In an online problem, the input is revealed one piece at a time. In every time step, the online algorithm has to produce a part of the output, based on the partial knowledge of the input. Such decisions are irrevocable, and thus online algorithms usually lead to nonoptimal solutions. The impact of the partial knowledge depends strongly on the problem. If the algorithm is allowed to read binary information about the future, the amount of bits read that allow the algorithm to solve the problem optimally is the socalled advice complexity. The quality of an online algorithm is measured by its competitive ratio, which compares its performance to that of an optimal offline algorithm. In this paper we study online bipartite matchings focusing on t...
The online matching problem was introduced by Karp, Vazirani and Vazirani nearly three decades ago. ...
Celem tej pracy jest przegląd i analiza algorytmów online znajdujących skojarzenia w grafach dwudzie...
AbstractGiven a set S⊆R of points on the line, we consider the task of matching a sequence (r1,r2,…)...
In an online problem, the input is revealed one piece at a time. In every time step, the online algo...
We introduce and study online versions of weighted matching problems in metric spaces. We present a ...
We investigate online maximum cardinality matching, a central problem in ad allocation. In this prob...
We study the average performance of online greedy matching algorithms on G(n, n, p), the random bipa...
Abstract. We consider the online metric matching problem. In this problem, we are given a graph with...
In this paper we introduce the semi-online model that generalizes the classical online computational...
We study a weighted online bipartite matching problem: G(V1, V2, E) is a weighted bipartite graph wh...
We consider the online metric matching problem. In this problem, we are given a graph with edge weig...
We consider the online metric matching problem. In this problem, we are given a graph with edge weig...
We generalize the model of online computation with three players (algorithm, adversary and an oracle...
We consider variants of the online stochastic bipartite matching problem motivated by Internet adver...
In online problems, the input forms a finite sequence of requests. Each request must be processed, i...
The online matching problem was introduced by Karp, Vazirani and Vazirani nearly three decades ago. ...
Celem tej pracy jest przegląd i analiza algorytmów online znajdujących skojarzenia w grafach dwudzie...
AbstractGiven a set S⊆R of points on the line, we consider the task of matching a sequence (r1,r2,…)...
In an online problem, the input is revealed one piece at a time. In every time step, the online algo...
We introduce and study online versions of weighted matching problems in metric spaces. We present a ...
We investigate online maximum cardinality matching, a central problem in ad allocation. In this prob...
We study the average performance of online greedy matching algorithms on G(n, n, p), the random bipa...
Abstract. We consider the online metric matching problem. In this problem, we are given a graph with...
In this paper we introduce the semi-online model that generalizes the classical online computational...
We study a weighted online bipartite matching problem: G(V1, V2, E) is a weighted bipartite graph wh...
We consider the online metric matching problem. In this problem, we are given a graph with edge weig...
We consider the online metric matching problem. In this problem, we are given a graph with edge weig...
We generalize the model of online computation with three players (algorithm, adversary and an oracle...
We consider variants of the online stochastic bipartite matching problem motivated by Internet adver...
In online problems, the input forms a finite sequence of requests. Each request must be processed, i...
The online matching problem was introduced by Karp, Vazirani and Vazirani nearly three decades ago. ...
Celem tej pracy jest przegląd i analiza algorytmów online znajdujących skojarzenia w grafach dwudzie...
AbstractGiven a set S⊆R of points on the line, we consider the task of matching a sequence (r1,r2,…)...