Your search keyword '"Steven S. Y. Lu"' showing total 14 results

1. Reduction of manifolds with semi-negative holomorphic sectional curvature

Author

Fangyang Zheng, Gordon Heier, Bun Wong, and Steven S. Y. Lu

Subjects

Pure mathematics, 010308 nuclear & particles physics, General Mathematics, 010102 general mathematics, Holomorphic function, Kähler manifold, 01 natural sciences, Mathematics::Algebraic Geometry, Bounded function, 0103 physical sciences, Tangent space, Kodaira dimension, Splitting theorem, Mathematics::Differential Geometry, Sectional curvature, 0101 mathematics, Invariant (mathematics), Mathematics::Symplectic Geometry, Mathematics

Abstract

In this note, we continue the investigation of a projective Kahler manifold M of semi-negative holomorphic sectional curvature H. We introduce a new differential geometric numerical rank invariant which measures the number of linearly independent truly flat directions of H in the tangent spaces. We prove that this invariant is bounded above by the nef dimension and bounded below by the numerical Kodaira dimension of M. We also prove a splitting theorem for M in terms of the nef dimension and, under some additional hypotheses, in terms of the new rank invariant.

Published

2018

2. Kobayashi pseudometric on hyperkähler manifolds

Author

Ljudmila Kamenova, Misha Verbitsky, and Steven S. Y. Lu

Subjects

Mathematics - Differential Geometry, Pure mathematics, Mathematics::Complex Variables, General Mathematics, 010102 general mathematics, Holomorphic function, Fibration, Pseudometric space, Rank (differential topology), 01 natural sciences, Manifold, Nef line bundle, Mathematics - Algebraic Geometry, Mathematics::Algebraic Geometry, Differential Geometry (math.DG), 0103 physical sciences, FOS: Mathematics, Mathematics::Differential Geometry, 010307 mathematical physics, 0101 mathematics, Complex manifold, Algebraic Geometry (math.AG), Mathematics::Symplectic Geometry, SYZ conjecture, Mathematics

Abstract

The Kobayashi pseudometric on a complex manifold is the maximal pseudometric such that any holomorphic map from the Poincar\'e disk to the manifold is distance-decreasing. Kobayashi has conjectured that this pseudometric vanishes on Calabi-Yau manifolds. Using ergodicity of complex structures, we prove this conjecture for any hyperk\"ahler manifold that admits a deformation with two Lagrangian fibrations and whose Picard rank is not maximal. The Strominger-Yau-Zaslow (SYZ) conjecture claims that parabolic nef line bundles on hyperk\"ahler manifolds are semi-ample. We prove that the Kobayashi pseudometric vanishes for any hyperk\"ahler manifold with $b_2\geq 13$ if the SYZ conjecture holds for all its deformations. This proves the Kobayashi conjecture for all K3 surfaces and their Hilbert schemes., Comment: v3: 19 pages, some proofs updated, a few corrections and references added

Published

2014

3. On the Kobayashi Pseudometric, Complex Automorphisms and Hyperkähler Manifolds

Author

Ljudmila Kamenova, Fedor Bogomolov, Misha Verbitsky, and Steven S. Y. Lu

Subjects

Pure mathematics, Mathematics::Complex Variables, Mathematical analysis, Ergodic theory, Pseudometric space, Codimension, Automorphism, Mathematics::Symplectic Geometry, Manifold, Hyperkähler manifold, Cohomology, Quotient, Mathematics

Abstract

We define the Kobayashi quotient of a complex variety by identifying points with vanishing Kobayashi pseudodistance between them and show that if a complex projective manifold has an automorphism whose order is infinite, then the fibers of this quotient map are nontrivial. We prove that the Kobayashi quotients associated to ergodic complex structures on a compact manifold are isomorphic. We also give a proof of Kobayashi’s conjecture on the vanishing of the pseudodistance for hyperkahler manifolds having Lagrangian fibrations without multiple fibers in codimension one. For a hyperbolic automorphism of a hyperkahler manifold, we prove that its cohomology eigenvalues are determined by its Hodge numbers, compute its dynamical degree and show that its cohomological trace grows exponentially, giving estimates on the number of its periodic points.

