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International Conference on
Geometric and Nonlinear Partial Differential Equations
Suzhou, China
July 2—6, 2018
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This conference brings together the experts in the fields of geometric and nonlinear PDEs around the Pacific—Australia, China and USA. It will provide the participants an opportunity to exchange ideas and foster/enhance collaborations.
The main program of the conference is to be held at the School of Mathematical Sciences, Soochow University. The conference also features an Early-/Mid-Career Researchers (EMCR) Forum, to be held at The University of Sydney Centre in on July 4, 2018.
We acknowledge the generous financial support from the following organizations:
- Soochow University - School of Mathematical Sciences at Soochow
University - The University of Sydney - The University of Sydney Centre in China
Organizing Committee: Soochow University The University of Sydney Kui Wang Haotian Wu Ying Zhang Zhou Zhang
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Conference Schedule
July 1, 2018 Sunday
13:00—18:00 Registration
at Shanshui Lou, Nanlin Hotel
2 A
18:30 Dinner
Contacts:
Kui Wang: [email protected]
+86-15950081556
Haotian Wu: [email protected]
+86-19951157695
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July 2, 2018 Monday
Venue: Room 211 Jing Zheng Lou ( ), Soochow University
Time Speaker Title
08:50—09:00 Ying Zhang
Soochow University Opening remarks
09:00—09:45 Xinan Ma
University of Science and
Technology of China
The Neumann problem for nonlinear elliptic and parabolic equations
09:45—10:15 Break
10:15—11:00 Hongyu Wang
Yangzhou University
Donaldson Question:
“Tamed to Compatible”
11:10—11:55 Lei Ni
UC San Diego Shrinking Ricci solitons
12:00—14:00 Lunch
14:00—14:45 Florica Cirstea
The University of Sydney
Recent progress on isolated
singularities
for nonlinear elliptic equations 14:55—15:40 Yann Bernard
Monash University
Uniform regularity results for
critical and subcritical surface energies
15:40—16:10 Break
16:10—16:55 Artem Pulemotov
The University of Queensland
Homogeneous metrics with
prescribed Ricci curvature
17:05—17:50 Jiakun Liu
University of Wollongong
A boundary value problem for
Monge-Ampère equations
18:30 Dinner
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July 3, 2018 Tuesday
Venue: Room 211 Jing Zheng Lou ( ), Soochow University
Time Speaker Title
09:00—09:45 Guofang Wei
UC Santa Barbara
Fundamental gap estimate on
convex domains of sphere
09:45—10:15 Break
10:15—11:00 Huaiyu Jian
Tsinghua University
Boundary regularity for degenerate-
singular Monge-Ampère equations
11:10—11:55 Yuxin Dong
Fudan University
On Eells-Sampson type theorems
for subelliptic harmonic maps
12:00—14:00 Lunch
14:00—14:45 Davi Maximo
University of Pennsylvania
On Morse index estimates for
minimal surfaces
14:55—15:40 Valentina Wheeler
University of Wollongong A model flow for submanifolds
with constant curvature
15:40—16:10 Break
16:10—16:55 Daniel Hauer
The University of Sydney Non-concavity of the Robin ground state
18:30 Banquet
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July 4, 2018 Wednesday
Early-/Mid-Career Researchers Forum
Venue: The University of Sydney Centre in China (CiC)
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Time Speaker Title
08:20 Bus leaves from Nanlin Hotel for CiC.
