Abstract. We provide a significant extension of the twisted connected sum construction of G2-manifolds, ie Riemannian 7-manifolds with holonomy group G2, first developed by Kovalev; along the way we address some foundational questions at the heart of the twisted connected sum construction. Our extension allows us to prove many new results about compact G2-manifolds and leads to new perspectives for future research in the area. Some of the main contributions of the paper are:(i) We correct, clarify and extend several aspects of the K3 "matching problem" that occurs as a key step in the twisted connected sum construction. (ii) We show that the large class of asymptotically cylindrical Calabi-Yau 3-folds built from semi-Fano 3-folds (a subclass of weak Fano 3-folds) can be used as components in the twisted connected sum construction. (iii) We construct many new topological types of compact G2-manifolds by applying the twisted connected sum to asymptotically Calabi-Yau 3-folds of semi-Fano type studied in [18]. (iv) We obtain much more precise topological information about twisted connected sum G2-manifolds; one application is the determination for the first time of the diffeomorphism type of many compact G2-manifolds. (v) We describe "geometric transitions" between G2-metrics on different 7-manifolds mimicking "flopping" behaviour among semi-Fano 3-folds and "conifold transitions" between Fano and semi-Fano 3-folds. (vi) We construct many G2-manifolds that contain rigid compact associative 3-folds. (vii) We prove that many smooth 2-connected 7-manifolds can be realised as twisted connected sums in numerous ways; by varying the building blocks matched we can vary the number of rigid associative 3-folds constructed therein. The latter result leads to speculation that the moduli space of G2-metrics on a given 7-manifold may consist of many different connected components, and opens up many further questions for future study. For instance, the higher-dimensional gauge theory invariants proposed by Donaldson may provide ways to detect G2-metrics on a given 7-manifold that are not deformation equivalent.
We prove the existence of asymptotically cylindrical (ACyl) Calabi-Yau 3-folds starting with (almost) any deformation family of smooth weak Fano 3-folds. This allow us to exhibit hundreds of thousands of new ACyl Calabi-Yau 3-folds; previously only a few hundred ACyl Calabi-Yau 3-folds were known. We pay particular attention to a subclass of weak Fano 3-folds that we call semi-Fano 3-folds. Semi-Fano 3-folds satisfy stronger cohomology vanishing theorems and enjoy certain topological properties not satisfied by general weak Fano 3-folds, but are far more numerous than genuine Fano 3-folds. Also, unlike Fanos they often contain P 1 s with normal bundle O(−1) ⊕ O(−1), giving rise to compact rigid holomorphic curves in the associated ACyl Calabi-Yau 3-folds.We introduce some general methods to compute the basic topological invariants of ACyl Calabi-Yau 3-folds constructed from semi-Fano 3-folds, and study a small number of representative examples in detail. Similar methods allow the computation of the topology in many other examples.All the features of the ACyl Calabi-Yau 3-folds studied here find application in [17] where we construct many new compact G 2 -manifolds using Kovalev's twisted connected sum construction. ACyl Calabi-Yau 3-folds constructed from semi-Fano 3-folds are particularly well-adapted for this purpose.
Abstract. We study homogeneous special Lagrangian cones in C n with isolated singularities. Our main result constructs an infinite family of special Lagrangian cones in C 3 each of which has a toroidal link. We obtain a detailed geometric description of these tori. We prove a regularity result for special Lagrangian cones in C 3 with a spherical link -any such cone must be a plane. We also construct a one-parameter family of asymptotically conical special Lagrangian submanifolds from any special Lagrangian cone.
