Kernelization is a formalization of efficient preprocessing for \mathsf {np}\mathsf {np}-hard problems using the framework of parameterized complexity. Among open problems in kernelization it has been asked many times whether there are deterministic polynomial kernelizations for subset sum and knapsack when parameterized by the number n of items.we answer both questions affirmatively by using an algorithm for compressing numbers due to frank and tardos (combinatorica 1987). This result had been first used by marx and végh (icalp 2013) in the context of kernelization. We further illustrate its applicability by giving polynomial kernels also for weighted versions of several well-studied parameterized problems. Furthermore, when parameterized ...
We introduce the framework of cross-composition for proving kernelization lower bounds. A classical ...
In this paper we propose a new framework for analyzing the performance of preprocessing algorithms. ...
Makespan minimization (on parallel identical or unrelated machines) is arguably the most natural and...
Kernelization is a formalization of efficient preprocessing for \mathsf {np}\mathsf {np}-hard proble...
Kernelization is a formalization of efficient preprocessing for NP-hard problems using the framework...
Kernelization is a notion from parameterized complexity that captures the concept of efficient prepr...
This paper focuses on kernelization algorithms for the fundamental Knapsack problem. A kernelization...
In parameterized algorithmics the process of kernelization is defined as a polynomial time algorithm...
A fundamental technique in the design of parameterized algorithms is kerneliza-tion: Given a problem...
In parameterized complexity each problem instance comes with a parameter k, and a parameterized prob...
We first present a method to rule out the existence of parameter non-increasing polynomial kerneliza...
Data reduction techniques are widely applied to deal with computationally hard problems in real worl...
Kernelization is the process of transforming the input of a combinatorial decision problem to an equ...
Integer linear programs (ILPs) are a widely applied framework for dealing with combinatorial problem...
Kernelization is a central technique used in parameterized algorithms, and in other approaches for c...
We introduce the framework of cross-composition for proving kernelization lower bounds. A classical ...
In this paper we propose a new framework for analyzing the performance of preprocessing algorithms. ...
Makespan minimization (on parallel identical or unrelated machines) is arguably the most natural and...
Kernelization is a formalization of efficient preprocessing for \mathsf {np}\mathsf {np}-hard proble...
Kernelization is a formalization of efficient preprocessing for NP-hard problems using the framework...
Kernelization is a notion from parameterized complexity that captures the concept of efficient prepr...
This paper focuses on kernelization algorithms for the fundamental Knapsack problem. A kernelization...
In parameterized algorithmics the process of kernelization is defined as a polynomial time algorithm...
A fundamental technique in the design of parameterized algorithms is kerneliza-tion: Given a problem...
In parameterized complexity each problem instance comes with a parameter k, and a parameterized prob...
We first present a method to rule out the existence of parameter non-increasing polynomial kerneliza...
Data reduction techniques are widely applied to deal with computationally hard problems in real worl...
Kernelization is the process of transforming the input of a combinatorial decision problem to an equ...
Integer linear programs (ILPs) are a widely applied framework for dealing with combinatorial problem...
Kernelization is a central technique used in parameterized algorithms, and in other approaches for c...
We introduce the framework of cross-composition for proving kernelization lower bounds. A classical ...
In this paper we propose a new framework for analyzing the performance of preprocessing algorithms. ...
Makespan minimization (on parallel identical or unrelated machines) is arguably the most natural and...