We present a first theoretical analysis of the power of polynomial-time preprocessing for important combinatorial problems from various areas in AI. We consider problems from Constraint Satisfaction, Global Constraints, Satisfiability, Nonmonotonic and Bayesian Reasoning. We show that, subject to a complexity theoretic assumption, none of the considered problems can be reduced by polynomial-time preprocessing to a problem kernel whose size is polynomial in a structural problem parameter of the input, such as induced width or backdoor size. Our results provide a firm theoretical boundary for the performance of polynomial-time preprocessing algorithms for the considered problems
There has been considerable interest in the identification of structural properties of combinatorial...
Thesis (Ph. D.)--University of Rochester. Dept. of Computer Science, 1996. Simultaneously published ...
Proof complexity focuses on the complexity of theorem proving procedures, a topic which is tightly l...
We present a first theoretical analysis of the power of polynomial-time preprocessing for important ...
We present a first theoretical analysis of the power of polynomial-time preprocessing for important ...
We propose a general approach to modelling algorithmic paradigms for the exact solution of NP-hard p...
Some computationally hard problems, e.g., deduction in logical knowledge bases- are such that part o...
AbstractSome computationally hard problems, e.g., deduction in logical knowledge bases– are such tha...
Some computationally hard problems –e.g., deduction in logical knowledge bases – are such that part ...
The field of kernelization studies polynomial-time preprocessing routines for hard problems in the f...
Suppose the fastest algorithm that we can design for some problem runs in time O(n^2). However, we w...
Temporal Logic Model Checking is a verification method having many industrial applications. This met...
AbstractWe prove that the closest vector problem with preprocessing (CVPP) is NP-hard to approximate...
The idea of preprocessing pail of the input of a problem in order to improve efficiency has been emp...
We first present a method to rule out the existence of parameter non-increasing polynomial kerneliza...
There has been considerable interest in the identification of structural properties of combinatorial...
Thesis (Ph. D.)--University of Rochester. Dept. of Computer Science, 1996. Simultaneously published ...
Proof complexity focuses on the complexity of theorem proving procedures, a topic which is tightly l...
We present a first theoretical analysis of the power of polynomial-time preprocessing for important ...
We present a first theoretical analysis of the power of polynomial-time preprocessing for important ...
We propose a general approach to modelling algorithmic paradigms for the exact solution of NP-hard p...
Some computationally hard problems, e.g., deduction in logical knowledge bases- are such that part o...
AbstractSome computationally hard problems, e.g., deduction in logical knowledge bases– are such tha...
Some computationally hard problems –e.g., deduction in logical knowledge bases – are such that part ...
The field of kernelization studies polynomial-time preprocessing routines for hard problems in the f...
Suppose the fastest algorithm that we can design for some problem runs in time O(n^2). However, we w...
Temporal Logic Model Checking is a verification method having many industrial applications. This met...
AbstractWe prove that the closest vector problem with preprocessing (CVPP) is NP-hard to approximate...
The idea of preprocessing pail of the input of a problem in order to improve efficiency has been emp...
We first present a method to rule out the existence of parameter non-increasing polynomial kerneliza...
There has been considerable interest in the identification of structural properties of combinatorial...
Thesis (Ph. D.)--University of Rochester. Dept. of Computer Science, 1996. Simultaneously published ...
Proof complexity focuses on the complexity of theorem proving procedures, a topic which is tightly l...