In this paper we introduce the semi-online model that generalizes the classical online computational model. The semi-online model postulates that the unknown future has a predictable part and an adversarial part; these parts can be arbitrarily interleaved. An algorithm in this model operates as in the standard online model, i.e., makes an irrevocable decision at each step. We consider bipartite matching in the semi-online model. Our main contributions are competitive algorithms for this problem and a near-matching hardness bound. The competitive ratio of the algorithms nicely interpolates between the truly offline setting (i.e., no adversarial part) and the truly online setting (i.e., no predictable part)
We propose a model for online graph problems where algorithms are given access to an oracle that pre...
The problem of online matching with stochastic rewards is a generalization of the online bipartite m...
We study truthful mechanisms for welfare maximization in online bipartite matching. In our (multi-pa...
In an online problem, the input is revealed one piece at a time. In every time step, the online algo...
We consider variants of the online stochastic bipartite matching problem motivated by Internet adver...
We consider semidefinite programming through the lens of online algorithms - what happens if not all...
The Online Bipartite Matching Problem is a well-studied problem in theoretical computer science that...
We study the two-stage vertex-weighted online bipartite matching problem of Feng, Niazadeh, and Sabe...
Online bipartite matching and allocation models are widely used to analyze and design markets such a...
We revisit the fully online matching model (Huang et al., 2020), an extension of the classic online ...
The classical analysis of online algorithms, due to its worst-case nature, can be quite pessimistic ...
Online matching has received significant attention over the last 15 years due to its close connectio...
AbstractIn the following paper an alternative online variant of the matching problem in bipartite gr...
In the online metric bipartite matching problem, we are given a set S of server locations in a metri...
For numerous online bipartite matching problems, such as edge-weighted matching and matching under t...
We propose a model for online graph problems where algorithms are given access to an oracle that pre...
The problem of online matching with stochastic rewards is a generalization of the online bipartite m...
We study truthful mechanisms for welfare maximization in online bipartite matching. In our (multi-pa...
In an online problem, the input is revealed one piece at a time. In every time step, the online algo...
We consider variants of the online stochastic bipartite matching problem motivated by Internet adver...
We consider semidefinite programming through the lens of online algorithms - what happens if not all...
The Online Bipartite Matching Problem is a well-studied problem in theoretical computer science that...
We study the two-stage vertex-weighted online bipartite matching problem of Feng, Niazadeh, and Sabe...
Online bipartite matching and allocation models are widely used to analyze and design markets such a...
We revisit the fully online matching model (Huang et al., 2020), an extension of the classic online ...
The classical analysis of online algorithms, due to its worst-case nature, can be quite pessimistic ...
Online matching has received significant attention over the last 15 years due to its close connectio...
AbstractIn the following paper an alternative online variant of the matching problem in bipartite gr...
In the online metric bipartite matching problem, we are given a set S of server locations in a metri...
For numerous online bipartite matching problems, such as edge-weighted matching and matching under t...
We propose a model for online graph problems where algorithms are given access to an oracle that pre...
The problem of online matching with stochastic rewards is a generalization of the online bipartite m...
We study truthful mechanisms for welfare maximization in online bipartite matching. In our (multi-pa...