We generalise polyhedral projection (Fourier-Motzkin elimination) to integer programming (IP) and derive from this an alternative perspective on IP that parallels the classical theory. We first observe that projection of an IP yields an IP augmented with linear congruence relations and finite-domain variables, which we term a generalised IP. The projection algorithm can be converted to a branch-and-bound algorithm for generalised IP in which the search tree has bounded depth (as opposed to conventional branching, in which there is no bound). It also leads to valid inequalities that are analogous to Chvátal-Gomory cuts but are derived from congruences rather than rounding, and whose rank is bounded by the number of variables. Finally, proje...
Integer programming (discrete optimization) is best used for solving problems involving discrete, wh...
AbstractThis paper considers in a somewhat general setting when a combinatorial optimization problem...
Many program analysis techniques are based on manipulations of sets of integers bounded by linear co...
We generalise polyhedral projection (Fourier–Motzkin elimination) to integer programming (IP) and de...
Abstract. This is an overview of the significance and main uses of projection, lifting and extended ...
This book is an elegant and rigorous presentation of integer programming, exposing the subject’s mat...
The many connections between the methods of Computational Logic and Integer Programming (IP) are sur...
Linear programming (LP) duality is examined in the context of other dualities in mathematics. The ma...
In this survey we address three of the principal algebraic approaches to integer programming. After ...
AbstractIn this survey we address three of the principal algebraic approaches to integer programming...
Integer programming has many applications in economics and management. Apply-ing lexicographic order...
Integer programming (IP), also known as discrete optimization, is a way of modelling a very wide ran...
Integer programming is an important mathematical approach for many decision-making problems. In this...
We review and describe several results regarding integer programming problems in fixed dimension. Fi...
w9255960 Integer programming (IP) problems are difficult to solve due to the integer restrictions im...
Integer programming (discrete optimization) is best used for solving problems involving discrete, wh...
AbstractThis paper considers in a somewhat general setting when a combinatorial optimization problem...
Many program analysis techniques are based on manipulations of sets of integers bounded by linear co...
We generalise polyhedral projection (Fourier–Motzkin elimination) to integer programming (IP) and de...
Abstract. This is an overview of the significance and main uses of projection, lifting and extended ...
This book is an elegant and rigorous presentation of integer programming, exposing the subject’s mat...
The many connections between the methods of Computational Logic and Integer Programming (IP) are sur...
Linear programming (LP) duality is examined in the context of other dualities in mathematics. The ma...
In this survey we address three of the principal algebraic approaches to integer programming. After ...
AbstractIn this survey we address three of the principal algebraic approaches to integer programming...
Integer programming has many applications in economics and management. Apply-ing lexicographic order...
Integer programming (IP), also known as discrete optimization, is a way of modelling a very wide ran...
Integer programming is an important mathematical approach for many decision-making problems. In this...
We review and describe several results regarding integer programming problems in fixed dimension. Fi...
w9255960 Integer programming (IP) problems are difficult to solve due to the integer restrictions im...
Integer programming (discrete optimization) is best used for solving problems involving discrete, wh...
AbstractThis paper considers in a somewhat general setting when a combinatorial optimization problem...
Many program analysis techniques are based on manipulations of sets of integers bounded by linear co...