The design of online algorithms has tended to focus on algorithms with worst-case guarantees, e.g., bounds on the competitive ratio. However, it is well-known that such algorithms are often overly pessimistic, performing sub-optimally on non-worst-case inputs. In this paper, we develop an approach for data-driven design of online algorithms that maintain near-optimal worst-case guarantees while also performing learning in order to perform well for typical inputs. Our approach is to identify policy classes that admit global worst-case guarantees, and then perform learning using historical data within the policy classes. We demonstrate the approach in the context of two classical problems, online knapsack and online set cover, proving competi...
We propose a new model for augmenting algorithms with predictions by requiring that they are formall...
Online algorithms are used in a variety of situations such as forex trading, cache replacement, and ...
We study the Online Budgeted Maximum Coverage (OBMC) problem. Subsets of a weighted ground set U ar...
The design of online algorithms has tended to focus on algorithms with worst-case guarantees, e.g., ...
International audienceWe consider the problem of online optimization, where a learner chooses a deci...
The online knapsack problem is a classic online resource allocation problem in networking and operat...
We introduce and study a general version of the fractional online knapsack problem with multiple kna...
We examine the problem of smoothed online optimization, where a decision maker must sequentially cho...
The classical analysis of online algorithms, due to its worst-case nature, can be quite pessimistic ...
AbstractWe consider a model for online computation in which the online algorithm receives, together ...
We study the relationship between the competitive ratio and the tail distribution of randomized onli...
We present methods for online linear optimization that take advantage of benign (as opposed to worst...
The knapsack problem is one of the classical problems in combinatorial optimization: Given a set of ...
We introduce a novel method for the rigorous quantitative evaluation of online algorithms that relax...
A variant of the online knapsack problem is considered in the settings of trusted and untrusted pred...
We propose a new model for augmenting algorithms with predictions by requiring that they are formall...
Online algorithms are used in a variety of situations such as forex trading, cache replacement, and ...
We study the Online Budgeted Maximum Coverage (OBMC) problem. Subsets of a weighted ground set U ar...
The design of online algorithms has tended to focus on algorithms with worst-case guarantees, e.g., ...
International audienceWe consider the problem of online optimization, where a learner chooses a deci...
The online knapsack problem is a classic online resource allocation problem in networking and operat...
We introduce and study a general version of the fractional online knapsack problem with multiple kna...
We examine the problem of smoothed online optimization, where a decision maker must sequentially cho...
The classical analysis of online algorithms, due to its worst-case nature, can be quite pessimistic ...
AbstractWe consider a model for online computation in which the online algorithm receives, together ...
We study the relationship between the competitive ratio and the tail distribution of randomized onli...
We present methods for online linear optimization that take advantage of benign (as opposed to worst...
The knapsack problem is one of the classical problems in combinatorial optimization: Given a set of ...
We introduce a novel method for the rigorous quantitative evaluation of online algorithms that relax...
A variant of the online knapsack problem is considered in the settings of trusted and untrusted pred...
We propose a new model for augmenting algorithms with predictions by requiring that they are formall...
Online algorithms are used in a variety of situations such as forex trading, cache replacement, and ...
We study the Online Budgeted Maximum Coverage (OBMC) problem. Subsets of a weighted ground set U ar...