On the tautological ring of \bar{\mathcal{M}}g,n
We prove that the dimension 0 part of the tautological ring of the moduli space of stable pointed curves is one-dimensional. This provides the first genus-free evidence for a conjecture of Faber and Pandharipande that the tautological ring of the moduli space is Gorenstein, answering in the affirmative a question of Hain and Looijenga.
Anahtar Kelimeler:
Turk. J. Math., 25, (2001), 237-243. Full text: pdf Other articles published in the same issue: Turk. J. Math., vol.25, iss.1.
On the tautological ring of \bar{\mathcal{M}}g,n
We prove that the dimension 0 part of the tautological ring of the moduli space of stable pointed curves is one-dimensional. This provides the first genus-free evidence for a conjecture of Faber and Pandharipande that the tautological ring of the moduli space is Gorenstein, answering in the affirmative a question of Hain and Looijenga.
Keywords:
Turk. J. Math., 25, (2001), 237-243. Full text: pdf Other articles published in the same issue: Turk. J. Math., vol.25, iss.1.,
- ISSN: 1300-0098
- Yayın Aralığı: Yılda 6 Sayı
- Yayıncı: TÜBİTAK
Sayıdaki Diğer Makaleler
Knotting of algebraic curves in complex surfaces
A partial order on the group of contactomorphisms of \R2n+1 via generating functions
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Floer homology and its continuity for non-compact Lagrangian submanifolds
On the tautological ring of \bar{\mathcal{M}}g,n
G-bundles on Abelian surfaces, hyperkahler manifolds, and stringy Hodge numbers
Jim BRYAN, Ron DONAGI, Naichung Conan LEUNG
Torus fibrations on symplectic four-manifolds
The canonical class of a symplectic 4-manifold
Ronald FINTUSHEL, Ronald STERN
The Verlinde algebra is twisted equivariant K-theory