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Combinatorial Optimization

Combinatorial Optimization is a category of problems which requires optimizing a function over a combination of discrete objects and the solutions are constrained. Examples include finding shortest paths in a graph, maximizing value in the Knapsack problem and finding boolean settings that satisfy a set of constraints. Many of these problems are NP-Hard, which means that no polynomial time solution can be developed for them. Instead, we can only produce approximations in polynomial time that are guaranteed to be some factor worse than the true optimal solution.

Source: Recent Advances in Neural Program Synthesis

Papers

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TitleStatusHype
Learn to Solve Vehicle Routing Problems ASAP: A Neural Optimization Approach for Time-Constrained Vehicle Routing Problems with Finite Vehicle Fleet0
Assessing and Enhancing Graph Neural Networks for Combinatorial Optimization: Novel Approaches and Application in Maximum Independent Set Problems0
A Random-Key Optimizer for Combinatorial Optimization0
Neural Networks and (Virtual) Extended Formulations0
Deep memetic models for combinatorial optimization problems: application to the tool switching problem0
Towards Geometry-Preserving Reductions Between Constraint Satisfaction Problems (and other problems in NP)0
Multi-IRS Enhanced Wireless Coverage: Deployment Optimization Based on Large-Scale Channel Knowledge0
Theoretically Grounded Pruning of Large Ground Sets for Constrained, Discrete Optimization0
Permutation Picture of Graph Combinatorial Optimization Problems0
Offline reinforcement learning for job-shop scheduling problems0
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