Add to ORKGMost results for online decision problems with structured concepts, such as trees or cuts, assume linear costs. In many settings, however, nonlinear costs are more realistic. Owing to their non-separability, these lead to much harder optimization problems. Going beyond linearity, we address online approximation algorithms for structured concepts that allow the cost to be submodular, i.e., nonseparable. In particular, we show regret bounds for three Hannan-consistent strategies that capture different settings. Our results also tighten a regret bound for unconstrained online submodular minimization
Combinatorial problems with submodular cost functions have recently drawn interest. In a standard co...
Combinatorial problems with submodular cost functions have recently drawn interest. In a standard co...
International audienceIn this paper, we study fundamental problems of maximizing DR-submodular conti...
Most results for online decision problems with structured concepts, such as trees or cuts, assume li...
Most results for online decision problems with structured concepts, such as trees or cuts, assume li...
Most results for online decision problems with structured concepts, such as trees or cuts, assume li...
Most results for online decision problems with structured concepts, such as trees or cuts, assume li...
Most results for online decision problems with structured concepts, such as trees or cuts, as-sume l...
Building on recent results for submodular minimization with combinatorial constraints, and on online...
Building on recent results for submodular minimization with combinatorial constraints, and on online...
We consider an online decision problem over a discrete space in which the loss function is submod-ul...
Motivated by online decision-making in time-varying combinatorial environments, we study the problem...
We address online linear optimization problems when the possible actions of the decision maker are r...
International audienceWe study various discrete nonlinear combinatorial optimization problems in an ...
Submodular functions are an important class of functions in combinatorial optimiza-tion which satisf...
Combinatorial problems with submodular cost functions have recently drawn interest. In a standard co...
Combinatorial problems with submodular cost functions have recently drawn interest. In a standard co...
International audienceIn this paper, we study fundamental problems of maximizing DR-submodular conti...
Most results for online decision problems with structured concepts, such as trees or cuts, assume li...
Most results for online decision problems with structured concepts, such as trees or cuts, assume li...
Most results for online decision problems with structured concepts, such as trees or cuts, assume li...
Most results for online decision problems with structured concepts, such as trees or cuts, assume li...
Most results for online decision problems with structured concepts, such as trees or cuts, as-sume l...
Building on recent results for submodular minimization with combinatorial constraints, and on online...
Building on recent results for submodular minimization with combinatorial constraints, and on online...
We consider an online decision problem over a discrete space in which the loss function is submod-ul...
Motivated by online decision-making in time-varying combinatorial environments, we study the problem...
We address online linear optimization problems when the possible actions of the decision maker are r...
International audienceWe study various discrete nonlinear combinatorial optimization problems in an ...
Submodular functions are an important class of functions in combinatorial optimiza-tion which satisf...
Combinatorial problems with submodular cost functions have recently drawn interest. In a standard co...
Combinatorial problems with submodular cost functions have recently drawn interest. In a standard co...
International audienceIn this paper, we study fundamental problems of maximizing DR-submodular conti...