LEADER 03117nam a2200397 i 4500
001 991003265749707536
006 m     o  d        
007 cr cnu        
008 160801s2014    sz a    ob    001 0 eng d
020   $a9783319113371
035   $ab14305781-39ule_inst
040   $aBibl. Dip.le Aggr. Matematica e Fisica - Sez. Matematica$beng
082 04$a516.35$223
084   $aAMS 14L24
084   $aAMS 14B05
084   $aAMS 14C05
084   $aAMS 14C25
084   $aLC QA564.B485
245 00$aGeometric invariant theory for polarized curves$h[e-book] /$cGilberto Bini ... [et al.]
260   $aCham [Switzerland] :$bSpringer,$c2014
300   $a1 online resource (x, 211 pages)
440  0$aLecture Notes in Mathematics,$x1617-9692 ;$v2122
504   $aIncludes bibliographical references and index
505 0 $aIntroduction ; Singular curves ; Combinatorial results ; Preliminaries on GIT ; Potential pseudo-stability theorem ; Stabilizer subgroups ; Behavior at the extremes of the Basic Inequality ; A criterion of stability for Tails ; Elliptic tails and tacnodes with a line ; A strati_cation of the Semistable Locus ; Semistable, polystable and stable points (part I) ; Stability of Elliptic Tails ; Semistable, polystable and stable points (part II) ; Geometric properties of the GIT quotient ; Extra Components of the GIT quotient -- Compacti_cations of the Universal Jacobian ; Appendix: positivity Properties of Balanced Line Bundles
520   $aWe investigate GIT quotients of polarized curves. More specifically, we study the GIT problem for the Hilbert and Chow schemes of curves of degree d and genus g in a projective space of dimension d-g, as d decreases with respect to g. We prove that the first three values of d at which the GIT quotients change are given by d=a(2g-2) where a=2, 3.5, 4. We show that, for a>4, L. Caporaso's results hold true for both Hilbert and Chow semistability. If 3.5<a<4, the Hilbert semistable locus coincides with the Chow semistable locus and it maps to the moduli stack of weakly-pseudo-stable curves. If 2<a<3.5, the Hilbert and Chow semistable loci coincide and they map to the moduli stack of pseudo-stable curves. We also analyze in detail the critical values a=3.5 and a=4, where the Hilbert semistable locus is strictly smaller than the Chow semistable locus. As an application, we obtain three compactications of the universal Jacobian over the moduli space of stable curves, weakly-pseudo-stable curves and pseudo-stable curves, respectively
650  0$aGeometry, Algebraic
650  0$aInvariants
650  0$aModuli theory
700 1 $aBini, Gilberto$eauthor$4http://id.loc.gov/vocabulary/relators/aut$0739663
776 08$aPrinted edition:$z9783319113364
856 40$uhttp://link.springer.com/book/10.1007/978-3-319-11337-1$zAn electronic book accessible through the World Wide Web
907   $a.b14305781$b03-03-22$c01-08-16
912   $a991003265749707536
996   $aGeometric invariant theory for polarized curves$91465288
997   $aUNISALENTO
998   $ale013$b01-08-16$cm$d@  $e-$feng$gsz $h0$i0