LI Chan - 李婵

Author:Date:2020-07-07Views:355

Personalinformation

Name:ChanLi

Office: Room412,6th BuildingSouth,Hangzhou Dianzi Campus, Xiasha, Hangzhou  

Currentoccupation: Departmentof Mathematics, School of Sciences,HangzhouDianzi University


Telephone: (86)-571-86878594

E-Mail: chanli@hdu.edu.cn


EDUCATION

Sep.2011 - Jun.2016, Ph.Din Mathematics, FudanUniversity, P.R. China

Apr.2013 - Aug. 2013,  Visit scholar, NationalSun Yat-sen University

Sep.2007- Jun.2011, B.S.in Mathematics, LanzhouUniversity,P.R. China


ProfessionalWorking Experience

  1. present,Lecture, School of Sciences,Hangzhou Dianzi University, Hangzhou, P. R. China


RESEARCHINTEREST

Myresearch interestsaretheasymptotic behaviors of solutions for dynamical systems.The research works that I have completed in the past include:

Asymptoticsfor Wentzell systems, acoustic systems, and viscoelastic systems.


SelectedPublications

●  ChanLi*, Jin Liang, Ti-Jun Xiao,Dynamical behaviors of solutions to nonlinear

waveequations with vanishing local damping and Wentzell boundaryconditions, Zeitschrift für angewandte Mathematik und Physik, 2018,69:102.

ChanLi,Jin Liang, Ti-Jun Xiao, Polynomial stability for wave equationswith

acousticboundary conditions and boundary memory damping, Applied Mathematicsand

Computation,2018, 321: 593~601.

●  ChanLi,Jin Liang, Ti-Jun Xiao,Boundarystabilization for waveequationswith damping only on the nonlinear Wentzell boundary, NonlinearAnalysis-Theory Methods & Applications, 2017, 164: 155~175.

●  ChanLi, Ti-Jun Xiao, Polynomial stability for wave equations with wentzellboundary conditions , Journal of Nonlinear and Convex Analysis, 2017,18(10): 1801~1814.

●  ChanLi,Ti-Jun Xiao, Asymptotics for wave equations with Wentzell boundaryconditions and boundary damping , Semigroup Forum, 2017, 94(3):520~531.

●  ChanLi,Ti-Jun Xiao, A note on the IBVP for wave equations withdynamicboundary conditions, Boundary Value Problems, 2016, 2016(34).

SUPPORTINGFUNDING

Asymptoticsfor wave equations with dynamical boundaryconditions,No. LQ19A010009,

Year:2019-2021,NationalNatural Foundation of ZhejiangProvince,P. R. China

Onetype of evolution equation in viscoelastic materialscience,No.11947004,Year: 2020,

NationalNatural Foundation of China,P. R. China