Schedule 
Rooms 
Topics 
Fri 03/16 2:00 PM 
实验楼105 
Chong Song (Xiamen University) "An Energy Method for Uniqueness of Geometric flows"
Abstract: In this talk, I will introduce an energy method for solving uniqueness problems of geometric flows on manifolds. The basic idea is to derive a Gronwalltype inequality for certain geometric energy functionals which describe the intrinsic distance of two solutions. In particular, we use parallel transportations to compare solutions and improve the estimates. I will use the Schrodinger flow as an example and introduce its application to various type of geometric flows.

Fri 03/16 3:30 PM 
实验楼105 
YenChang Huang (Xinyang Normal University) "A problem of existence of horizontal envelops in the 3DHeisenberg group and its applications"
Abstract: One of interesting problems in classical geometry is to find the envelope for a family of lines or hypersurfaces in the Euclidean spaces and several applications to Economics and Mathematical Optimization have been developed. After a review of our previous works for finding the pseudohermitian invariants in CR geometry, we will show the necessary and sufficient conditions for the existence of horizontal envelops in the 3DHeisenberg group by using the standard techniques in Integral Geometry. We obtain a method to construct horizontal envelopes from the given ones and characterize the solutions satisfying the construction. The similar results can be generalized to the higher dimensional Heisenberg groups.

Tue 03/20 2:30 PM 
数理楼661 
Jinhua Wang (Xiamen University) "An overview: Einstein spaces as attractors for the Einstein flow"
Abstract: I will talk about some stability results in GR, mainly referring to the work by Andersson and Moncrief in Journal of Differential Geometry 89 (2011).
In this paper the authors prove a global existence theorem, in the direction of cosmological expansion, for sufficiently small perturbations of a family of n + 1dimensional, spatially compact spacetimes, which generalizes the k = −1 FLRW vacuum spacetime. The background spacetimes considered are Lorentz cones over negative Einstein spaces of dimension $n \geq 3$.
These results also demonstrate causal geodesic completeness of the perturbed spacetimes, in the expanding direction, and show that the scalefree geometry converges toward an element in the moduli space of Einstein geometries, with a rate of decay depending on the stability properties of the Einstein geometry.

Fri 03/23 2:00PM (NOT the usual time!) 
实验楼105 
Xiang Ma (Peking University) "Geometry of pseudoconvex submanifolds in a pseudoEuclidean space"
Abstract: 伪欧氏空间$\mathbb{R}^{m+1,p}$ 中的$m$维伪凸子流形，是法丛值的第二基本形式 $II(v,v)$ 恒取类空向量的类空子流形，它的法空间中带有一个Lorentz度量（1正p负）。它可以看作是欧氏空间中的凸超曲面（卵形面）的自然推广。直观上，它象是$m+1$维欧氏空间中的凸超曲面的一个微扰。ballbet体育先介绍一系列简单的引理，既说明它与凸曲面的类似，也为获得更深入的结果准备技术工具。ballbet体育证明它们的截面曲率恒正，并获得了关于全曲率的若干Fenchel 型（反向）不等式。ballbet体育还将报导以下结果:
在非常弱且自然的条件下，以一个闭的伪凸子流形$\gamma^m$为边界的Plateau问题有解，也就是说，存在一个极大类空$m+1$维子流形$\M^{m+1}$以前者为边界。时间允许的话，ballbet体育将简单提及有关概念和结果到离散情形（多边形和多面形）的推广。部分结果是与叶楠博士、张栋博士合作的成果。
Note: At 2:00 PM there is a warmup talk by the speaker on basics on Lorentz spaces, the research talk begins shortly after the warmup talk.

