Showing papers by "Rahul Pandharipande published in 2008"
TL;DR: Holomorphic disk invariants with boundary in the real Lagrangian of a quintic 3-fold are calculated by localization and proven mirror transforms in this paper, where a careful discussion of the underlying virtual intersection theory is included.
Abstract: Holomorphic disk invariants with boundary in the real Lagrangian of a quintic 3-fold are calculated by localization and proven mirror transforms. A careful discussion of the underlying virtual intersection theory is included. The generating function for the disk invariants is shown to satisfy an extension of the Picard-Fuchs differential equations associated to the mirror quintic. The Ooguri-Vafa multiple cover formula is used to define virtually enumerative disk invariants. The results may also be viewed as providing a virtual enumeration of real rational curves on the quintic.
147 citations
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TL;DR: In this paper, the equivariant Gromov-Witten theory of a nonsingular toric 3-fold X with primary insertions is shown to be equivalent to the equivariant Donaldson-Thomas theory of X. As a corollary, the topological vertex calculations by Agangic, Klemm, Marino, and Vafa of local Calabi-Yau 3-folds are proven to be correct.
Abstract: We prove the equivariant Gromov-Witten theory of a nonsingular toric 3-fold X with primary insertions is equivalent to the equivariant Donaldson-Thomas theory of X. As a corollary, the topological vertex calculations by Agangic, Klemm, Marino, and Vafa of the Gromov-Witten theory of local Calabi-Yau toric 3-folds are proven to be correct in the full 3-leg setting.
125 citations
TL;DR: Gromov-Witten theory was used to define an enumerative geometry of curves in Calabi-Yau 4-folds as mentioned in this paper, where the main technique is to find exact solutions to moving multiple cover integrals.
Abstract: Gromov-Witten theory is used to define an enumerative geometry of curves in Calabi-Yau 4-folds The main technique is to find exact solutions to moving multiple cover integrals The resulting invariants are analogous to the BPS counts of Gopakumar and Vafa for Calabi-Yau 3-folds We conjecture the 4-fold invariants to be integers and expect a sheaf theoretic explanation
118 citations
TL;DR: In this paper, the equivariant genus 0 Gromov-Witten potentials of X and Y are shown to be equal after a change of variables, verifying the Crepant Resolution Conjecture for the pair.
Abstract: Let Z_3 act on C^2 by non-trivial opposite characters. Let X =[C^2/Z_3] be the orbifold quotient, and let Y be the unique crepant resolution. We show the equivariant genus 0 Gromov-Witten potentials of X and Y are equal after a change of variables -- verifying the Crepant Resolution Conjecture for the pair (X,Y). Our computations involve Hodge integrals on trigonal Hurwitz spaces which are of independent interest. In a self contained Appendix, we derive closed formulas for these Hurwitz-Hodge integrals.
87 citations
TL;DR: In this article, a group-theoretic description of the parity of a pull-back of a theta characteristic under a branched covering is given, which involves lifting monodromy of the covering to the semidirect product of the symmetric and Clifford groups, known as the Sergeev group.
72 citations
TL;DR: In this paper, the descendent Gromov-Witten theory in higher genus, non-toric settings has been studied for surfaces of general type and Enriques Calabi-Yau threefold.
Abstract: We use a topological framework to study descendent Gromov-Witten theory in higher genus, non-toric settings. Two geometries are considered: surfaces of general type and the Enriques Calabi-Yau threefold. We conjecture closed formulas for surfaces of general type in classes K and 2K. For the Enriques Calabi-Yau, Gromov-Witten invariants are calculated in genus 0, 1, and 2. In genus 2, the holomorphic anomaly equation is found.
57 citations
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TL;DR: In this paper, Gromov-Witten theory is used to define an enumerative geometry of curves in Calabi-Yau 5-folds, and the contributions of moving multiple covers of genus 0 curves to the genus 1 invariants are determined.
