Ching-Lung Lin  (ªL´º¶©)
RankProfessor
Tel+886-6-2757575 Ext. 65132
Fax+886-6-2743191
OfficeMath Building 302
Emailcllin2@mail.ncku.edu.tw
Homepagehttp://www.math.ncku.edu.tw/~cllin/
FieldPartial Differential Equations, Inverse Problems
EducationPh.D., National Cheng Kung University(2004)
Experience2010-  Professor, National Cheng Kung University
2008-2010  Associate Professor, National Cheng Kung University
2007-2008  Associate Professor, National Chung Cheng University
2004-2007  Assistant Professor, National Chung Cheng University
Selected Publications
  1. Ching-Lung Lin and Jenn-Nan Wang, Uniqueness in inverse problems for an elasticity system with residual stress by a single measurement, Inverse Problems, 19 (2003), 807- 820.
  2. Ching-Lung Lin, Strong unique continuation for an elasticity system with residual stress, Indiana University Mathematics Journal, 53 (2004) 557- 582.
  3. Ching-Lung Lin and Jenn-Nan Wang, Strong unique continuation for the Lame system with Lipschitz coefficients. Mathematische Annalen, 331 (2005) , no. 3, 611- 629.
  4. Jin Cheng; Ching-Lung Lin; Gen Nakamura, Unique continuation along curves and hypersurfaces for second order anisotropic hyperbolic systems with real analytic coefficients. Proceedings of the A.M.S., 133(2005), no. 8, 2359-2367
  5. Kun-Chu Chen and Ching-Lung Lin, An expansion theorem for two-dimensional elastic waves and its application. Mathematical Methods in the Applied Science, 29(2006), no.15, 1849-1860.
  6. Ching-Lung Lin, Strong unique continuation for $m$-th powers of a Laplacian operator with singular coefficients, Proceedings of the A.M.S., 135(2007), no.2, 569-578.
  7. Ching-Lung Lin, Gen Nakamura and Jenn-Nan Wang, Three spheres inequalities for a two-dimensional elliptic system and its application, J. Differential Equations, 232(2007), 329-351.
  8. Ching-Lung Lin, Gen Nakamura, Mourad Sini, Unique continuation for the elastic transversely isotropic dynamical systems and its application, J. Differential Equations, 245 (2008) 3008¡V3024.
  9. Ching-Lung Lin and Gen Nakamura, Conditional Stability for the Hexagonal Anisotropic Elastic Dynamical Systems, Communications in Partial Differential Equations, 34 (2009), no.10, 1251¡V1264, .
  10. Ching-Lung Lin, Gunther Uhlmann and Jenn-Nan Wang (2010, Nov), Optimal three-ball inequalities and quantitative uniqueness for the Stokes system, DCDS-A, (28), No.3, 1273-1290. A special issue. Dedicated to Louis Nirenberg on the occasion of his 85th birthday edited by Luis Caffarelli, Yanyan Li.
  11. Ching-Lung Lin, Gen Nakamura and Jenn-Nan Wang, Optimal three-ball inequalities and quantitative uniqueness for the Lame system with Lipschitz coefficients, Duke Math. J., 155(2010), no 1, 189-204.
  12. Ching-Lung Lin and Gen Nakamura Unique Continuation Property for a Coupled Second-Fourth Order Dynamical System and Its Application, SIAM J. Math. Anal., 42(2010), no 5, 2318-2336.
  13. Ching-Lung Lin, Gen Nakamura,Gunther Uhlmann and Jenn-Nan Wang , Quantitative strong unique continuation for the Lame system with less regular coefficients. Methods and Applications of Analysis., 18, no 1, (2011), 85-92.
  14. Ching-Lung Lin, Gen Nakamura and Jenn-Nan Wang, Quantitative uniqueness for second order elliptic operators with strongly singular coefficients. Revista Mathematica Iberoamericana, 27, no 2, (2011), 475-491.
  15. Ching-Lung Lin, Sei Nagayasu, Jenn-Nan Wang, Quantitative uniqueness for the power of Laplacian with singular coefficients, Ann. Sc. Norm. Super. Pisa Cl. Sci, (5) (2011), no. 3, PP. 513-531.
  16. Ching-Lung Lin, Gunther Uhlmann, Jenn-Nan Wang, Asymptotic behavior of solutions of the stationary Navier-Stokes equations in an exterior domain, Indiana Univ. Math. J. 60 No. 6 (2011), 2093¡V2106.
  17. MICHELE DI CRISTO, CHING-LUNG LIN, JENN-NAN WANG, Quantitative uniqueness estimates for the shallow shell system and their application to an inverse problem, Ann. Sc. Norm. Super. Pisa Cl. Sci, (5) Vol. XII (2013), 43-92.