Published

2017

4. Kähler manifolds of semi-negative holomorphic sectional curvature

Author

Steven S. Y. Lu, Gordon Heier, and Bun Wong

Subjects

Pure mathematics, Algebra and Number Theory, Mathematics::Complex Variables, 010102 general mathematics, Holomorphic function, Codimension, 01 natural sciences, Linear subspace, Manifold, 0103 physical sciences, Tangent space, Kodaira dimension, Mathematics::Differential Geometry, 010307 mathematical physics, Geometry and Topology, Sectional curvature, 0101 mathematics, Invariant (mathematics), Mathematics::Symplectic Geometry, Analysis, Mathematics

Abstract

In an earlier work, we investigated some consequences of the existence of a Kähler metric of negative holomorphic sectional curvature on a projective manifold. In the present work, we extend our results to the case of semi-negative (i.e., non-positive) holomorphic sectional curvature. In doing so, we define a new invariant that records the largest codimension of maximal subspaces in the tangent spaces on which the holomorphic sectional curvature vanishes. Using this invariant, we establish lower bounds for the nef dimension and, under certain additional assumptions, for the Kodaira dimension of the manifold. In dimension two, a precise structure theorem is obtained.

Published

2016

5. On the canonical line bundle and negative holomorphic sectional curvature

Author

Steven S. Y. Lu, Gordon Heier, and Bun Wong

Subjects

Mathematics - Differential Geometry, Pure mathematics, Mathematics - Complex Variables, General Mathematics, 14E05, Holomorphic function, Algebraic geometry, 14C20, Mathematics - Algebraic Geometry, Mathematics::Algebraic Geometry, Differential Geometry (math.DG), Dimension (vector space), Differential geometry, Line bundle, Metric (mathematics), FOS: Mathematics, 32Q45, Sectional curvature, Complex Variables (math.CV), Algebraic Geometry (math.AG), Mathematics::Symplectic Geometry, Mathematics

Abstract

We prove that a smooth complex projective threefold with a K\"ahler metric of negative holomorphic sectional curvature has ample canonical line bundle. In dimensions greater than three, we prove that, under equal assumptions, the nef dimension of the canonical line bundle is maximal. With certain additional assumptions, ampleness is again obtained. The methods used come from both complex differential geometry and complex algebraic geometry.

Published

2010

6. On semistability of Albanese maps

Author

Steven S. Y. Lu, Yuping Tu, Quan Zheng, and Qi S. Zhang

Subjects

Surjective function, Pure mathematics, Mathematics::Algebraic Geometry, Number theory, Mathematics::Complex Variables, General Mathematics, Bundle, Mathematical analysis, Algebraic geometry, Mathematics::Symplectic Geometry, Projective variety, Mathematics

Abstract

In this note, we show that the Albanese map for a smooth projective variety X with numerically effective anticanonical bundle is surjective, equi-dimensional and semistable.

Published

2009

7. Logarithmic Surfaces and Hyperbolicity

Author

Gerd Dethloff and Steven S. Y. Lu

Subjects

Surface (mathematics), Algebra and Number Theory, Logarithm, Mathematics::Complex Variables, 010102 general mathematics, Logarithmic growth, Mathematical analysis, Algebraic variety, Algebraic manifold, 01 natural sciences, Dimension (vector space), 0103 physical sciences, Kodaira dimension, 010307 mathematical physics, Geometry and Topology, 0101 mathematics, Logarithmic form, Mathematics

