We describe a new randomized data structure, the {\em sparse partition}, for solving the dynamic closest-pair problem. Using this data structure the closest pair of a set of $n$ points in $k$-dimensional space, for any fixed $k$, can be found in constant time. If the points are chosen from a finite universe, and if the floor function is available at unit-cost, then the data structure supports insertions into and deletions from the set in expected $O(\log n)$ time and requires expected $O(n)$ space. Here, it is assumed that the updates are chosen by an adversary who does not know the random choices made by the data structure. The data structure can be modified to run in $O(\log^2 n)$ expected time per update in the algebraic decision tree mo...
The goal of our paper is to propose a way to obtain more refined definitions of randomness than the ...
In this paper the asymptotic behaviour of the maximum likelihood and Bayesian estimators of a delay ...
Currently, the preferred method for implementing H^2 estimation algorithms is what is called the arr...
We consider the problem of reporting the pairwise enclosures among a set of $n$ axes-parallel rectan...
Let $S$ be a set of $n$ points in $R^d$, and let each point $p$ of $S$ have a positive weight $w(p)$...
We investigate {\em approximate decision algorithms} for determining whether the minimum Hausdorff d...
The problem to represent very complex systems has been studied by several authors, obtaining ...
Given a set $L$ of $n$ points in the $d$-dimensional Cartesian space $E^d$, and a query specifying a...
For two given point sets, we present a very simple (almost trivial) algorithm to translate one set s...
This work deals with convergence theorems and bounds on the cost of several layout measures for lat...
The Table Maker's Dilemma is the problem of always getting correctly rounded results when computing ...
Glover and Punnen (J. Oper. Res. Soc. 48 (1997) 502) asked whether there exists a polynomial time al...
Best-fit is the best known algorithm for on-line bin-packing, in the sense that no algorithm is know...
In this paper, an efficient algorithm to simultaneously implement array alignment and data/computati...
Necessary and sufficient conditions for metric regularity of (several joint) probabilistic constrain...
The goal of our paper is to propose a way to obtain more refined definitions of randomness than the ...
In this paper the asymptotic behaviour of the maximum likelihood and Bayesian estimators of a delay ...
Currently, the preferred method for implementing H^2 estimation algorithms is what is called the arr...
We consider the problem of reporting the pairwise enclosures among a set of $n$ axes-parallel rectan...
Let $S$ be a set of $n$ points in $R^d$, and let each point $p$ of $S$ have a positive weight $w(p)$...
We investigate {\em approximate decision algorithms} for determining whether the minimum Hausdorff d...
The problem to represent very complex systems has been studied by several authors, obtaining ...
Given a set $L$ of $n$ points in the $d$-dimensional Cartesian space $E^d$, and a query specifying a...
For two given point sets, we present a very simple (almost trivial) algorithm to translate one set s...
This work deals with convergence theorems and bounds on the cost of several layout measures for lat...
The Table Maker's Dilemma is the problem of always getting correctly rounded results when computing ...
Glover and Punnen (J. Oper. Res. Soc. 48 (1997) 502) asked whether there exists a polynomial time al...
Best-fit is the best known algorithm for on-line bin-packing, in the sense that no algorithm is know...
In this paper, an efficient algorithm to simultaneously implement array alignment and data/computati...
Necessary and sufficient conditions for metric regularity of (several joint) probabilistic constrain...
The goal of our paper is to propose a way to obtain more refined definitions of randomness than the ...
In this paper the asymptotic behaviour of the maximum likelihood and Bayesian estimators of a delay ...
Currently, the preferred method for implementing H^2 estimation algorithms is what is called the arr...