A method is presented for determining the asymptotic worst-case behavior of quantities like the length of the minimal spanning tree or the length of an optimal traveling salesman tour of $n$ points in the unit $d$-cube. In each of these classical problems, the worst-case lengths are proved to have the exact asymptotic growth rate of $\beta _n^{{{(d - 1)} / d}} $, where $\beta $ is a positive constant depending on the problem and the dimension. These results complement known results on the growth rates for the analogous quantities under probabilistic assumptions on the points, but the results given here are free of any probabilistic hypotheses
We study the solutions of some known combinatorial optimization problems including the minimum match...
AbstractLet {Xi:i⩾1} be i.i.d. points in Rd, d⩾2, and let LMM({X1,…,Xn},p), LMST({X1,…,Xn},p), LTSP(...
For all p[greater-or-equal, slanted]1 let Mp(X1,...,Xn) denote the length of the minimal spanning tr...
For a sample of points drawn uniformly from either the d-dimensional torus or the d-cube, d > 2, we ...
Given a set S of n points in the unit square $[ 0,1 ]^d $, an optimal traveling salesman tour of S i...
Given a set S of n points in the unit square [0, 1]d , an optimal traveling salesman tour of S is a ...
This article summarizes the current status of several streams of research that deal with the probabi...
Given a set S of n points in the unit square [0, 1)2, an optimal traveling salesman tour of S is a t...
We show that the length of the minimum spanning tree through points drawn uniformly from the d-dimen...
We show that the number of vertices of degree k in the Euclidean minimal spanning tree through point...
Includes bibliographical references (p. 16-17).Supported by the National Science Foundation. DDM-901...
In this paper, which is a sequel to [3], we perform probabilistic analysis under the random Euclidea...
Let Xi, 1 ≤ i \u3c ∞, denote independent random variables with values in Rd, d ≥ 2, and let Mn denot...
AbstractFor all p⩾1 let Mp(X1,…,Xn) denote the length of the minimal spanning tree through random va...
In Bhatt and Roy's minimal directed spanning tree construction for a random, partially ordered set o...
We study the solutions of some known combinatorial optimization problems including the minimum match...
AbstractLet {Xi:i⩾1} be i.i.d. points in Rd, d⩾2, and let LMM({X1,…,Xn},p), LMST({X1,…,Xn},p), LTSP(...
For all p[greater-or-equal, slanted]1 let Mp(X1,...,Xn) denote the length of the minimal spanning tr...
For a sample of points drawn uniformly from either the d-dimensional torus or the d-cube, d > 2, we ...
Given a set S of n points in the unit square $[ 0,1 ]^d $, an optimal traveling salesman tour of S i...
Given a set S of n points in the unit square [0, 1]d , an optimal traveling salesman tour of S is a ...
This article summarizes the current status of several streams of research that deal with the probabi...
Given a set S of n points in the unit square [0, 1)2, an optimal traveling salesman tour of S is a t...
We show that the length of the minimum spanning tree through points drawn uniformly from the d-dimen...
We show that the number of vertices of degree k in the Euclidean minimal spanning tree through point...
Includes bibliographical references (p. 16-17).Supported by the National Science Foundation. DDM-901...
In this paper, which is a sequel to [3], we perform probabilistic analysis under the random Euclidea...
Let Xi, 1 ≤ i \u3c ∞, denote independent random variables with values in Rd, d ≥ 2, and let Mn denot...
AbstractFor all p⩾1 let Mp(X1,…,Xn) denote the length of the minimal spanning tree through random va...
In Bhatt and Roy's minimal directed spanning tree construction for a random, partially ordered set o...
We study the solutions of some known combinatorial optimization problems including the minimum match...
AbstractLet {Xi:i⩾1} be i.i.d. points in Rd, d⩾2, and let LMM({X1,…,Xn},p), LMST({X1,…,Xn},p), LTSP(...
For all p[greater-or-equal, slanted]1 let Mp(X1,...,Xn) denote the length of the minimal spanning tr...