09:10—09:30
Cathryn Hlavka
The Univerisy of
Sydney Centre in
China
Opening remarks
09:35—10:00 Jiayong Wu
Shanghai Maritime
University
Comparison theorems for integral
Bakry-Emery curvature bounds
10:05—10:30 Shijin Zhang
Beihang University Kähler-Ricci flow on Fano bundles
10:30—11:00 Break
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11:00—11:25 Genggeng Huang
Fudan University
Regularity and uniqueness of the
solutions of some degenerate
Monge-Ampère equations
11:30—11:55 Fei He Xiamen University
Ricci flow on complete manifolds
and applications
12:00—12:25 Anqiang Zhu
Wuhan University
On the extension of the
Ricci Bourguignon flow
12:30—14:00 Lunch
14:00—18:00 Discussion at Soochow University
18:30 Dinner
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July 5, 2018 Thursday
Venue: Room 211, Jing Zheng Lou ( ), Soochow University
Time Speaker Title
09:00—09:45 Haizhong Li
Tsinghua University
Inverse curvature flow and
some geometric applications
09:45—10:15 Break
10:15—11:00 Xianzhe Dai
UC Santa Barbara
Volume entropy rigidity
for RCD spaces
11:10—11:55 Yihu Yang
Shanghai Jiao Tong University
Harmonic maps and singularities
of period mappings
12:00—14:00 Lunch
14:00—14:45 James McCoy
The University of Newcastle
Length-constrained curve
diffusion
of closed planar curves
14:55—15:40 Zihua Guo
Monash University
Generalized Strichartz estimates for Schrodinger type equations
and applications
15:40—16:10 Break
16:10—16:55 Zuoqin Wang
University of Science and Technology of China
Eigenvalues of Riemannian
manifolds admitting large
symmetry
17:05—17:50 Yong Wei
Australian National University
Volume preserving flow and
Alexandrov-Fenchel inequalities
in hyperbolic space
18:30 Dinner
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July 6, 2018 Friday
Venue: Room 211, Jing Zheng Lou ( ), Soochow University
Time Speaker Title
09:00—09:45 Jie Qing
UC Santa Cruz
On hypersurfaces in
hyperbolic space
09:45—10:15 Break
10:15—11:00 Qi S. Zhang
UC Riverside & Fudan University
Minimizers of the sharp Log entropy
on manifolds with non-negative
Ricci curvature and flatness
11:10—11:55 Xiaodong Wang
Michigan State University
Comparison and rigidity results on
compact Riemannian manifolds
with boundary
12:00—14:00 Lunch
14:00—14:45 Zhiqin Lu
UC Irvine
On the decay of the off-diagonal Bergman kernel on
complete Kähler manifold
14:55—15:40 Bin Zhou
Peking University
On uniform estimate of the
complex Monge-Ampère equation
15:40—16:10 Break
16:10—16:55 Fang Wang
Shanghai Jiao Tong University Obata’s Rigidity theorem on
manifolds with boundary
17:05—17:50 Qi-Rui Li
Australian National University
Monge-Ampère equations
on the sphere
18:30 Dinner
Abstracts
Yann Bernard (Monash University)Uniform regularity results for critical and subcritical surface energiesWe establish regularity results for critical points to energies of immersed surfaces dependingon the first and the second fundamental form exclusively. These results hold for a large classof intrinsic elliptic Lagrangians which are subcritical or critical. They are derived using uni-form e-regularity estimates which do not degenerate as the Lagrangians approach the criticalregime given by the Willmore integrand. This is joint-work with Tristan Riviere.
Florica Cırstea (The University of Sydney)Recent progress on isolated singularities for nonlinear elliptic equationsIn this talk, we will discuss recent contributions on isolated singularities for nonlinear ellipticequations such as
(0.1) div(A(|x|)|—u|p�2—u) = f (x,u,—u) in B1(0)\{0},
where p > 1 and B1(0) denotes the open unit ball in RN . Under various assumptions on A,p and f , we fully classify the behaviour of all positive solutions of (0.1), underlining theintricate interaction of the elliptic operator and the nonlinear part f (x,u,—u) of the equation.The talk will refer to joint work with collaborators such as T.-Y. Chang, J. Ching, F. Robertand J. Vetois.
Xianzhe Dai (University of California, Santa Barbara)Volume entropy rigidity for RCD spacesVolume entropy is a fundamental geometric invariant defined as the exponential growth rateof volumes of balls in the universal cover. It is a very subtle invariant which has been exten-sive studied in geometry, topology and dynamical systems. RCD spaces are the most generalmetric spaces which one can still talk about Ricci curvature lower bounds (and still in theRiemannian category). They contain the Ricci limit spaces and has attracted intensive at-tentions recently. We will report some of our recent joint work with Chris Connell, JesusNunez-Zimbron, Requel Perales, Pablo Suarez-Serrato and Guofang Wei about the general-ization to RCD spaces of the volume entropy rigidity results, including that of Ledrappier andWang which says that for a compact Riemannian manifold whose Ricci curvature is boundedfrom below by �(n�1), then the volume entropy is bounded from above by (n�1) and theequality holds iff the manifold is hyperbolic.
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Yuxin Dong (Fudan University)On Eells-Sampson type theorems for subelliptic harmonic mapsA sub-Riemannian manifold is a manifold with a subbundle of the tangent bundle and afiber metric on this subbundle. A Riemannian extension of a sub-Riemannian manifold is aRiemannian metric on the manifold compatible with the fiber metric on the subbundle. Onemay define an analog of the Dirichlet energy by replacing the L2 norm of the derivative ofa map between two manifolds with the L2 norm of the restriction of the derivative to thesubbundle when the domain is a sub-Riemannian manifold. A critical map for this energy iscalled a subelliptic harmonic map. In this talk, by use of a subelliptic heat flow, we establishsome Eells-Sampson type existence results for subelliptic harmonic maps when the targetRiemannian manifold has non-positive sectional curvature.
