Add to ORKGIn this paper we give approximation algorithms for the following problems on metric spaces: Furthest Pair, k- median, Minimum Routing Cost Spanning Tree, Multiple Sequence Alignment, Maximum Traveling Salesman Problem, Maximum Spanning Tree and Average Distance. The key property of our algorithms is that their running time is linear in the number of metric space points. As the full specification o`f an n-point metric space is of size \Theta(n 2 ), the complexity of our algorithms is sublinear with respect to the input size. All previous algorithms (exact or approximate) for the problems we consider have running time\Omega\Gamma n 2 ). We believe that our techniques can be applied to get similar bounds for other problems. 1 Introducti...
We consider the problem of computing the weight of a Euclidean minimum spanning tree for a set of n ...
The Metric Traveling Salesman Problem (TSP) is a classical NP-hard optimization problem. The double-...
We compute the k smallest spanning trees of a point set in the planar Euclidean metric in time O(n l...
In this paper we present a sublinear-time $(1+\varepsilon)$-approximation randomized algorithm to es...
Let (X, d) be an n-point metric space. We assume that (X, d) is given in the distance oracle model, ...
We consider the problem of computing the weight of a Euclidean minimum spanning tree for a set of ¦ ...
1 Introduction Traditionally, a linear time algorithm has been held as the gold standard of efficien...
Abstract. The problem of finding a minimum spanning tree connecting n points in a k-dimensional spac...
Abstract. The problem of finding a minimum spaYlning tree connecting n points in a k-dimensional spa...
It is shown that a minimum spanning tree of $n$ points in $R^d$ under any fixed $L_p$-metric, wit...
We consider the problem of computing the weight of a Euclidean minimum spanning tree for a ¦ set of ...
We give sublinear-time approximation algorithms for some optimization problems arising in machine le...
Abstract- My idea behind this research is to find a new greedy way to find the optimal solution in E...
We present an (1+ε)-approximation algorithm for computing the minimum-spanning tree of points in a p...
We consider the design of sublinear space and query complexity algorithms for estimating the cost of...
We consider the problem of computing the weight of a Euclidean minimum spanning tree for a set of n ...
The Metric Traveling Salesman Problem (TSP) is a classical NP-hard optimization problem. The double-...
We compute the k smallest spanning trees of a point set in the planar Euclidean metric in time O(n l...
In this paper we present a sublinear-time $(1+\varepsilon)$-approximation randomized algorithm to es...
Let (X, d) be an n-point metric space. We assume that (X, d) is given in the distance oracle model, ...
We consider the problem of computing the weight of a Euclidean minimum spanning tree for a set of ¦ ...
1 Introduction Traditionally, a linear time algorithm has been held as the gold standard of efficien...
Abstract. The problem of finding a minimum spanning tree connecting n points in a k-dimensional spac...
Abstract. The problem of finding a minimum spaYlning tree connecting n points in a k-dimensional spa...
It is shown that a minimum spanning tree of $n$ points in $R^d$ under any fixed $L_p$-metric, wit...
We consider the problem of computing the weight of a Euclidean minimum spanning tree for a ¦ set of ...
We give sublinear-time approximation algorithms for some optimization problems arising in machine le...
Abstract- My idea behind this research is to find a new greedy way to find the optimal solution in E...
We present an (1+ε)-approximation algorithm for computing the minimum-spanning tree of points in a p...
We consider the design of sublinear space and query complexity algorithms for estimating the cost of...
We consider the problem of computing the weight of a Euclidean minimum spanning tree for a set of n ...
The Metric Traveling Salesman Problem (TSP) is a classical NP-hard optimization problem. The double-...
We compute the k smallest spanning trees of a point set in the planar Euclidean metric in time O(n l...