Manuel Bodirsky, Marcin Kozik, Florent Madelaine, Barnaby Martin, Michal Wrona
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引用次数: 0
Abstract
We give a new, direct proof of the tetrachotomy classification for the
model-checking problem of positive equality-free logic parameterised by the
model. The four complexity classes are Logspace, NP-complete, co-NP-complete
and Pspace-complete. The previous proof of this result relied on notions from
universal algebra and core-like structures called U-X-cores. This new proof
uses only relations, and works for infinite structures also in the distinction
between Logspace and NP-hard under Turing reductions. For finite domains, the membership in NP and co-NP follows from a simple
argument, which breaks down already over an infinite set with a binary
relation. We develop some interesting new algorithms to solve NP and co-NP
membership for a variety of infinite structures. We begin with those
first-order definable in (Q;=), the so-called equality languages, then move to
those first-order definable in (Q;<), the so-called temporal languages.
However, it is first-order expansions of the Random Graph (V,E) that provide
the most interesting examples. In all of these cases, the derived
classification is a tetrachotomy between Logspace, NP-complete, co-NP-complete
and Pspace-complete.
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