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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
Spatial Field Reconstruction and Sensor Selection in Heterogeneous Sensor Networks with Stochastic Energy Harvesting0
Long Term Memory Network for Combinatorial Optimization Problems0
Evaluation of bioinspired algorithms for the solution of the job scheduling problem0
Maximizing Submodular or Monotone Approximately Submodular Functions by Multi-objective Evolutionary Algorithms0
Scalable Relaxations of Sparse Packing Constraints: Optimal Biocontrol in Predator-Prey Network0
Sensor Selection and Random Field Reconstruction for Robust and Cost-effective Heterogeneous Weather Sensor Networks for the Developing World0
Deep Learning as a Mixed Convex-Combinatorial Optimization ProblemCode0
The Exact Solution to Rank-1 L1-norm TUCKER2 DecompositionCode0
Reparameterizing the Birkhoff Polytope for Variational Permutation Inference0
EB-GLS: An Improved Guided Local Search Based on the Big Valley Structure0
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