Normality of orbit closure
WebIt 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. Web24 de jul. de 2024 · It is easily checked that this \mathbf {C}^* -action has only positive weights and \tilde {O} becomes a conical symplectic variety. It may happen that \tilde {O} coincides with a normal nilpotent orbit closure of a different complex semisimple Lie algebra (cf. [ 3, Example 3.5]). In such a case the maximal weight is 1.
Normality of orbit closure
Did you know?
WebThe normality of the orbit closure ON in the case (C) of Theorem 1.2 is an open question in general, and we shall handle it in a separated paper. Since ON is an irreducible affine hypersurface, then, by a well-known criterion of Serre (see, for example, [7, III.8]), its normality is equivalent to WebMy second question, is the same but for the orbit closure of an orbit in the enhanced nilpotent cone (see, for instance, ... For algebraic properties of these coordinate rings like normality, Gorensteinness, rational singularities, see the book.
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 ... Web12 de set. de 2011 · Abstract Let $\\Delta $ be a Euclidean quiver. We prove that the closures of the maximal orbits in the varieties of representations of $\\Delta $ are …
WebEDIT: Here I'm using shorthand to avoid normality questions: ... As Fu notes in Prop. 3.16, it follows from the main theorem of the paper that a nilpotent orbit whose closure admits … WebWe recall the dimension formula for the orbit Cλ from [10, Remark 8]: dimCλ = 1 2 n2 − t i=1 λ2 i.(2) As the nilpotent cone of p(V) is G(V)-stable with only finitely many orbits, we have that orbit closure Cλ is G(V)-stable, and the complement Cλ \Cλ is a disjoint union of finitely many orbits. The relation Cμ ⊆ Cλ produces a ...
WebOrbit closuresGeometric techniqueCalculationsResults Example V x V(a) dimV x = d Rep(Q;d) = M d d(k) Group action: conjugation Orbits: conjugacy classes of matrices in M(d;k) Geometry: normal, Cohen-Macaulay varieties with rational singularities. For nilpotent V(a), if char k >0 then O V(a) is a Frobenius split variety. if char k = 0 then O V(a ...
Web20 de nov. de 2024 · On Orbit Closures of Symmetric Subgroups in Flag Varieties - Volume 52 Issue 2. Due to planned system work, ecommerce on Cambridge Core will be unavailable on 12 March 2024 from 08:00 ... [12] Ramanan, S. and Ramanathan, A., Projective normality of flag varieties and Schubert varieties. how did the prohibition endWebNormality and Non Normality Of Certain Semigroups and Orbit Closures 19 A := ⊕ nH0(X,L nλ), L µ being the line bundle onX corresponding to µ. Let us take now for each … how did the prophet malachi dieWebof 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 … how did the prophets dieWeb1 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 … how many students are at uwWeb1 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 … how did the prophet isaiah die in the bibleWebNormality of Maximal Orbit Closures for Euclidean Quivers Canadian Journal of Mathematics Cambridge Core. Normality of Maximal Orbit Closures for Euclidean … how many students are at uvicWebNormality 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, ... how many students are at usf tampa