Fri 03/23 4:00 PM (NOT the usual time!) 
实验楼105 
Peng Wang (Tongji University) "On the Morse index of minimal tori in S^4"
Abstract: Urbano's Theorem plays an important geometric role in the proof of Willmore conjecture, which states that a nontotallygeodesic closed minimal surface x in S^3 has index at least 5 and it is congruent to the Clifford torus if the index is 5. In this talk we will provide a generalization of Urbano's Theorem to minimal tori in S^4 by showing that a minimal torus in S^4 has index at least 6 and it is congruent to the Clifford torus if the index is 6. This is a joint work with Prof. Rob Kusner(UMass Amherst).

Fri 03/30 2:30 PM 
实验楼105 
Chao Xia (Xiamen University) "The Weyl problem in warped product spaces"
Abstract: The Weyl problem studies whether a smooth metric on S^2 with positive Gauss curvature admits a smooth isometric embedding in R^3. The uniqueness part corresponds to CohnVossen's rigidity theorem. The existence part was solved by Nirenberg and Pogorelov independently by using the continuity method. The solution of the Weyl problem is a starting point to well define the BrownYork quasilocal mass. Motivated by the welldefinedness of quasi local mass in Schwarzschild manifold, recently, people are interested in study the Weyl problem in warped product spaces. In this talk, I will review the continuity method for this problem and report recent progress made by LiWang and GuanLu for the Weyl problem in warped product spaces..
The reference:
C. Li and Z. Wang, The Weyl problem in warped product space, arXiv:1603.01350. J. Differential Geom., to appear.
P. Guan and S. Lu, Curvature estimates for immersed hypersurfaces in Riemannian manifolds, Invent. Math. 208 (2017), no. 1, 191215.
S. Lu, On Weyl's embedding problem in Riemannian manifolds, arXiv:1608.07539.

Fri 04/20 2:30PM 
实验楼105 
Bennett Chow (University of California, San Diego) "A Survey of Shrinking Gradient Ricci Solitons"
Abstract: We discuss works on shrinking gradient Ricci solitons with an emphasis on some papers of Munteanu and Wang. They have made progress in all dimensions with some stronger results in dimension 4. These objects are interest to Ricci flow because they model finite time singularity formation.
About the speaker: The speaker's homepage at UC San Diego is http://www.math.ucsd.edu/~benchow/.

Fri 05/18 2:30 PM 
实验楼105 
Victor Ginzburg (University of California, Santa Cruz) "Periodic orbits of Hamiltonian systems: the Conley conjecture and pseudorotations"
Abstract:
One distinguishing feature of Hamiltonian dynamical systemsa class of systems naturally arising in many physics problemsis that such systems, with very few exceptions, tend to have numerous periodic orbits. In 1984 Conley conjectured that a Hamiltonian diffeomorphism (i.e., the timeone map of a Hamiltonian flow) of a torus has infinitely many periodic orbits. This conjecture was proved by Hingston some twenty years later and similar results for surfaces other than the sphere were established by Franks and Handel. Of course, one can expect the Conley conjecture to hold for a much broader class of phase spaces, and this is indeed the case as has been shown by Gurel, Hein and the speaker. However, the conjecture is known to fail for some, even very simple, phase spaces such as the sphere. These spaces admit Hamiltonian diffeomorphisms with finitely many periodic orbitsthe socalled pseudorotationswhich are of particular interest in dynamics.
In this talk, based on the results of Gurel and the speaker, we will examine underlying reasons for the existence of periodic orbits for Hamiltonian systems and discuss the situations where the Conley conjecture does not hold.
About the speaker: The speaker's homepage at UC Santa Cruz is http://ginzburg.math.ucsc.edu/.

Fri 05/18 3:30 PM 
实验楼105 
Martin Li (The Chinese University of Hong Kong) "Free Boundary Minimal Surfaces in the unit ball"
Abstract: Since the seminal work of Fraser and Schoen on the extremal Steklov eigenvalue problem, there have been substantial interest in the study of free boundary minimal surfaces in the unit ball. In this talk, we will discuss some very recent results concerning the existence, compactness and rigidity of such objects. We will mention along the way some open questions in this area. Part of these are joint work with A. Fraser; and N. Kapouleas.

