Minicourse on CSP - Talk 2 - Meditations on Quantified Constraint Satisfaction
07/12/2011 Quarta-feira, 7 de Dezembro de 2011, 15h-16h30m, Sala B1-01
Hubie Chen (Universitat Pompeu Fabra, Barcelona, Spain)
Institute for Interdisciplinary Research - University of Lisbon
The quantified constraint satisfaction problem (QCSP) is the natural generalization of the CSP where universal quantification is permitted. Precisely, the QCSP is the problem of deciding, given a structure and a first-order prenex sentence whose quantifier-free part is the conjunction of atoms, whether or not the sentence holds on the structure.
As with the CSP, one obtains a family of problems is by defining, for each structure B, the problem QCSP(B) to be the QCSP where the structure is fixed to be B. In this talk, we offer a viewpoint on the current status of the research program of understanding the complexity of the problems QCSP(B) on finite structures. In particular, we will present and discuss a group of conjectures on this problem family; throughout, we will place the conjectures in relation to existing results and will emphasize open issues and potential research directions.
One of the leading protagonists of these conjectures is a property of algebras called the polynomially generated powers (PGP) property: essentially, an algebra A has this property when its powers A, A^2, A^3,... have generating sets of polynomial size.
(This talk will be roughly based on an article of the same title which I will make available.)
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