Integer Linear Programming (ILP) is among the most successful and general paradigms for solving computationally intractable optimization problems in computer science. ILP is NP-complete, and until recently we have lacked a systematic study of the complexity of ILP through the lens of variable-constraint interactions. This changed drastically in recent years thanks to a series of results that together lay out a detailed complexity landscape for the problem centered around the structure of graphical representations of instances. The aim of this survey is to summarize these recent developments, put them into context and a unified format, and make them more approachable for experts from many diverse backgrounds
Linear Programming (LP) and Integer Linear Programming (ILP) are two of the most powerful tools ever...
The purpose of this thesis is to provide analysis of the modem development of the methods for soluti...
In this paper we describe a new branch and bound algorithm for solving 0-1 integer linear programs (...
Integer Linear Programming (ILP) is among the most successful and general paradigms for solving comp...
Recently a number of algorithmic results have appeared which show the tractability of Integer Linear...
The thesis argues the case for exploiting certain structures in integer linear programs. Integer ...
Integer Linear Programming (ILP) has a broad range of applications in various areas of artificial in...
Integer Linear Programming (ILP) can be seen as the archetypical problem for NP-complete optimizatio...
Integer Linear Programming (ILP) has a broad range of applications in various areas of artificial in...
Integer Linear Programming (ILP) can be seen as the archetypical problem for NP-complete optimizatio...
Integer Linear Programming (ILP) and its mixed variant (MILP) are archetypical examples of NP-comple...
In this review we describe recent developments in linear and integer (linear) programming. For over ...
Linear programs, or LPs, are often used in optimization problems, such as improving manufacturing ef...
Powerful results from the theory of integer programming have recently led to substantial advances in...
Recently a strong connection has been shown between the tractability of integer programming (IP) wit...
Linear Programming (LP) and Integer Linear Programming (ILP) are two of the most powerful tools ever...
The purpose of this thesis is to provide analysis of the modem development of the methods for soluti...
In this paper we describe a new branch and bound algorithm for solving 0-1 integer linear programs (...
Integer Linear Programming (ILP) is among the most successful and general paradigms for solving comp...
Recently a number of algorithmic results have appeared which show the tractability of Integer Linear...
The thesis argues the case for exploiting certain structures in integer linear programs. Integer ...
Integer Linear Programming (ILP) has a broad range of applications in various areas of artificial in...
Integer Linear Programming (ILP) can be seen as the archetypical problem for NP-complete optimizatio...
Integer Linear Programming (ILP) has a broad range of applications in various areas of artificial in...
Integer Linear Programming (ILP) can be seen as the archetypical problem for NP-complete optimizatio...
Integer Linear Programming (ILP) and its mixed variant (MILP) are archetypical examples of NP-comple...
In this review we describe recent developments in linear and integer (linear) programming. For over ...
Linear programs, or LPs, are often used in optimization problems, such as improving manufacturing ef...
Powerful results from the theory of integer programming have recently led to substantial advances in...
Recently a strong connection has been shown between the tractability of integer programming (IP) wit...
Linear Programming (LP) and Integer Linear Programming (ILP) are two of the most powerful tools ever...
The purpose of this thesis is to provide analysis of the modem development of the methods for soluti...
In this paper we describe a new branch and bound algorithm for solving 0-1 integer linear programs (...