Zihua Guo (Monash University)Generalized Strichartz estimates for Schrodinger type equations and applicationsIn this talk we give a survey on the recent studies for the generalized Strichartz estimates forSchrodinger type equations and their applications to the nonlinear dispersive equations/systems.The generalized Strichartz estimates include: almost sharp estimates in the radial case orspherically averaged case, and for Schrodinger equations with potential; the applications in-clude: Klein-Gordon equation, Zakharov system, Gross-Pitaevskii equation.
Daniel Hauer (The University of Sydney)Non-concavity of the Robin ground stateOn a convex bounded Euclidean domain, the ground state for the Laplacian with Neumannboundary conditions is a constant, while the Dirichlet ground state is log-concave. The Robineigenvalue problem can be considered as interpolating between the Dirichlet and Neumanncases, so it seems natural that the Robin ground state should have similar concavity properties.In this talk, I show that this is false, by analysing the perturbation problem from the Neumanncase. In particular, I prove that on polyhedral convex domains, except in very special cases(which we completely classify) the variation of the ground state with respect to the Robinparameter is not a concave function. One can conclude from this that the Robin groundstate is not log-concave (and indeed even has some superlevel sets which are non-convex) forsmall Robin parameter on polyhedral convex domains outside a special class, and hence alsoon arbitrary convex domains which approximate these in Hausdorff distance. This is a jointwork with Ben Andrews (ANU, Canberra) and Julie Clutterbuck (Monash University).
Fei He (Xiamen University)Ricci flow on complete manifolds and applicationsI will talk about some recent progress on the Ricci flow on complete noncompact manifoldswith possibly unbounded curvature, and introduce some application of the flow.
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Genggeng Huang (Fudan University)Regularity and uniqueness of the solutions of some degenerate Monge-Ampere equationsIn this talk, we mainly focus on the following Monge-Ampere equation:
detD2u = Lp(�u)p, in W,
u = 0, on ∂W,
where W is a bounded smooth uniformly convex domain in Rn. We will recall some regularityresults of this degenerate Monge-Ampere equation. At last, we will talk about some recentwork on the uniqueness of the non-trivial solution of the above equation.
Huaiyu Jian (Tsinghua University)Boundary regularity for degenerate-singular Monge-Ampere equationsIn 1977, Cheng and Yau studied a class of Monge-Ampere Equations from affine geom-etry which may be singular or degenerate on the boundary. They obtained the existence,uniqueness and interior regularity for the solution. In this talk, we will discuss the boundaryregularity for the solution as well as for the graph of affine hyperbolic sphere.
Haizhong Li (Tsinghua University)Inverse curvature flow and some geometric applicationsIn this talk, we give some important properties of inverse curvature flows for hypersurfaces ina space form or in some warped Riemanniann manifolds. By use of the properties of inversecurvature flows, we prove some geometric inequalities for such hypersurfaces.
Qi-Rui Li (Australian National University)Monge-Ampere equations on the sphereThere are a number of geometric problems which can be reduced to the study of the Monge-Ampere equation on the sphere, including the Aleksandrov problem, the Minkowski problem,and more generally the Lp dual Minkowski problem. In this talk we give a brief discussionon these problems.
Jiakun Liu (University of Wollongong)A boundary value problem for Monge-Ampere equationsIn this talk, we will present a recent result on the global C2,a and W 2,p regularity for theMonge-Ampere equation subject to a natural boundary condition arising in optimal trans-portation. This is a joint work with Shibing Chen and Xu-Jia Wang.
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Zhiqin Lu (University of California, Irvine)On the decay of the off-diagonal Bergman kernel on complete Kahler manifoldWe give Agmon-type exponential estimates of the Bergman kernel for non-compact mani-folds with different curvature bound assumptions, but without the non-collapsing conditionof the volume. This is joint with Shoo Seto.
Xinan Ma (University of Science and Technology of China)The Neumann problem for nonlinear elliptic and parabolic equationsWe shall study the existence of Neuamann problem for some geometry elliptic PDE, whichinclude the Hessian equations on strict convex domain, mean curvature equation and specialLagrange equation. Then we study some parabolic corresponding results and the existence oftranslation solutions on strictly convex domain.