Tue 05/29 2:30 PM 
数理楼661 
Wenxiong Chen (Yeshiva University) "The fractional Laplacian"
Abstract: The fractional Laplacian is a nonlocal pseudodifferential operator defined by a singular integral. It is quite different from the traditional (local)
differential operators. In this talk, we will use simple examples to illustrate the essential differences between the local and nonlocal operators, such as the boundary
regularities and Poisson representations. We will show how to construct a super solution to obtain Holder regularity of the solutions on the boundary; we will also show how to construct a subsolution to prove a Hopf type lemma. If time permitting, we will show the ideas on the proofs of interior regularity (the Schauder estimate).

Fri 06/01 2:30 PM 
实验楼105 
Lihan Wang (University of Connecticut) "Symplectic Laplacians, boundary conditions and cohomology"
Abstract: Symplectic Laplacians are introduced by Tseng and Yau in 2012, which are related to a system of supersymmetric equations from physics. These Laplacians behave different from usual ones in Rimannian case and Complex case. They contain both 2nd and 4th order operators. In this talk, we will discuss these operators and their relations with cohomologies on compact symplectic manifolds with boundary. For this purpose, we will introduce new boundary conditions for differential forms on symplectic manifolds. Their properties and importance will be discussed.

Tue 06/05 2:30 PM 
数理楼661 
Jinyu Guo (Xiamen University) "Overdeteminated problems in a ball in Euclidean space"
Abstract: In a celebrated paper "A symmetry problem in potential theory", Serrin initiated the study of elliptic equations under overdetermined boundary conditions. He introduced the moving plane method to prove this problems.
In this talk, I mainly talk about Serrin's type overdeteminated problems.
Firstly, I will introduce the history background for Serrin's type overdeteminated problems without boundary. Secondly, I will introduce several proof's methods for this kind of problems.
Finally, I will talk about our recent results for overdeteminated problems in a ball.

Fri 06/08 2:30 PM 
实验楼105 
Shaochuang Huang (Tsinghua University) "Harmonic Coordinates, Exhaustion functions and its applications"
Abstract: In this talk, I will prove a harmonic radius estimate and then use it to construct an exhaustion function with bounded gradient and Hessian by Tam's method. Finally, using similar method by F. He and LeeTam, I will sketch a proof of shorttime existence of Ricci flow.

Fri 06/08 3:30 PM 
实验楼105 
ManChun Lee (The Chinese University of Hong Kong) "Chern Ricci flow on noncompact manifolds and applications"
Abstract: In this work, we study a Hermitian flow of metrics evolving along the Chern Ricci direction. We will discuss a existence criteria of the Chern Ricci flow and hence the Kahler Ricci flow without the assumption of bounded curvature. If time is allowed, I will briefly describe a construction of KRF on noncollapsing manifold with nonnegative bisectional curvature and its application to Yau's uniformization conjecture. This is joint work of Prof. L.F. Tam.

Fri 06/15 2:30 PM 
实验楼105 
Fang Wang (Shanghai Jiaotong University) "Obata's Rigidity theorem on manifolds with boundary"
Abstract: In this talk, I will introduce some rigidity theorems for the (generalized) Obata equation on manifolds with boundary with different kinds of boundary conditions. Then I will also give two main applications. One application is in the rigidity theorems of PoincareEinstein manifolds; and the other is in the first eigenvalue problems on manifolds with boundary. This is joint work with Mijia Lai and Xuezhang Chen.

Tue 06/19 3:00 PM 
数理楼661 
Bingyuan Liu (University of California, Riverside) "Geometric analysis on the Diederich–Fornæss index"
Abstract: In this talk, we discuss the Diederich–Fornæss index in several complex variables. A domain \Omega \subset \mathbb{C}^n is said to be pseudoconvex if \log(\delta(z)) is plurisubharmonic in \Omega, where \delta is a signed distance function of \Omega. The Diederich–Fornæss index has been introduced since 1977 as an index to refine the notion of pseudoconvexity. After a brief review of pseudoconvexity, we discuss this index from the point of view of geometric analysis. We will find an equivalent index associated to the boundary of domains and with it, we are able to obtain accurate values of the Diederich–Fornæss index for many types of domains.

