Normality of orbit closure
Web22 de abr. de 2010 · We prove that each closure is an invariant-theoretic quotient of a suitably-defined enhanced quiver variety. We conjecture, and prove in special cases, that these enhanced quiver varieties are normal complete intersections, implying that the enhanced nilpotent orbit closures are also normal. Web1 de jan. de 2015 · Download PDF Abstract: In this note we investigate the normality of closures of orthogonal and symplectic nilpotent orbits in positive characteristic. We prove …
Normality of orbit closure
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WebNORMALITY OF ORBIT CLOSURES 5 A bipartition of size n is simply an ordered pair (μ;ν) of partitions with μ + ν =n.We put Q n ={bipartitions of size n}. Given a bipartition … Web1 de fev. de 2016 · DOI: 10.1007/s12044-015-0260-5 Corpus ID: 255492900; On the normality of orbit closures which are hypersurfaces @article{Lc2016OnTN, title={On …
Web1 de nov. de 2000 · Abstract The purpose of this note is to classify the torus orbit closures in an arbitrary algebraic homogeneous space G / P that are ... {Normality of Torus Orbit … Web1 de abr. de 2006 · Normality of orbit closures for Dynkin quivers of type A n. Manuscripta Math., 105 (2001), pp. 103-109. View Record in Scopus Google Scholar. ... An orbit closure for a representation of the Kronecker quiver with bad singularities. Colloq. Math., 97 (2003), pp. 81-86. CrossRef View Record in Scopus Google Scholar
WebContact & Support. Business Office 905 W. Main Street Suite 18B Durham, NC 27701 USA. Help Contact Us WebNormality of orbit closures in the enhanced nilpotent cone - Volume 203. Skip to main content Accessibility help ... We prove that each closure is an invariant-theoretic quotient of a suitably defined enhanced quiver variety. We conjecture, and prove in special cases, ...
Web1 de dez. de 1979 · Abstract. Let X be the closure of a G-orbit in the Lie algebra of a connected reductive group G. It seems that the variety X is always normal. After a reduction to nilpotent orbits, this is proved ...
Webbe the closure of the orbit of;c f. Then the \-cycle C— CΊ 4- ••• -f C s is Q-homologous to zero in X. 2) Suppose that G = C. Let C be a closure of some orbit such that either C is singular or (C is nonsingular but) the intersection of C with XG is not transversal. Then C is Q-homomologous to zero in X. something associated with irelandWeb3 de fev. de 2016 · Let N be a quiver representation with non-zero admissible annihilator. In this paper, we prove the normality of the orbit closure O ̄ N $\\bar {\\mathcal {O}}_{N}$ when it is a hypersurface. The result thus gives new examples of normal orbit closures … something a teenager may go throughWebof Levasseur, Smith, and Vogan. They found that the failure of the closure of the eight-dimensional nilpotent orbit of G2 to be a normal variety may be "remedied" by refinding … small chicken brooderWebThe normality of closures of nilpotent orbit of classical group have been studied by several authors. However, there is still an open question to decide the normality of the closures … something associated with sewing top 7WebIt is known that the orbit closures for the representations of the equioriented Dynkin quivers ? n are normal and Cohen–Macaulay varieties with rational singularities. In the paper we prove the same for the Dynkin quivers ? n with arbitrary orientation. something associated with james bondWebNormality of Maximal Orbit Closures for Euclidean Quivers Canadian Journal of Mathematics Cambridge Core. Normality of Maximal Orbit Closures for Euclidean … something a tabletop lacksWeb1 de dez. de 2015 · In this note we investigate the normality of closures of orthogonal and symplectic nilpotent orbits in positive characteristic. We prove that the closure of such a nilpotent orbit is normal provided that neither type d nor type e minimal irreducible degeneration occurs in the closure, and conversely if the closure is normal, then any … something associated with new orleans