Resource bounded measure

Known as: Almost complete 
Lutz's resource bounded measure is a generalisation of Lebesgue measure to complexity classes. It was originally developed by Jack Lutz. Just as… (More)
Wikipedia

Papers overview

Semantic Scholar uses AI to extract papers important to this topic.
2008
2008
We extend Lutz’s resource-bounded measure to probabilistic classes, and obtain notions of resource-bounded measure on… (More)
Is this relevant?
2007
2007
Lutz developed a general theory of resource-bounded measurability and measure on suitable complexity classes C⊆C (see Proceedings… (More)
Is this relevant?
2001
2001
In this paper we extend a key result of Nisan and Wigderson NW94] to the nondeterministic setting: for all > 0 we show that if… (More)
Is this relevant?
2000
2000
We say that a distribution is reasonable if there exists a constant s 0 such that x x n 1 ns . We prove the following result… (More)
Is this relevant?
Review
1999
Review
1999
Investigation of the measure-theoretic structure of complexity classes began with the development of resource-bounded measure in… (More)
Is this relevant?
1998
1998
A general theory of resource-bounded measurability and measure is developed. Starting from any feasible probability measure ν on… (More)
Is this relevant?
1998
1998
We show that the class of sets having polynomial size circuits,P=poly, hasEXPNP-measure zero under each of the following two… (More)
Is this relevant?
1997
1997
We construct an oracle relative to which NP has p-measure 0 but D p has measure 1 in EXP. This gives a strong relativized… (More)
Is this relevant?
Review
1997
Review
1997
We survey recent results on resource-bounded measure and random-ness in structural complexity theory. In particular, we discuss… (More)
Is this relevant?
1996
1996
We prove that the following classes have resource-bounded measure zero: the class of self-reducible sets. the class of commitable… (More)
Is this relevant?