Abstract: Gromov-Witten theory is used to define an enumerative geometry of curves in Calabi-Yau 5-folds. We find recursions for meeting numbers of genus 0 curves, and we determine the contributions of moving multiple covers of genus 0 curves to the genus 1 Gromov-Witten invariants. The resulting invariants, conjectured to be integral, are analogous to the previously defined BPS counts for Calabi-Yau 3 and 4-folds. We comment on the situation in higher dimensions where new issues arise.
Two main examples are considered: the local Calabi-Yau P^2 with balanced normal bundle 3O(-1) and the compact Calabi-Yau hypersurface X_7 in P^6. In the former case, a closed form for our integer invariants has been conjectured by G. Martin. In the latter case, we recover in low degrees the classical enumeration of elliptic curves by Ellingsrud and Stromme.
23 citations
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TL;DR: In this paper, the k-th power of the cotangent line class on the moduli space of stable 1-pointed genus g curves is found for k >= 2g.
Abstract: Simple boundary expressions for the k-th power of the cotangent line class on the moduli space of stable 1-pointed genus g curves are found for k >= 2g. The method is by virtual localization on the moduli space of maps to the projective line. As a consequence, nontrivial tautological classes in the kernel of the push-forward map associated to the irreducible boundary divisor of the moduli space of stable g+1 curves are constructed. The geometry of genus g+1 curves then provides universal equations in genus g Gromov-Witten theory. As an application, we prove all the Gromov-Witten identities conjectured recently by K. Liu and H. Xu.
16 citations
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TL;DR: In this article, the Yau-Zaslow conjecture for all curve classes on K3 surfaces was shown to hold for all curves in the moduli of the STU model.
Abstract: The Yau-Zaslow conjecture determines the reduced genus 0 Gromov-Witten invariants of K3 surfaces in terms of the Dedekind eta function. Classical intersections of curves in the moduli of K3 surfaces with Noether-Lefschetz divisors are related to 3-fold Gromov-Witten theory via the K3 invariants. Results by Borcherds and Kudla-Millson determine the classical intersections in terms of vector-valued modular forms. Proven mirror transformations can often be used to calculate the 3-fold invariants which arise.
Via a detailed study of the STU model (determining special curves in the moduli of K3 surfaces), we prove the Yau-Zaslow conjecture for all curve classes on K3 surfaces. Two modular form identities are required. The first, the Klemm-Lerche-Mayr identity relating hypergeometric series to modular forms after mirror transformation, is proven here. The second, the Harvey-Moore identity, is proven by D. Zagier and presented in the paper.
14 citations
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TL;DR: In this paper, the conjectural equivalence of curve counting on Calabi-Yau 3-folds via stable maps and stable pairs is discussed, and new results and conjectures about descendent integration on K3 surfaces are announced.
Abstract: The conjectural equivalence of curve counting on Calabi-Yau 3-folds via stable maps and stable pairs is discussed. By considering Calabi-Yau 3-folds with K3 fibrations, the correspondence naturally connects curve and sheaf counting on K3 surfaces. New results and conjectures (with D. Maulik) about descendent integration on K3 surfaces are announced. The recent proof of the Yau-Zaslow conjecture is surveyed. The paper accompanies my lecture at the Clay research conference in Cambridge, MA in May 2008.
9 citations
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TL;DR: In this paper, all linear Hodge integrals over moduli spaces of admissible covers with abelian monodromy were evaluated in terms of multiplication in an associated wreath group algebra.
Abstract: Hodge classes on the moduli space of admissible covers with monodromy group G are associated to irreducible representations of G. We evaluate all linear Hodge integrals over moduli spaces of admissible covers with abelian monodromy in terms of multiplication in an associated wreath group algebra. In case G is cyclic and the representation is faithful, the evaluation is in terms of double Hurwitz numbers. In case G is trivial, the formula specializes to the well-known result of Ekedahl-Lando-Shapiro-Vainshtein for linear Hodge integrals over the moduli space of curves in terms of single Hurwitz numbers.