Artinian Gorenstein algebras of embedding dimension four and socle degree three

dc.contributor.authorMacias Marques, Pedro
dc.contributor.authorVeliche, Oana
dc.contributor.authorWeyman, Jerzy
dc.date.accessioned2023-10-27T09:56:39Z
dc.date.available2023-10-27T09:56:39Z
dc.date.issued2024
dc.description.abstractWe prove that in the polynomial ring ${Q=\kk[x,y,z,w]}$, with $\kk$ an algebraically closed field of characteristic zero, all Gorenstein homogeneous ideals $I$ such that $(x,y,z,w)^4\subseteq I \subseteq (x,y,z,w)^2$ can be obtained by \emph{doubling} from a grade three perfect ideal $J\subset I$ such that $Q/J$ is a locally Gorenstein ring. Moreover, a graded minimal free resolution of the \mbox{$Q$-module} $Q/I$ can be completely described in terms of a graded minimal free resolution of the \mbox{$Q$-module} $Q/J$ and a homogeneous embedding of a shift of the canonical module $\omega_{Q/J}$ into $Q/J$.por
dc.description.sponsorshipFCT (UIDB/04674/2020), MAESTRO NCN - UMO-2019/34/A/ST1/00263, NAWA POWROTY-PPN/PPO/2018/1/00013/U/00001por
dc.identifier.authoremailpmm@uevora.pt
dc.identifier.authoremailnd
dc.identifier.authoremailnd
dc.identifier.citationPedro Macias Marques, Oana Veliche, Jerzy Weyman, Artinian Gorenstein algebras of embedding dimension four and socle degree three, Journal of Algebra, Volume 638, 2024, Pages 788-839, ISSN 0021-8693, https://doi.org/10.1016/j.jalgebra.2023.09.025.por
dc.identifier.doi10.1016/j.jalgebra.2023.09.025por
dc.identifier.scientificarea333por
dc.identifier.urihttps://doi.org/10.1016/j.jalgebra.2023.09.025
dc.identifier.urihttp://hdl.handle.net/10174/35620
dc.language.isoengpor
dc.peerreviewedyespor
dc.publisherJournal of Algebrapor
dc.rightsrestrictedAccesspor
dc.subjectArtinian Gorenstein algebrapor
dc.subjectMacaulay inverse systempor
dc.subjectDoublingpor
dc.subjectFree resolutionpor
dc.subjectConnected sumpor
dc.titleArtinian Gorenstein algebras of embedding dimension four and socle degree threepor
dc.typearticlepor

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