Abstract

In 1981 J. Noguchi proved that in a logarithmic algebraic manifold, having logarithmic irregularity strictly bigger than its dimension, any entire curve is algebraically degenerate. In the present paper we are interested in the case of manifolds having logarithmic irregularity equal to its dimension. We restrict our attention to Brody curves, for which we resolve the problem completely in dimension 2: in a logarithmic surface with logarithmic irregularity 2 and logarithmic Kodaira dimension 2, any Brody curve is algebraically degenerate. In the case of logarithmic Kodaira dimension 1, we still get the same result under a very mild condition on the Stein factorization map of the quasi-Albanese map of the log surface, but we show by giving a counter-example that the result is not true any more in general. Finally we prove that a logarithmic surface having logarithmic irregularity 2 admits certain types of algebraically non degenerate entire curves if and only if its logarithmic Kodaira dimension is zero, and we also give a characterization of this case in terms of the quasi-Albanese map.

Published

2007

8. Rational Points, Rational Curves, and Entire Holomorphic Curves on Projective Varieties

Author

Carlo Gasbarri, Yuri Tschinkel, Mike Roth, and Steven S. Y. Lu

Subjects

Pure mathematics, Conjecture, Holomorphic function, Projective test, Exposition (narrative), Mathematics, Arakelov theory

Abstract

Author(s): VOJTA, Paul | Editor(s): Gasbarri, Carlo; Lu, Steven; Roth, Mike; Tschinkel, Yuri | Abstract: This mini-course described the Thue-Siegel method, as used in the proof of Faltings' theorem on the Mordell conjecture. The exposition followed Bombieri's variant of this proof, which avoids the machinery of Arakelov theory.

Published

2015

9. A Characterization of Finite Quotients of Abelian Varieties

Author

Steven S. Y. Lu and Behrouz Taji

Subjects

Pure mathematics, Chern class, General Mathematics, 010102 general mathematics, Vector bundle, 01 natural sciences, Reflexive sheaf, Mathematics::Algebraic Geometry, 0103 physical sciences, Sheaf, 010307 mathematical physics, 0101 mathematics, Abelian group, Invariant (mathematics), Orbifold, Quotient, Mathematics

Abstract

In this paper we prove a characterization of quotients of Abelian varieties by the actions of finite groups that are free in codimension-one via some vanishing conditions on the orbifold Chern classes. The characterization is given among a class of varieties with mild singularities that are more general than quotient singularities, namely among the class of klt varieties. Furthermore we show that over a projective klt variety, any semistable reflexive sheaf with vanishing orbifold Chern classes can be obtained as the invariant part of a locally-free sheaf on a finite Galois cover whose associa ted vector bundle is flat.

Published

2016

10. Positivity criteria for log canonical divisors and hyperbolicity

Author

De-Qi Zhang and Steven S. Y. Lu

Subjects

Mathematics - Differential Geometry, Pure mathematics, Divisor, General Mathematics, Context (language use), 01 natural sciences, Mathematics - Algebraic Geometry, Mathematics::Algebraic Geometry, Simple (abstract algebra), 0103 physical sciences, FOS: Mathematics, 0101 mathematics, Complex Variables (math.CV), Algebraic Geometry (math.AG), Projective variety, Mathematics, Conjecture, Mathematics - Complex Variables, Applied Mathematics, 010102 general mathematics, 14E30, 32Q45, Minimal model program, Cone (topology), Differential Geometry (math.DG), Gravitational singularity, 010307 mathematical physics

Abstract

Let X be a complex projective variety and D a reduced divisor on X. Under a natural minimal condition on the singularities of the pair (X, D), which includes the case of smooth X with simple normal crossing D, we ask for geometric criteria guaranteeing various positivity conditions for the log-canonical divisor K_X+D. By adjunction and running the log minimal model program, natural to our setting, we obtain a geometric criterion for K_X+D to be numerically effective as well as a geometric version of the cone theorem, generalizing to the context of log pairs these results of Mori. A criterion for K_X+D to be pseudo-effective with mild hypothesis on D follows. We also obtain, assuming the abundance conjecture and the existence of rational curves on Calabi-Yau manifolds, an optimal geometric sharpening of the Nakai-Moishezon criterion for the ampleness of a divisor of the form K_X+D, a criterion verified under a canonical hyperbolicity assumption on (X,D). Without these conjectures, we verify this ampleness criterion with assumptions on the number of ample and non ample components of D., Journal f\"ur die reine und angewandte Mathematik (to appear); final version; this arXiv version contains the proof of Remark 4.9 (2-dimensional case for dlt pairs) as Appendix