Tue 06/26 2:30 PM 
实验楼105 
Xiaodong Wang (Michigan State University) "From the isoperimetric inequality to Integral inequalities for harmonic functions and holomorphic functions"
Abstract: There are many proofs for the classic isoperimetric inequality. Carleman's proof reduces it to an interesting integral inequality for analytic functions on the unit disc in the plane. As natural generalizations I will discuss some integral inequalities for harmonic functions in higher dimensions. This is based on joint work with Fengbo Hang and Xiaodong Yan. I will also talk about some more recent developments and related inequalities for holomorphic functions in several complex variables if time allows.

Thu 07/05 3:00 PM (NOT the usual time!) 
教学楼306 (NOT the usual location!) 
Boyong Chen (Fudan University) "Weighted Bergman kernel, directional Lelong number and JohnNirenberg exponent"
Abstract: Let $\psi$ be a plurisubharmonic function on the closed unit ball and $K_{t\psi}(z)$ the Bergman kernel on the unit ball with respect to the weight $t\psi$. We show that the boundary behavior of $K_{t\psi}(z)$ is determined by certain directional Lelong numbers of $\psi$ for all $t$ smaller than the JohnNirenberg exponent of $\psi$ associated to certain family of nonisotropic balls, which is always positive.
Note: This is a special lecture from the 2018 Summer school on Finsler geometry.

Thu 07/05 4:00 PM (NOT the usual time!) 
教学楼306 (NOT the usual location!) 
Siqi Fu (Rutgers University) "Estimates of invariant metrics and applications"
Abstract: The Caratheodory and Kobayashi metrics are nonsmooth Finsler metrics while the Bergman metric is a Kahler metric on bounded domains in several complex variables. All of them are biholomorphic invariants. In this talk, we will discuss boundary estimates of these invariant metrics and the Bergman kernel. We will also discuss how these estimates can be used to characherize certain geometric properties of the boundary.
Note: This is a special lecture from the 2018 Summer school on Finsler geometry.

Fri 07/06 11:00 AM (NOT the usual time!) 
实验楼108 (NOT the usual location!) 
Meikui Xiong (Northwestern University, Xi'an) "Deformation of canonical metrics in Kahler geometry"
Abstract: In (1), Gabor Szekelyhidi proved a theorem which shows the structure of the deformation space of csck metrics (constant scalar curvature metrics), he made use of the Kstability to obtain his result. Then in (2), Eiji Inoue generalized the result above to the case of KahlerRicci solitons. We will survey some theories related to the two results.
(1) Gabor Szekelyhidi, The KahlerRicci flow and Kstability, Arxiv:0803.1613.pdf.
(2) Eiji Inoue, The moduli space of Fano manifolds with KahlerRicci solitons, Arxiv:1802.08128.pdf.

Sun 07/08 4:00 PM (NOT the usual time!) 
教学楼306 (NOT the usual location!) 
Xiao Zhang (AMSS) "宇宙学中的一些物理与几何问题"
Abstract: 宇宙学原理假设宙在大尺度上是均匀各向同性的，几何上可以用 RobinsonWalker 度规描述。1998年天文观测发现宇宙在加速膨胀，宇宙常数为正。近年来，更精细的测量数据似乎表明宇宙中存在一些特殊性质的区域，显示出有较强的各向异性性质。一些学者发现用Finsler几何可以解释这样的各向异性。本报告将讨论正宇宙常数的正能量定理以及引力波BondiSachs时空的Peeling性质。并探讨这些问题在Finsler几何框架下的可能推广.
Note: This is a special lecture from the 2018 Summer school on Finsler geometry.

