Mixed-integer programming (MIP) technology offers a generic way of formulating and solving combinatorial optimization problems. While generally reliable, state-of-the-art MIP solvers base many crucial decisions on hand-crafted heuristics, largely ignoring common patterns within a given instance distribution of the problem of interest. Here, we propose MIP-GNN, a general framework for enhancing such solvers with data-driven insights. By encoding the variable-constraint interactions of a given mixed-integer linear program (MILP) as a bipartite graph, we leverage state-of-the-art graph neural network architectures to predict variable biases, i.e., component-wise averages of (near) optimal solutions, indicating how likely a variable will be set...
Discrete black-box optimization problems are challenging for model-based optimization (MBO) algorith...
Thesis: Ph. D., Massachusetts Institute of Technology, Sloan School of Management, Operations Resear...
Neural Combinatorial Optimization approaches have recently leveraged the expressiveness and flexibil...
Mixed-integer programming (MIP) technology offers a generic way of formulating and solving combinato...
Mixed Integer Programming (MIP) is one of the most widely used modeling techniques for combinatorial...
Recent work has shown potential in using Mixed Integer Programming (MIP) solvers to optimize certain...
Artificial Neural Networks (ANNs) are prevalent machine learning models that are applied across vari...
Modern Mixed-Integer Programming (MIP) solvers exploit a rich arsenal of tools to attack hard proble...
Recently, ReLU neural networks have been modelled as constraints in mixed integer linear programming...
Cut selection is a subroutine used in all modern mixed-integer linear programming solvers with the g...
Recent work has shown potential in using Mixed Integer Programming (MIP) solvers to optimize certain...
Combinatorial optimization is a well-established area in operations research and computer science. U...
Combinatorial optimization problems are typically tackled by the branch-and-bound paradigm. We propo...
The evolution of Mixed-Integer Linear Programming (MIP) solvers has reached a very stable and effect...
In line with the growing trend of using machine learning to help solve combinatorial optimisation pr...
Discrete black-box optimization problems are challenging for model-based optimization (MBO) algorith...
Thesis: Ph. D., Massachusetts Institute of Technology, Sloan School of Management, Operations Resear...
Neural Combinatorial Optimization approaches have recently leveraged the expressiveness and flexibil...
Mixed-integer programming (MIP) technology offers a generic way of formulating and solving combinato...
Mixed Integer Programming (MIP) is one of the most widely used modeling techniques for combinatorial...
Recent work has shown potential in using Mixed Integer Programming (MIP) solvers to optimize certain...
Artificial Neural Networks (ANNs) are prevalent machine learning models that are applied across vari...
Modern Mixed-Integer Programming (MIP) solvers exploit a rich arsenal of tools to attack hard proble...
Recently, ReLU neural networks have been modelled as constraints in mixed integer linear programming...
Cut selection is a subroutine used in all modern mixed-integer linear programming solvers with the g...
Recent work has shown potential in using Mixed Integer Programming (MIP) solvers to optimize certain...
Combinatorial optimization is a well-established area in operations research and computer science. U...
Combinatorial optimization problems are typically tackled by the branch-and-bound paradigm. We propo...
The evolution of Mixed-Integer Linear Programming (MIP) solvers has reached a very stable and effect...
In line with the growing trend of using machine learning to help solve combinatorial optimisation pr...
Discrete black-box optimization problems are challenging for model-based optimization (MBO) algorith...
Thesis: Ph. D., Massachusetts Institute of Technology, Sloan School of Management, Operations Resear...
Neural Combinatorial Optimization approaches have recently leveraged the expressiveness and flexibil...