The use of computational complexity in planning, and in AI in general, has always been a disputed topic. A major problem with ordinary worst-case analyses is that they do not provide any quantitative information: they do not tell us much about the running time of concrete algorithms, nor do they tell us much about the running time of optimal algorithms. We address problems like this by presenting results based on the exponential time hypothesis (ETH), which is a widely accepted hypothesis concerning the time complexity of 3-SAT. By using this approach, we provide, for instance, almost matching upper and lower bounds onthe time complexity of propositional planning.Funding Agencies|National Graduate School in Computer Science (CUGS), Sweden; ...
AbstractThe efficiency of AI planning systems is usually evaluated empirically. For the validity of ...
This dissertation presents several results in fine-grained complexity. Fine-grained complexity aims ...
Assuming that P does not equal NP, which is widely believed to be true, many important computational...
The use of computational complexity in planning, and in AI in general, has always been a disputed to...
In this article we survey algorithmic lower bound results that have been obtained in the field of ex...
The quest for fast exact exponential-time algorithms and fast parameterized al-gorithms for NP-hard ...
Planning is a very important AI problem, and it is also a very time-consuming AI problem. To get an ...
The quest for fast exact exponential-time algorithms and fast parameterized algorithms for NP-hard p...
Obtaining lower bounds for NP-hard problems has for a long time been an active area of research. Alg...
International audienceThe construction of exact exponential-time algorithms for NP-complete prob- le...
Expressive temporal reasoning formalisms are essential for AI. One family of such formalisms consist...
Automated planning is known to be computationally hard in the general case. Propositional planning i...
This thesis studies exponential time algorithms, more precisely, algorithms ex-actly solving problem...
In the last decade, there has been several studies on the computational complexity of planning. Thes...
Automated planning plays an important role in many fields of human interest, where complex and chang...
AbstractThe efficiency of AI planning systems is usually evaluated empirically. For the validity of ...
This dissertation presents several results in fine-grained complexity. Fine-grained complexity aims ...
Assuming that P does not equal NP, which is widely believed to be true, many important computational...
The use of computational complexity in planning, and in AI in general, has always been a disputed to...
In this article we survey algorithmic lower bound results that have been obtained in the field of ex...
The quest for fast exact exponential-time algorithms and fast parameterized al-gorithms for NP-hard ...
Planning is a very important AI problem, and it is also a very time-consuming AI problem. To get an ...
The quest for fast exact exponential-time algorithms and fast parameterized algorithms for NP-hard p...
Obtaining lower bounds for NP-hard problems has for a long time been an active area of research. Alg...
International audienceThe construction of exact exponential-time algorithms for NP-complete prob- le...
Expressive temporal reasoning formalisms are essential for AI. One family of such formalisms consist...
Automated planning is known to be computationally hard in the general case. Propositional planning i...
This thesis studies exponential time algorithms, more precisely, algorithms ex-actly solving problem...
In the last decade, there has been several studies on the computational complexity of planning. Thes...
Automated planning plays an important role in many fields of human interest, where complex and chang...
AbstractThe efficiency of AI planning systems is usually evaluated empirically. For the validity of ...
This dissertation presents several results in fine-grained complexity. Fine-grained complexity aims ...
Assuming that P does not equal NP, which is widely believed to be true, many important computational...