vertex degree is bounded by a constant k. In par...
Graphs are among the objects that have been studied in Mathematics and Computer Science for decades....
We investigate the complexity of finding a transformation from a given spanning tree in a graph to a...
An edge-flipping operation in a triangulation T of a set of points in the plane is a local restructu...
An edge-flipping operation in a triangulation T of a set of points in the plane is a local restructu...
AbstractLet S be a set of n points in the plane and let TS be the set of all crossing-free spanning ...
Let S be a set of n points in the plane and let TS be the set of all crossing-free spanning trees of...
AbstractWe study the following Ramsey-type problem. Let S=B∪R be a two-colored set of n points in th...
Theorem 1. (1) A planar graph with n vertices has at most 5.33333333... n spanning trees. (2) A plan...
AbstractThomassen has recently shown that a triangulation of the orientable surface of genus g has a...
AbstractWe improve previous lower bounds on the number of simple polygonizations, and other kinds of...