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Learning read-constant polynomials of constant degree modulo composites

dc.contributor.authorChattopadhyay, Arkadev
dc.contributor.authorGavaldà Mestre, Ricard
dc.contributor.authorArnsfelt Hansen, Kristoffer
dc.contributor.authorThérien, Denis
dc.contributor.otherUniversitat Politècnica de Catalunya. Departament de Ciències de la Computació
dc.date.accessioned2015-06-03T09:08:42Z
dc.date.available2015-08-31T00:31:12Z
dc.date.created2014-08
dc.date.issued2014-08
dc.identifier.citationChattopadhyay, A. [et al.]. Learning read-constant polynomials of constant degree modulo composites. "Theory of computing systems", Agost 2014, vol. 55, núm. 2, p. 404-420.
dc.identifier.issn1432-4350
dc.identifier.urihttp://hdl.handle.net/2117/28159
dc.description.abstractBoolean functions that have constant degree polynomial representation over a fixed finite ring form a natural and strict subclass of the complexity class ACC0. They are also precisely the functions computable efficiently by programs over fixed and finite nilpotent groups. This class is not known to be learnable in any reasonable learning model. In this paper, we provide a deterministic polynomial time algorithm for learning Boolean functions represented by polynomials of constant degree over arbitrary finite rings from membership queries, with the additional constraint that each variable in the target polynomial appears in a constant number of monomials. Our algorithm extends to superconstant but low degree polynomials and still runs in quasipolynomial time.
dc.format.extent17 p.
dc.language.isoeng
dc.subjectÀrees temàtiques de la UPC::Informàtica::Informàtica teòrica::Algorísmica i teoria de la complexitat
dc.subject.lcshComputational complexity
dc.subject.lcshAlgebra, Boolean
dc.subject.otherPolynomials over finite rings
dc.subject.otherExact learning
dc.subject.otherMembership queries
dc.subject.otherModular gates
dc.titleLearning read-constant polynomials of constant degree modulo composites
dc.typeArticle
dc.subject.lemacComplexitat computacional
dc.subject.lemacÀlgebra booleana
dc.contributor.groupUniversitat Politècnica de Catalunya. LARCA - Laboratori d'Algorísmia Relacional, Complexitat i Aprenentatge
dc.identifier.doi10.1007/s00224-013-9488-6
dc.description.peerreviewedPeer Reviewed
dc.relation.publisherversionhttp://link.springer.com/article/10.1007%2Fs00224-013-9488-6
dc.rights.accessOpen Access
local.identifier.drac15594306
dc.description.versionPostprint (author’s final draft)
local.citation.authorChattopadhyay, A.; Gavaldà, R.; Arnsfelt Hansen, K.; Thérien, D.
local.citation.publicationNameTheory of computing systems
local.citation.volume55
local.citation.number2
local.citation.startingPage404
local.citation.endingPage420


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