Simon Knäuer scite author profile

Simon Knäuer

5Publications

10Citation Statements Received

166Citation Statements Given

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164

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TU Dresden

Publications

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Network Satisfaction for Symmetric Relation Algebras with a Flexible Atom

Bodirsky

Knäuer

2021

AAAI

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Robin Hirsch posed in 1996 the Really Big Complexity Problem: classify the computational complexity of the network satisfaction problem for all finite relation algebras A. We provide a complete classification for the case that A is symmetric and has a flexible atom; the problem is in this case NP-complete or in P. If a finite integral relation algebra has a flexible atom, then it has a normal representation B. We can then study the computational complexity of the network satisfaction problem of A using the universal-algebraic approach, via an analysis of the polymorphisms of B. We also use a Ramsey-type result of Nešetřil and Rödl and a complexity dichotomy result of Bulatov for conservative finite-domain constraint satisfaction problems.

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Hardness of Network Satisfaction for Relation Algebras with Normal Representations

Bodirsky

Knäuer

2020

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Robin Hirsch posed in 1996 the Really Big Complexity Problem: classify the computational complexity of the network satisfaction problem for all finite relation algebras A. We provide a complete classification for the case that A is symmetric and has a flexible atom; the problem is in this case NP-complete or in P. If a finite integral relation algebra has a flexible atom, then it has a normal representation B. We can then study the computational complexity of the network satisfaction problem of A using the universal-algebraic approach, via an analysis of the polymorphisms of B. We also use a Ramsey-type result of Nešetřil and Rdl and a complexity dichotomy result of Bulatov for conservative finite-domain constraint satisfaction problems.

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ASNP: A Tame Fragment of Existential Second-Order Logic

Bodirsky

Knäuer

Starke

2020

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Hardness of Network Satisfaction for Relation Algebras with Normal Representations

Bodirsky¹,

Knäuer²

2019

Preprint

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On Logics and Homomorphism Closure

Bodirsky¹,

Feller²,

Knäuer³

et al. 2021

Preprint

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Predicate logic is the premier choice for specifying classes of relational structures. Homomorphisms are key to describing correspondences between relational structures. Questions concerning the interdependencies between these two means of characterizing (classes of) structures are of fundamental interest and can be highly non-trivial to answer. We investigate several problems regarding the homomorphism closure (homclosure) of the class of all (finite or arbitrary) models of logical sentences: membership of structures in a sentence's homclosure; sentence homclosedness; homclosure characterizability in a logic; normal forms for homclosed sentences in certain logics. For a wide variety of fragments of first-and second-order predicate logic, we clarify these problems' computational properties.

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Simon Knäuer

Network Satisfaction for Symmetric Relation Algebras with a Flexible Atom

Hardness of Network Satisfaction for Relation Algebras with Normal Representations

ASNP: A Tame Fragment of Existential Second-Order Logic

Hardness of Network Satisfaction for Relation Algebras with Normal Representations

On Logics and Homomorphism Closure

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