We show how binary decision diagrams (BDDs) can be used to solve and obtain postoptimality analysis for linear and nonlinear integer programming problems with binary or general integer variables. The constraint set corresponds to a unique reduced BDD that represents all feasible or near-optimal solutions, and in which optimal solutions correspond to certain shortest paths. The BDD can be queried in real time for in-depth postoptimality reasoning. The approach is equally effective for linear and nonlinear problems. There are currently no other methods for obtaining such an analysis, short of repeatedly re-solving the problem. We illustrate the analysis on capital budgeting and network reliability problems
Design of digital systems is based on various specifications of Boolean functions, most often in a f...
Decision diagrams (DDs) are graphical structures that can be used to solve discrete optimization pro...
In this paper we introduce a new method for generating heuristic solutions to binary optimization pr...
In recent work binary decision diagrams (BDDs) were introduced as a technique for postoptimality ana...
In binary decision diagrams (BDDs) were introduced as a technique for postoptimality analysis for in...
In this work we show how Binary Decision Diagrams can be used as a powerful tool for 0/1~Integer Pr...
A recent development in the field of discrete optimization is the combined use of (binary) decision ...
Decision diagrams are compact graphical representations of Boolean functions originally introduced f...
We propose a general branch-and-bound algorithm for discrete optimization in which binary decision d...
<p>This thesis offers methodological and computational contributions to integer and mixed-integer li...
We propose a general branch-and-bound algorithm for discrete optimization in which binary decision d...
The use of decision diagrams has recently emerged as a viable general solution approach for solving ...
We propose a general branch-and-bound algorithm for discrete optimization in which binary decision d...
Branch & Cut is today’s state-of-the-art method to solve 0/1-integer linear programs. Important ...
Abstract. Many BDD (binary decision diagram) models are motivated by CAD applications and have led t...
Design of digital systems is based on various specifications of Boolean functions, most often in a f...
Decision diagrams (DDs) are graphical structures that can be used to solve discrete optimization pro...
In this paper we introduce a new method for generating heuristic solutions to binary optimization pr...
In recent work binary decision diagrams (BDDs) were introduced as a technique for postoptimality ana...
In binary decision diagrams (BDDs) were introduced as a technique for postoptimality analysis for in...
In this work we show how Binary Decision Diagrams can be used as a powerful tool for 0/1~Integer Pr...
A recent development in the field of discrete optimization is the combined use of (binary) decision ...
Decision diagrams are compact graphical representations of Boolean functions originally introduced f...
We propose a general branch-and-bound algorithm for discrete optimization in which binary decision d...
<p>This thesis offers methodological and computational contributions to integer and mixed-integer li...
We propose a general branch-and-bound algorithm for discrete optimization in which binary decision d...
The use of decision diagrams has recently emerged as a viable general solution approach for solving ...
We propose a general branch-and-bound algorithm for discrete optimization in which binary decision d...
Branch & Cut is today’s state-of-the-art method to solve 0/1-integer linear programs. Important ...
Abstract. Many BDD (binary decision diagram) models are motivated by CAD applications and have led t...
Design of digital systems is based on various specifications of Boolean functions, most often in a f...
Decision diagrams (DDs) are graphical structures that can be used to solve discrete optimization pro...
In this paper we introduce a new method for generating heuristic solutions to binary optimization pr...