Integer programming (IP) is an important and challenging problem. Approximate methods have shown promising performance on both effectiveness and efficiency for solving the IP problem. However, we observed that a large fraction of variables solved by some iterative approximate methods fluctuate around their final converged discrete states in very long iterations. Inspired by this observation, we aim to accelerate these approximate methods by early fixing these fluctuated variables to their converged states while not significantly harming the solution accuracy. To this end, we propose an early fixing framework along with the approximate method. We formulate the whole early fixing process as a Markov decision process, and train it using imitat...
We consider the problem of learning Bayesiannetworks (BNs) from complete discrete data.This problem ...
Summary form only given. Integer programming is the problem of maximizing a linear function over the...
Powerful results from the theory of integer programming have recently led to substantial advances in...
Thesis (Ph.D.)--Massachusetts Institute of Technology, Sloan School of Management, Operations Resear...
Integer programs with a fixed number of constraints are solvable in pseudo -polynomial time in the l...
It is shown that the optimum of an integer program in fixed dimension, which is defined by a fixed n...
It is shown that the optimum of an integer program in fixed dimension, which is defined by a fixed...
When integer programming (IP) models are used in operational situations there is a need to consider ...
Many problems in machine learning can be solved by rounding the solution of an appropriate linear pr...
Integer programs (IPs) are mathematical models that can provide an optimal solution to a variety of ...
Many fundamental NP-hard problems can be formulated as integer linear programs (ILPs). A famous algo...
Several important NP-hard combinatorial optimization problems can be posed as packing/covering integ...
Integer programs provide a powerful abstraction for representing a wide range of real-world scheduli...
When integer programming (IP) models are used in operational situations there is a need to consider ...
We study the general integer programming problem where the number of variables $n$ is a variable par...
We consider the problem of learning Bayesiannetworks (BNs) from complete discrete data.This problem ...
Summary form only given. Integer programming is the problem of maximizing a linear function over the...
Powerful results from the theory of integer programming have recently led to substantial advances in...
Thesis (Ph.D.)--Massachusetts Institute of Technology, Sloan School of Management, Operations Resear...
Integer programs with a fixed number of constraints are solvable in pseudo -polynomial time in the l...
It is shown that the optimum of an integer program in fixed dimension, which is defined by a fixed n...
It is shown that the optimum of an integer program in fixed dimension, which is defined by a fixed...
When integer programming (IP) models are used in operational situations there is a need to consider ...
Many problems in machine learning can be solved by rounding the solution of an appropriate linear pr...
Integer programs (IPs) are mathematical models that can provide an optimal solution to a variety of ...
Many fundamental NP-hard problems can be formulated as integer linear programs (ILPs). A famous algo...
Several important NP-hard combinatorial optimization problems can be posed as packing/covering integ...
Integer programs provide a powerful abstraction for representing a wide range of real-world scheduli...
When integer programming (IP) models are used in operational situations there is a need to consider ...
We study the general integer programming problem where the number of variables $n$ is a variable par...
We consider the problem of learning Bayesiannetworks (BNs) from complete discrete data.This problem ...
Summary form only given. Integer programming is the problem of maximizing a linear function over the...
Powerful results from the theory of integer programming have recently led to substantial advances in...