Davi Maximo (University of Pennsylvania)On Morse index estimates for minimal surfacesIn this talk we will survey some recent estimates involving the Morse index and the topologyof minimal surfaces.
James McCoy (The University of Newcastle)Length-constrained curve diffusion of closed planar curvesThe curve diffusion flow has the fundamental property that for closed curves in the plane thesigned enclosed area is constant under the flow. It is natural to consider a ‘dual fourth orderflow that instead preserves length under the evolution. We introduce such a flow and showthat initial closed curves of winding number one, whose oscillation of curvature is suitablysmall and whose isoperimetric ratio is close enough to one, produce solutions to the flow thatexist for all time and converge exponentially to a round circle. This is joint work with GlenWheeler and Yuhan Wu.
Lei Ni (University of California, San Diego)Shrinking Ricci solitonsIn this talk, I will discuss some classification results about gradient shrinking Ricci solitons,including joint works with Nolan Wallach, and joint work with Xiaolong Li and Kui Wang.
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Artem Pulemotov (The University of Queensland)Homogeneous metrics with prescribed Ricci curvatureWe will present a new existence theorem for metrics with prescribed Ricci curvature on ahomogeneous space G/H. To illustrate the application of this theorem, we will consider sev-eral special cases. Specifically, our focus will be on examples in which G/H is a generalisedWallach spaces or a generalised flag manifold.
Jie Qing (University of California, Santa Cruz)On hypersurfaces in hyperbolic spaceIn this talk I will report our recent works on convex hypersurfaces in hyperbolic space. Tostudy hypersurfaces in hyperbolic space analytically, one needs to find ways to parametrize it,preferably globally. We consider two parametrizations: vertical graph and hyperbolic Gaussmap. To get a global parametrization, one needs understand the interrelation of convexityand embeddedness. It is also important to understand the asymptotic of the geometry at ends.In this talk I will report some of our recent works on global and asymptotic properties ofhypersurfaces with nonnegative sectional curvature or Ricci curvature in hyperbolic space,where our use of n-Laplace equations seems to be new.
Fang Wang (Shanghai Jiao Tong University)Obata’s Rigidity theorem on manifolds with boundaryIn this talk, I will introduce the rigidity theorem for Obata equation on manifolds with bound-ary with Robin boundary condition. Some application will also be given. This is joint workwith Mijia Lai and Xuezhang Chen.
Hongyu Wang (Yangzhou University)Donaldson Question: “Tamed to Compatible”In this talk, we show that on any tamed closed almost complex four-manifold (M;J) whosedimension of J-anti-invariant cohomology is equal to self-dual second Betti number minusone, there exists a new symplectic form compatible with the given almost complex structureJ. In particular, if the self-dual second Betti number is one, we give an affirmative answer toDonaldson question for tamed closed almost complex four-manifolds that is a conjecture injoint paper of Tosatti, Weinkove and Yau. Our approach is along the lines used by Buchdahlto give a unified proof of the Kodaira conjecture. Thus, our main result gives an affirmativeanswer to the Kodaira conjecture in symplectic version.
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Xiaodong Wang (Michigan State University)Comparison and rigidity results on compact Riemannian manifolds with boundaryFor compact Riemannian manifolds with nonempty boundary, it is interesting to study therelationship between the geometry on the boundary and geometry of the interior. I will discusscomparison and rigidity results for manifolds with a lower bound for the Ricci curvature. Thefocus will be on sharp geometric inequalities that yield rigidity results in the equality case.
Zuoqin Wang (University of Science and Technology of China)Eigenvalues of Riemannian manifolds admitting large symmetryLet M be a compact Riemannian manifold on which a compact Lie group acts by isome-tries. In this talk I will explain how the symmetry induces extra structures in the spectrum ofLaplace-type operators, and how to apply symplectic techniques to study the induced equi-variant spectrum. This is based on joint works with V. Guillemin and with Y. Qin.
Guofang Wei (University of California, Santa Barbara)Fundamental gap estimate on convex domains of sphereIn their celebrated work, B. Andrews and J. Clutterbuck proved the fundamental gap (thedifference between the first two eigenvalues) conjecture for convex domains in the Euclideanspace and conjectured similar results holds for spaces with constant sectional curvature. Inseveral joint works with S. Seto, L. Wang; C. He; and X. Dai, S. Seto, we prove the conjecturefor the sphere. Namely for any strictly convex domain in the unit Sn sphere, the gap is � 3 p2
D2 .As in B. Andrews and J. Clutterbuck’s work, the key is to prove a super log-concavity of thefirst eigenfunction.