  18. M. DI CRISTO, C.-L. LIN, S. VESSELLA , AND J.-N. WANG, Size Estimates of the Inverse Inclusion Problem for the Shallow Shell Equation, SIAM J. Math. Anal., 45(2013), no 1, 88-100.
  19. Cheng, Jin; Lin, Ching-Lung; Nakamura, Gen Unique continuation property for the anomalous diffusion and its application. J. Differential Equations 254 (2013), no. 9, 3715¡V3728.
  20. Di Cristo, M.; Lin, C.-L.; Morassi, A.; Rosset, E.; Vessella, S.; Wang, J.-N. Doubling inequalities for anisotropic plate equations and applications to size estimates of inclusions. Inverse Problems 29 (2013), no. 12, 125012, 17 pp.
  21. Lin, Ching-Lung; Wang, Jenn-Nan . Quantitative uniqueness estimates for the general second order elliptic equations. J. Funct. Anal. 266 (2014), no. 8, 5108¡V5125.
  22. Ching-Lung Lin; Gen Nakamura . Unique continuation property for anomalous slow diffusion equation. Communications in Partial Differential Equations, 41:5 (2016), 749-758.
  23. Koch, Herbert; Lin, Ching-Lung; Wang, Jenn-Nan; Doubling inequalities for the Lame system with rough coefficients. Proc. Amer. Math. Soc. 144 (2016), no. 12, 5309¡V5318.
  24. Lin, Ching-Lung; Wang, Jenn-Nan Quantitative estimate of the stationary Navier-Stokes equations at infinity and uniqueness of the solution. Bull. Inst. Math. Acad. Sin. (N.S.) 11 (2016), no. 1, 163¡V177.
  25. Francini, E.; Lin, C.-L.; Vessella, S.; Wang, J.-N. Three-region inequalities for the second order elliptic equation with discontinuous coefficients and size estimate. J. Differential Equations 261 (2016), no. 10, 5306¡V5323.
  26. Di Cristo, M.; Francini, E.; Lin, C.-L.; Vessella, S.; Wang, J.-N. Carleman estimate for second order elliptic equations with Lipschitz leading coefficients and jumps at an interface. J. Math. Pures Appl. (9) 108 (2017), no. 2, 163¡V206.
  27. Pu-Zhao Kow, Ching-Lung Lin, On decay rate of solutions for the stationary Navier¡VStokes equation in an exterior domain. J. Differential Equations, 266 (2019) 3279¡V3309.
  28. Davey, Blair; Lin, Ching-Lung; Wang, Jenn-Nan, Liouville-type theorem for the Lame system with singular coefficients Proc. Amer. Math. Soc. 147 (2019), no. 6, 2619¡V2624.
  29. Lin, Ching-Lung; Nakamura, Gen; Unique continuation property for multi-terms time fractional diffusion equation Math. Ann. 373(2019), no. 3-4, 929¡V952.
  30. Lin, Ching-Lung; Lin, Liren; Nakamura, Gen; Born approximation and sequence for hyperbolic equations Asymptot. Anal. 121 (2021), no. 2, 101¡V123.
  31. Blair Davey, Ching-Lung Lin & Jenn-Nan Wang; Strong unique continuation for the Lame system with less regular coefficients Mathematische Annalen volume 381, pages 1005¡V1029 (2021)
  32. Honda, Naofumi, Lin, Ching-Lung, Nakamura, Gen and Sasayama, Satoshi; Unique continuation property of solutions to general second order elliptic systems Journal of Inverse and Ill-posed Problems, vol. 30, no. 1, (2022), pp. 5-21.
  33. Lin, Ching-Lung; Wang, Jenn-Nan; Quantitative uniqueness estimates for the generalized non-stationary Stokes system. Applicable Analysis, 101 (2022), no. 10, 3591¡V3611.
  34. Matthias Eller, Naofumi Honda, Ching-Lung Lin and Gen Nakamu; Global unique continuation from the boundary for a system of viscoelasticity with analytic coefficients and a memory term. Inverse Problems and Imaging, 16 (2022), no. 6, 1529-1542.
  35. Lin, Ching-Lung; Nakamura, Gen; Classical unique continuation property for multi-term time-fractional evolution equations Math. Ann. 385(2023), no. 1-2, 551¡V574.
  36. de Hoop, Maarten V; Furuya, Takashi; Lin, Ching-Lung; Nakamura, Gen; Vashisth, Manmohan; Local recovery of a piecewise constant anisotropic conductivity in EIT on domains with exposed corners. Inverse Problems 39 (2023), no. 2, Paper No. 025005, 26 pp.