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dc.contributor.authorAllem, Luiz Emíliopt_BR
dc.contributor.authorSilveira, Lucas Gabriel Mota dapt_BR
dc.contributor.authorTrevisan, Vilmarpt_BR
dc.date.accessioned2023-04-05T03:47:55Zpt_BR
dc.date.issued2022pt_BR
dc.identifier.issn0024-3795pt_BR
dc.identifier.urihttp://hdl.handle.net/10183/256723pt_BR
dc.description.abstractIn 1973 Schwenk [7] proved that almost every tree has a cospectral mate. Inspired by Schwenk's result, in this paper we study the spectrum of two families of trees. The p-sun of order is a star with an edge attached to each pendant vertex, which we show to be determined by its spectrum among connected graphs. The -double sun of order is the union of a p-sun and a q-sun by adding an edge between their central vertices. We determine when the -double sun has a cospectral mate and when it is determined by its spectrum among connected graphs. Our method is based on the fact that these trees have few distinct eigenvalues and we are able to take advantage of their nullity to shorten the list of candidates.en
dc.format.mimetypeapplication/pdfpt_BR
dc.language.isoengpt_BR
dc.relation.ispartofLinear Algebra and its Applications. Netherlands. Vol. 636 (Mar. 2022), p. 1-24.pt_BR
dc.rightsOpen Accessen
dc.subjectTeoria dos grafospt_BR
dc.subjectTeoria espectralpt_BR
dc.subjectMatrizespt_BR
dc.titleOn the spectral characterization of the p-sun and the (p,q)-double sun L. Emilio Allem, Lucas G.M. da Silveira e Vilmar Trevisanpt_BR
dc.typeArtigo de periódicopt_BR
dc.identifier.nrb001163862pt_BR
dc.type.originEstrangeiropt_BR


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