Petar Marković scite author profile

The Constraint Satisfaction Problem Dichotomy Conjecture of Feder and Vardi (1999) has in the last 10 years been profitably reformulated as a conjecture about the set SP fin (A) of subalgebras of finite Cartesian powers of a finite universal algebra A. One particular strategy, advanced by Dalmau in his doctoral thesis (2000), has confirmed the conjecture for a certain class of finite algebras A which, among other things, have the property that the number of subalgebras of A n is bounded by an exponential polynomial. In this paper we characterize the finite algebras A with this property, which we call having few subpowers, and develop a representation theory for the subpowers of algebras having few subpowers. Our characterization shows that algebras having few subpowers are the finite members of a newly discovered and surprisingly robust Maltsev class defined by the existence of a special term we call an edge term. We also prove some tight connections between the asymptotic behavior of the number of subalgebras of A n and some related functions on the one hand, and some standard algebraic properties of A on the other hand. The theory developed here was applied to the Constraint Satisfaction Problem Dichotomy Conjecture, completing Dalmau's strategy.

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Tractability and Learnability Arising from Algebras with Few Subpowers

Idziak¹,

Marković²,

McKenzie³

et al. 2010

SIAM J. Comput.

110

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Tractability and learnability arising from algebras with few subpowers

Idziak

Marković

McKenzie

et al. 2007

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Optimal strong Mal’cev conditions for omitting type 1 in locally finite varieties

2014

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Finitely Related Clones and Algebras with Cube Terms

Marković

Maróti

McKenzie

2011

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Petar Marković

Varieties with few subalgebras of powers

Tractability and Learnability Arising from Algebras with Few Subpowers

Tractability and learnability arising from algebras with few subpowers

Optimal strong Mal’cev conditions for omitting type 1 in locally finite varieties

Finitely Related Clones and Algebras with Cube Terms

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