Yong Wei (Australian National University)Volume preserving flow and Alexandrov-Fenchel inequalities in hyperbolic spaceI will describe my recent work with Ben Andrews and Xuzhong Chen on volume preserv-ing flow and Alexandrov-Fenchel inequalities in hyperbolic space. If the initial hypersurfacein hyperbolic space has positive sectional curvature, we show that a large class of volumepreserving flows preserve the positivity of sectional curvatures, and the evolving hypersur-faces converge smoothly to a geodesic sphere. This result can be used to show that certainAlexandrov-Fenchel quermassintegral inequalities, known previously for horospherical con-vex hypersurfaces, also hold under the weaker condition of positive sectional curvature.
Valentina Wheeler (University of Wollongong)A model flow for submanifolds with constant curvatureOne of the most basic pursuits in geometry is the understanding of shapes with least bend-ing. In this talk, we interpret bending not as pure curvature but as a derivative of curvature(although linguistically it sounds odd, this is called the jerk), and take an energetic approach
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toward the analysis of shapes with least jerk. We propose a broad problem in the calculusof variations, on submanifolds with parallel mean curvature vector. As a first step, we studythe problem in the geometrically mostly uninteresting case of curves in the plane. Here thegradient flow nevertheless challenges us to come up with custom-made a-priori estimates.First, we determine the set of equilibria – circles – through an analysis of the Euler-Lagrangeequation. Then, we define a scale-invariant energy and study the flow for small enough ini-tial energy. After some effort, we prove convergence in this energetic neighbourhood of theflow to a round circle. Apart from energy estimates, the Llojasiewicz-Simon gradient in-equality makes an appearance. We quite carefully establish the gradient inequality in oursetting, which although straightforward, still requires some effort. This is joint work withBen Andrews (ANU), James McCoy (UoN) and Glen Wheeler (UOW).
Jiayong Wu (Shanghai Maritime University)Comparison theorems for integral Bakry-Emery curvature boundsWe prove some new comparison theorems for integral Bakry-Emery curvature bounds. Asapplications, some geometric results with the integral Bakry-Emery curvature are provided.
Yihu Yang (Shanghai Jiao Tong University)Harmonic maps and singularities of period mappingsWe use simple methods from harmonic maps to investigate singularities of period mappingsat infinity. More precisely, we derive a harmonic map version of Schmid’s nilpotent orbittheorem. This is a joint work with J. Jost and K. Zuo.
Qi S. Zhang (University of California, Riverside & Fudan University)Minimizers of the sharp Log entropy on manifolds with non-negative Ricci curvature andflatnessConsider the scaling invariant, sharp log entropy (functional) introduced by Weissler on non-compact manifolds with nonnegative Ricci curvature. It can also be regarded as a sharpenedversion of Perelman’s W entropy in the stationary case. We prove that it has a minimizer ifand only if the manifold is isometric to the Euclidean space. Using this result, it is proven thata class of noncompact manifolds with nonnegative Ricci curvature is isometric to Rn. Com-paring with earlier well known flatness results on asymptotically flat manifolds and asymptot-ically locally Euclidean (ALE) manifolds, their decay or integral condition on the curvaturetensor is replaced by the condition that the metric converges to the Euclidean one in C1 senseat infinity. No second order condition on the metric is needed.
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Shijin Zhang (Beihang University)Kahler-Ricci flow on Fano bundlesIn this talk, I will talk about the behavior of the Kahler-Ricci flow on some Fano bundleswhich is a trivial bundle on one Zariski open set. We show that if the fiber is Pm blown up atone point and the initial metric is in a suitable Kahler class, then the fibers collapse in finitetime and the metrics converge sub-sequentially in Gromov-Hausdorff sense to a metric on thebase. This is a joint work with Xin Fu.
Bin Zhou (Peking University)On uniform estimate of the complex Monge-Ampere equationIn this talk, I will first review results on the uniform estimate of the complex Monge-Ampereequation, especially the famous proof of Kolodziej by using capacity theory. Then I willpresent a PDE proof by using Sobolev inequalities for the complex Monge-Ampere equation,which answers a question of Blocki-Kolodziej.