Mon 07/09 11:00 AM (NOT the usual time!) 
数理楼661 
Haojie Chen (Zhejiang Normal University) "Kodaira dimensions of almost complex manifolds"
Abstract: The Kodaira dimension gives a rough classification scheme of complex manifolds up to birational equivalence. It is also introduced on symplectic 4manifolds and smooth manifolds with dimension less than 4. In this talk, I will present a generalization of Kodaira dimension to almost complex manifolds. I will discuss some structural results including the birational invariance on almost complex 4manifolds and the relation with symplectic Kodaira dimension. It is in general not a deformation invariant, hence not a diffeomorphism invariant. If time allows, I will discuss some interesting nonintegrable almost complex structures with large Kodaira dimension. This talk is based on joint work with Weiyi Zhang.

Mon 07/09 4:00 PM (NOT the usual time!) 
教学楼306 (NOT the usual location!) 
Xiaobo Liu (Peking University) "Integrable System and Moduli Space of Curves"
Abstract: An integrable system consists of mutually commuting flow equations. A well known integrable system is the KdV hierarchy. Integrable systems have deep connections with geometry of moduli spaces of stable curves (i.e. compactifications of moduli spaces of punctured Riemann surfaces). In this talk I will explain how intersection numbers on such moduli spaces provide solutions to the KdV hierarchy. Conjecturally, a variation of such connections might be generalized to GromovWitten invariants of smooth projectic varieties.
Note: This is a special lecture from the 2018 Summer school on Finsler geometry.

Tue 07/10 11:00 AM (NOT the usual time!) 
数理楼661 
Siyuan Lu (Rutgers University) "On a localized Penrose inequality"
Abstract: We consider the boundary behavior of a compact manifold with nonnegative scalar curvature. The boundary consists of two parts: \Sigma_H and \Sigma_O, where \Sigma_H denotes outer minimizing minimal hypersurface. Under suitable assumption on \Sigma_O, we establish a localized Penrose inequality, which can be viewed as a quasilocal version of the Riemannian Penrose inequality. Moreover, in dimension 3, we prove that the equality holds iff it's a domain in Schwarzschild manifold. This is based on joint works with Pengzi Miao.

Tue 07/17 2:30 PM 
数理楼661 
Yong Wei (Australia National University) "Volume preserving flow and AlexandrovFenchel inequalities in hyperbolic space"
Abstract: I will describe my recent work with Ben Andrews and Xuzhong Chen on volume preserving flow and AlexandrovFenchel inequalities in hyperbolic space. First, if the initial hypersurface in hyperbolic space has positive sectional curvature, we show that a large class of volume preserving flow preserves the positivity of sectional curvatures, and the flow converges smoothly to a geodesic sphere. This result can be used to show that certain AlexandrovFenchel quermassintegral inequalities, known previously for horospherical convex hypersurfaces (by G.Wang and C.Xia (2013)), also hold under the weaker condition of positive sectional curvature. Second, we consider the volume preserving flow of strictly horospherically convex hypersurfaces in hyperbolic space by function of shifted principal curvatures, and apply the convergence result to prove a new class of AlexandrovFenchel type inequalities for horospherically convex hypersurfaces.

Wed 07/25 10:30 AM (NOT the usual time!) 
数理楼661 
Changliang Wang (Mcmaster University) "Linear stability of Riemannian manifolds with Killing spinors"
Abstract: Einstein metrics on a compact manifold are critical points of the normalized total scalar curvature functional. So it is natural to study the behavior of the second variation of the normalized total scalar curvature functional at an Einstein metric. This is known as the linear stability problem of Einstein metrics. In this talk, we will briefly review previous works on this problem, and then I will report our work on the linear stability of some interesting Einstein metrics: Riemannian metrics admitting Killing spinors, and Einstein metrics from the circle bundle construction.