Abstract. There is a rich theory of so-called (strict) nearly Kähler manifolds, almostHermitian manifolds generalising the famous almost complex structure on the 6-sphere induced by octonionic multiplication. Nearly Kähler 6-manifolds play a distinguished role both in the general structure theory and also because of their connection with singular spaces with holonomy group the compact exceptional Lie group G2: the metric cone over a Riemannian 6-manifold M has holonomy contained in G2 if and only if M is a nearly Kähler 6-manifold.A central problem in the field has been the absence of any complete inhomogeneous examples. We prove the existence of the first complete inhomogeneous nearly Kähler 6-manifolds by proving the existence of at least one cohomogeneity one nearly Kähler structure on the 6-sphere and on the product of a pair of 3-spheres. We conjecture that these are the only simply connected (inhomogeneous) cohomogeneity one nearly Kähler structures in six dimensions. IntroductionAt least since the early 1950s (see Steenrod's 1951 book [45, 41.22]) it has been well known that viewing S 6 as the unit sphere in Im O endows it with a natural nonintegrable almost complex structure J defined via octonionic multiplication. Since J is compatible with the round metric g rd , the triple (g rd , J, ω), where ω(·, ·) = g rd (J·, ·), defines an almost-Hermitian structure on S 6 . Its torsion has very special properties: in particular, dω is the real part of a complex volume form Ω. Appropriately normalised, the pair (ω, Ω) defines an SU(3)-structure on S 6 which by construction is invariant under the exceptional compact Lie group G 2 Aut(O).Octonionic multiplication also defines a G 2 -invariant 3-form ϕ on Im O byWe call this the standard G 2 -structure on R 7 . Regarding R 7 as the Riemannian cone over (S 6 , g rd ), ϕ and its Hodge dual are given in terms of (ω, Ω):Conversely, viewing S 6 as the level set r = 1 in R 7 , the SU(3)-structure (ω, Ω) is recovered from ϕ and * ϕ by restriction and contraction by the scaling vector field ∂ ∂r . More generally, consider a 7-dimensional Riemannian cone C = C(M ) over a smooth compact manifold (M 6 , g). Suppose that the holonomy of the cone is contained in G 2 . Then there exists a pair of closed (in fact parallel) differential forms ϕ and * ϕ, pointwise equivalent to the model forms on R 7 and homogeneous with respect to scalings on C. Just as above, viewing M as the level set r = 1 in C, the restriction and contraction by ∂ ∂r of ϕ and * ϕ define an SU(3)-structure (ω, Ω) on M satisfying (1.1). In particular, the closedness of ϕ and * ϕ is equivalent to There are other possible equivalent definitions of a nearly Kähler 6-manifold. By relating the holonomy reduction of the cone C(M ) to the existence of a parallel spinor instead of a pair of distinguished parallel forms, nearly Kähler 6-manifolds can be characterised as those 6-manifolds admitting a real Killing spinor [34]. Alternatively, one could give a definition in terms of Gray-Hervella torsion classes of almost Her...
Let M be a complete Ricci-flat Kähler manifold with one end and assume that this end converges at an exponential rate to [0, ∞) × X for some compact connected Ricci-flat manifold X. We begin by proving general structure theorems for M ; in particular we show that there is no loss of generality in assuming that M is simply-connected and irreducible with Hol(M ) = SU(n), where n is the complex dimension of M . If n > 2 we then show that there exists a projective orbifold M and a divisor D ∈ |−K M | with torsion normal bundle such that M is biholomorphic to M \ D, thereby settling a long-standing question of Yau in the asymptotically cylindrical setting. We give examples where M is not smooth: the existence of such examples appears not to have been noticed previously. Conversely, for any such pair (M , D) we give a short and self-contained proof of the existence and uniqueness of exponentially asymptotically cylindrical Calabi-Yau metrics on M \ D.
scite is a Brooklyn-based organization that helps researchers better discover and understand research articles through Smart Citations–citations that display the context of the citation and describe whether the article provides supporting or contrasting evidence. scite is used by students and researchers from around the world and is funded in part by the National Science Foundation and the National Institute on Drug Abuse of the National Institutes of Health.
customersupport@researchsolutions.com
10624 S. Eastern Ave., Ste. A-614
Henderson, NV 89052, USA
This site is protected by reCAPTCHA and the Google Privacy Policy and Terms of Service apply.
Copyright © 2024 scite LLC. All rights reserved.
Made with 💙 for researchers
Part of the Research Solutions Family.