Anqiang Zhu (Wuhan University)On the extension of the Ricci Bourguignon flowIn this report, we will talk about the extension problem of the Ricci Bourguignon flow onRiemannian manifolds. Using Kotschwar-Wang-Munteanu’s method, we will show that thenorm of the Weyl tensor of any smooth solution to the Ricci Bourguignon flow can be ex-plicitly estimated in terms of its initial value on a given ball, a local uniform bound on theRicci tensor. As an application, we show that along the Ricci Bourguignon flow, if the Riccicurvature is bounded, then the curvature operator is bounded.
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Local Information
Map of the Neighborhood
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Direction from Nanlin Hotel to School of Mathematical Sciences,
Soochow University 1.3 km, about 20 min. by walk.
Lunch at DongWu Hotel 5 A 1 5 4 Dinner at Shui Xiang Lou
(1 4)
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Conference Banquet Time: Tuesday, July 3, 18:45 Restaurant: Song He Lou ( ) The restaurant is about 1.7 km from Nanlin Hotel, approx. 25 min. by walk.
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Conference Participants
First Last University Email
Yann Bernard Monash University [email protected]
Yousef Chahine UC Santa Barbara [email protected]
Li Chen Hubei University [email protected]
Tiancong Chen Chongqing University [email protected]
Liang Cheng Central China Normal University [email protected]
Florica Cirstea The University of Sydney [email protected]
Xianzhe Dai UC Santa Barbara [email protected]
Yuxin Dong Fudan University [email protected]
Laiyuan Gao Jiangsu Normal University [email protected]
Jianquan Ge Beijing Normal University [email protected]
Bo Guan The Ohio State University [email protected]
Zihua Guo Monash University [email protected]
Daniel Hauer The University of Sydney [email protected]
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Fei He Xiamen University [email protected]
Jiaxing Hong Fudan University [email protected]
Changqing Hu Soochow University [email protected]
Bobo Hua Fudan University [email protected]
Genggeng Huang Fudan University [email protected]. cn
Huaiyu Jian Tsinghua University [email protected]
Haizhong Li Tsinghua University [email protected]
Xiaolong Li UC Irvine [email protected]
Qi-Rui Li Australian National University [email protected]
Xiangao Liu Fudan University [email protected]
Jiakun Liu University of Wollongong [email protected]
Zhiqin Lu UC Irvine [email protected]
Wenbin Lv Shanxi University [email protected]
Xinan Ma University of Science and Technology of China [email protected]
Jing Mao Hubei University [email protected]
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Davi Maximo University of Pennsylvania [email protected]
James McCoy The University of Newcastle [email protected]
Lei Ni UC San Diego [email protected]
Artem Pulemotov The University of Queensland [email protected]
Jie Qing UC Santa Cruz [email protected]
Hongbing Qiu Wuhan University [email protected]
Yibin Ren Zhejiang Normal University [email protected]
Hongliang Shao Chongqing University [email protected]
Qiang Tan Jiangsu University [email protected]
Qiang Tu Wuhan University [email protected]
Xiaoliu Wang Southeast University [email protected]
Fang Wang Shanghai Jiao Tong University [email protected]
Kui Wang Soochow University [email protected]
Yun Wang Soochow University [email protected]
Hongyu Wang Yangzhou University [email protected]
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Zuoqin Wang University of Science and Technology of China [email protected]
Yuzhao Wang Shanxi University [email protected]
Changliang Wang McMaster University [email protected]
Xiaodong Wang Michigan State University [email protected]
Guofang Wei UC Santa Barbara [email protected]
Yong Wei Australian National University [email protected]
Valentina Wheeler University of Wollongong [email protected]
Jiayong Wu Shanghai Maritime University [email protected]
Junde Wu Soochow University [email protected]
Jianchun Wu Soochow University [email protected]
Guoqiang Wu Zhejiang Sci-Tech University [email protected]
Haotian Wu The University of Sydney [email protected]
Yuhan Wu University of Wollongong [email protected]
Ge Xiong Tongji University [email protected]
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Yihu Yang Shanghai Jiao Tong University [email protected]
Shijin Zhang Beihang University [email protected]
Ying Zhang Soochow University [email protected]
Zhenlei Zhang Captial Normal University [email protected]
Qi Zhang UC Riverside & Fudan University [email protected]
Yuntao Zhang Jiangsu Normal University [email protected]
Zhou Zhang The University of Sydney [email protected]
Liang Zhao Nanjing University of
Aeronautics and Astronautics
Guangwen Zhao Fudan University [email protected]
Bin Zhou Peking University [email protected]
Peng Zhu Jiangsu University of Technology [email protected]
Anqiang Zhu Wuhan University [email protected]
