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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
Finding Support Examples for In-Context Learning0
Learning Large Neighborhood Search for Vehicle Routing in Airport Ground HandlingCode1
Deep reinforced learning heuristic tested on spin-glass ground states: The larger picture0
Automated Graph Genetic Algorithm based Puzzle Validation for Faster Game Design0
DIFUSCO: Graph-based Diffusion Solvers for Combinatorial OptimizationCode2
Graph Adversarial Immunization for Certifiable RobustnessCode0
Expediting Distributed DNN Training with Device Topology-Aware Graph Deployment0
A full-stack view of probabilistic computing with p-bits: devices, architectures and algorithms0
Digging Deeper: Operator Analysis for Optimizing Nonlinearity of Boolean Functions0
Nonlinear Random Matrices and Applications to the Sum of Squares Hierarchy0
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