Integer Linear Programming (ILP) and its mixed variant (MILP) are archetypical examples of NP-complete optimization problems which have a wide range of applications in various areas of artificial intelligence. However, we still lack a thorough understanding of which structural restrictions make these problems tractable. Here we focus on structure captured via so-called decompositional parameters, which have been highly successful in fields such as boolean satisfiability and constraint satisfaction but have not yet reached their full potential in the ILP setting. In particular, primal treewidth (an established decompositional parameter) can only be algorithmically exploited to solve ILP under restricted circumstances. Our main contribution ...
In this paper we describe two Propositional Satisfiability-based algorithms for solving 0-1 integer ...
Kernelization is a theoretical formalization of efficient preprocessing for NP-hard problems. Empiri...
The thesis argues the case for exploiting certain structures in integer linear programs. Integer ...
Integer Linear Programming (ILP) can be seen as the archetypical problem for NP-complete optimizatio...
Integer Linear Programming (ILP) can be seen as the archetypical problem for NP-complete optimizatio...
Solving (mixed) integer (linear) programs, (M)I(L)Ps for short, is a fundamental optimisation task w...
We survey a number of integer programming formulations for the pathwidth and treewidth problems. The...
Integer Linear Programming (ILP) has a broad range of applications in various areas of artificial in...
Integer Linear Programming (ILP) is among the most successful and general paradigms for solving comp...
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...
Integer Linear Programming (ILP) has a broad range of applications in various areas of artificial in...
Recently a strong connection has been shown between the tractability of integer programming (IP) wit...
Kernelization is a theoretical formalization of efficient preprocessing for NP-hard problems. Empiri...
Recently a number of algorithmic results have appeared which show the tractability of Integer Linear...
In this paper we describe two Propositional Satisfiability-based algorithms for solving 0-1 integer ...
Kernelization is a theoretical formalization of efficient preprocessing for NP-hard problems. Empiri...
The thesis argues the case for exploiting certain structures in integer linear programs. Integer ...
Integer Linear Programming (ILP) can be seen as the archetypical problem for NP-complete optimizatio...
Integer Linear Programming (ILP) can be seen as the archetypical problem for NP-complete optimizatio...
Solving (mixed) integer (linear) programs, (M)I(L)Ps for short, is a fundamental optimisation task w...
We survey a number of integer programming formulations for the pathwidth and treewidth problems. The...
Integer Linear Programming (ILP) has a broad range of applications in various areas of artificial in...
Integer Linear Programming (ILP) is among the most successful and general paradigms for solving comp...
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...
Integer Linear Programming (ILP) has a broad range of applications in various areas of artificial in...
Recently a strong connection has been shown between the tractability of integer programming (IP) wit...
Kernelization is a theoretical formalization of efficient preprocessing for NP-hard problems. Empiri...
Recently a number of algorithmic results have appeared which show the tractability of Integer Linear...
In this paper we describe two Propositional Satisfiability-based algorithms for solving 0-1 integer ...
Kernelization is a theoretical formalization of efficient preprocessing for NP-hard problems. Empiri...
The thesis argues the case for exploiting certain structures in integer linear programs. Integer ...