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Sobre divisores livres homogêneosSilva, Mauri Pereira da 16 July 2015 (has links)
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Previous issue date: 2015-07-16 / Coordenação de Aperfeiçoamento de Pessoal de Nível Superior - CAPES / The maingoalofthisdissertationisthepresentationofconcepts,examplesand
characterizations{bothclassicalandrecent{concerningtheimportantandin
uential
theory oftheso-called freedivisors in thestandardhomogeneouscase.Tothisend,we
beginwithabasicstudyonderivationsandwefocusonthemoduledubbed tangential
idealizer of agivenhomogeneouspolynomial,whichgeometricallycorrespondstothe
moduleoflogarithmicvector eldsalongthegivenprojectivehypersurface(thedivisor
is saidtobe free if suchmoduleisfreeoverthegradedpolynomialring).Wewillalso
discuss, inparticular,resultsaboutfreedivisorsintheprojectiveplane. / O principalobjetivodestadisserta c~ao eaapresenta c~aodeconceitos,exemplose
caracteriza c~oes{tantocl assicasquantorecentes{arespeitodaimportanteein
uente
teoria doschamados divisoreslivres no casohomog^eneopadr~ao.Paraesta nalidade,
iniciamos comumestudob asicosobrederiva c~oesefocalizamosnom odulodenomi-
nado idealizadortangencial de umdadopolin^omiohomog^eneo,oquegeometricamente
correspondeaom odulodoscamposvetoriaislogar tmicosaolongodahipersuperf cie
projetivadada(odivisor edito livre quando talm odulo elivresobreoanelgraduado
de polin^omios).Tamb emdiscutiremos,emparticular,resultadossobredivisoreslivres
no planoprojetivo.
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Bernstein--Sato Ideals and the Logarithmic Data of a DivisorDaniel L Bath (10724076) 05 May 2021 (has links)
We study a multivariate version of the Bernstein–Sato polynomial, the so-called Bernstein–Sato ideal, associated to an arbitrary factorization of an analytic germ <i>f - f</i><sub>1</sub>···<i>f</i><sub>r</sub>. We identify a large class of geometrically characterized germs so that the <i>D</i><sub>X,x</sub>[<i>s</i><sub>1</sub>,...,<i>s</i><sub>r</sub>]-annihilator of <i>f</i><sup>s</sup><sub>1</sub><sup>1</sup>···<i>f</i><sup>s</sup><sub>r</sub><sup>r</sup> admits the simplest possible description and, more-over, has a particularly nice associated graded object. As a consequence we are able to verify Budur’s Topological Multivariable Strong Monodromy Conjecture for arbitrary factorizations of tame hyperplane arrangements by showing the zero locus of the associated Bernstein–Sato ideal contains a special hyperplane. By developing ideas of Maisonobe and Narvaez-Macarro, we are able to find many more hyperplanes contained in the zero locus of this Bernstein–Sato ideal. As an example, for reduced, tame hyperplane arrangements we prove the roots of the Bernstein–Sato polynomial contained in [−1,0) are combinatorially determined; for reduced, free hyperplane arrangements we prove the roots of the Bernstein–Sato polynomial are all combinatorially determined. Finally, outside the hyperplane arrangement setting, we prove many results about a certain <i>D</i><sub>X,x</sub>-map ∇<sub><i>A</i></sub> that is expected to characterize the roots of the Bernstein–Sato ideal.
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