Integer Linear Programming (ILP) can be seen as the archetypical problem for NP-complete optimization problems, and a wide range of problems in artificial intelligence are solved in practice via a translation to ILP. Despite its huge range of applications, only few tractable fragments of ILP are known, probably the most prominent of which is based on the notion of total unimodularity. Using entirely different techniques, we identify new tractable fragments of ILP by studying structural parameterizations of the constraint matrix within the framework of parameterized complexity. In particular, we show that ILP is fixed-parameter tractable when parameterized by the treedepth of the constraint matrix and the maximum absolute value of any coeff...
Solving (mixed) integer (linear) programs, (M)I(L)Ps for short, is a fundamental optimisation task w...
Kernelization is a theoretical formalization of efficient preprocessing for NP-hard problems. Empiri...
An intensive line of research on fixed parameter tractability of integer programming is focused on e...
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) and its mixed variant (MILP) are archetypical examples of NP-comple...
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...
Recently a number of algorithmic results have appeared which show the tractability of Integer Linear...
Integer Linear Programming (ILP) is among the most successful and general paradigms for solving comp...
In this talk, I will show how any integer linear program (ILP) defined by a constraint matrix whose ...
Integer linear programs (ILPs) are a widely applied framework for dealing with combinatorial problem...
A long line of research on fixed parameter tractability of integer programming culminated with showi...
Powerful results from the theory of integer programming have recently led to substantial advances in...
Kernelization is a theoretical formalization of efficient preprocessing for NP-hard problems. Empiri...
Solving (mixed) integer (linear) programs, (M)I(L)Ps for short, is a fundamental optimisation task w...
Kernelization is a theoretical formalization of efficient preprocessing for NP-hard problems. Empiri...
An intensive line of research on fixed parameter tractability of integer programming is focused on e...
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) and its mixed variant (MILP) are archetypical examples of NP-comple...
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...
Recently a number of algorithmic results have appeared which show the tractability of Integer Linear...
Integer Linear Programming (ILP) is among the most successful and general paradigms for solving comp...
In this talk, I will show how any integer linear program (ILP) defined by a constraint matrix whose ...
Integer linear programs (ILPs) are a widely applied framework for dealing with combinatorial problem...
A long line of research on fixed parameter tractability of integer programming culminated with showi...
Powerful results from the theory of integer programming have recently led to substantial advances in...
Kernelization is a theoretical formalization of efficient preprocessing for NP-hard problems. Empiri...
Solving (mixed) integer (linear) programs, (M)I(L)Ps for short, is a fundamental optimisation task w...
Kernelization is a theoretical formalization of efficient preprocessing for NP-hard problems. Empiri...
An intensive line of research on fixed parameter tractability of integer programming is focused on e...