Published

2012

11. Quasiprojective varieties admitting Zariski dense entire holomorphic curves

Author

Steven S. Y. Lu and Jörg Winkelmann

Subjects

Pure mathematics, Mathematics::Algebraic Geometry, Subvariety, Applied Mathematics, General Mathematics, Holomorphic function, Structure (category theory), Variety (universal algebra), Type (model theory), Base (topology), Space (mathematics), Orbifold, Mathematics

Abstract

Let $X$ be a complex quasiprojective variety. A result of Noguchi-Winkelmann-Yamanoi shows that if $X$ admits a Zariski dense entire curve, then its quasi-Albanese map is a fiber space. We show that the orbifold structure induced by a properly birationally equivalent map on the base is special in this case. As a consequence, if $X$ is of log-general type with $\bar q(X)\geq\dim X$, then any entire curve is contained in a proper subvariety in $X$.

Published

2012

12. Holomorphic curves on irregular varieties of general type starting from surfaces

Author

Steven S. Y. Lu

Subjects

Mathematical analysis, Holomorphic function, Type (model theory), Mathematics

Published

2011

13. Patterns in the Fermion Mixing Matrix, a bottom-up approach

Author

Manuel Toharia, Cherif Hamzaoui, Steven S. Y. Lu, and Gilles Couture

Subjects

Physics, Nuclear and High Energy Physics, Particle physics, 010308 nuclear & particles physics, Cabibbo–Kobayashi–Maskawa matrix, FOS: Physical sciences, Observable, Unitary matrix, Unitary transformation, 01 natural sciences, Hermitian matrix, Theoretical physics, Matrix (mathematics), High Energy Physics - Phenomenology, High Energy Physics - Phenomenology (hep-ph), 0103 physical sciences, 010306 general physics, Eigenvalues and eigenvectors, Mixing (physics)

Abstract

We first obtain the most general and compact parametrization of the unitary transformation diagonalizing any 3 by 3 hermitian matrix H, as a function of its elements and eigenvalues. We then study a special class of fermion mass matrices, defined by the requirement that all of the diagonalizing unitary matrices (in the up, down, charged lepton and neutrino sectors) contain at least one mixing angle much smaller than the other two. Our new parametrization allows us to quickly extract information on the patterns and predictions emerging from this scheme. In particular we find that the phase difference between two elements of the two mass matrices (of the sector in question) controls the generic size of one of the observable fermion mixing angles: i.e. just fixing that particular phase difference will "predict" the generic value of one of the mixing angles, irrespective of the value of anything else., Comment: 29 pages, 3 figures, references added, to appear in PRD

Published

2009

14. On surfaces of general type with maximal Albanese dimension

Author

Steven S. Y. Lu

Subjects

Discrete mathematics, Pure mathematics, Minimal surface, Mathematics - Complex Variables, Applied Mathematics, General Mathematics, 010102 general mathematics, Algebraic geometry, 14C17, 14E30, 14G25, 14H45, 14J29, 14K12, 32Q45, 32Q57, 01 natural sciences, Elliptic curve, Mathematics - Algebraic Geometry, Morphism, Corollary, Surface of general type, Bounded function, 0103 physical sciences, FOS: Mathematics, 010307 mathematical physics, Complex Variables (math.CV), 0101 mathematics, Algebraic Geometry (math.AG), Mathematics

Abstract

Given a minimal surface equipped with a generically finite map to an Abelian variety, we give an optimal bound on the canonical degree of a rational or an elliptic curve. As a corollary, we obtain the finiteness of rational and elliptic curves on any surface of general type with two linearly independent regular one forms., 13 pages

Published

2008