Author
Yi-Hsuan Lin
Other affiliations: Hong Kong University of Science and Technology, University of Jyväskylä, University of Washington ...read more
Bio: Yi-Hsuan Lin is an academic researcher from National Chiao Tung University. The author has contributed to research in topics: Inverse problem & Mathematics. The author has an hindex of 17, co-authored 47 publications receiving 688 citations. Previous affiliations of Yi-Hsuan Lin include Hong Kong University of Science and Technology & University of Jyväskylä.
Papers
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TL;DR: In this article, a method for solving Calderon type inverse problems for semilinear equations with power type nonlinearities was introduced, which allows one to solve inverse problems in cases where the solution for a corresponding linear equation is not known.
102 citations
TL;DR: In this paper, the inverse problem of a Schrodinger type variable nonlocal elliptic operator (−∇⋅(A(x)∇))s+q for any dimension n ≥ 2 was introduced.
Abstract: In this paper, we introduce an inverse problem of a Schrodinger type variable nonlocal elliptic operator (−∇⋅(A(x)∇))s+q), for 0
76 citations
TL;DR: In this paper, the Calderon problem for the fractional Schrodinger equation with drift is studied and it is shown that the unknown drift and potential in a bounded domain can be determined simultaneously and uniquely by an infinite number of exterior measurements.
Abstract: We investigate the Calderon problem for the fractional Schrodinger equation with drift, proving that the unknown drift and potential in a bounded domain can be determined simultaneously and uniquely by an infinite number of exterior measurements. In particular, in contrast to its local analogue, this nonlocal problem does not enjoy a gauge invariance. The uniqueness result is complemented by an associated logarithmic stability estimate under suitable apriori assumptions. Also uniqueness under finitely many generic measurements is discussed. Here the genericity is obtained through singularity theory which might also be interesting in the context of hybrid inverse problems. Combined with the results from Ghosh et al. (Uniqueness and reconstruction for the fractional Calderon problem with a single easurement, 2018. arXiv:1801.04449), this yields a finite measurements constructive reconstruction algorithm for the fractional Calderon problem with drift. The inverse problem is formulated as a partial data type nonlocal problem and it is considered in any dimension $$n\ge 1$$.
66 citations
TL;DR: In this paper, the Dirichlet-to-Neumann map of the above equation is used to determine the Taylor series of a(x,z) at z = 0 under general assumptions on the unknown cavity inside the domain or an unknown part of the boundary of the domain.
Abstract: We study various partial data inverse boundary value problems for the semilinear elliptic equation Δu+a(x,u)=0 in a domain in Rn by using the higher order linearization technique introduced by Lassas–Liimatainen–Lin–Salo and Feizmohammadi–Oksanen. We show that the Dirichlet-to-Neumann map of the above equation determines the Taylor series of a(x,z) at z=0 under general assumptions on a(x,z). The determination of the Taylor series can be done in parallel with the detection of an unknown cavity inside the domain or an unknown part of the boundary of the domain. The method relies on the solution of the linearized partial data Calderon problem by Ferreira–Kenig–Sjostrand–Uhlmann, and implies the solution of partial data problems for certain semilinear equations Δu+a(x,u)=0 also proved by Krupchyk–Uhlmann.
65 citations
16 Nov 2018
TL;DR: In this article, the authors study global uniqueness in an inverse problem for the fractional semilinear Schrödinger equation (−∆)su + q(x, u) = 0 with s ∈ (0, 1) for any space dimension greater than or equal to 2.
Abstract: We study global uniqueness in an inverse problem for the fractional semilinear Schrödinger equation (−∆)su + q(x, u) = 0 with s ∈ (0, 1). We show that an unknown function q(x, u) can be uniquely determined by the Cauchy data set. In particular, this result holds for any space dimension greater than or equal to 2. Moreover, we demonstrate the comparison principle and provide a L∞ estimate for this nonlocal equation under appropriate regularity assumptions.
63 citations
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Journal Article•
1,019 citations
Book•
01 Jan 1973
TL;DR: In this article, Fourier series and Fourier transforms have been used to describe fundamental theory, evolution equations, and semi-linear hyperbolic equations, as well as a number of others.
Abstract: Preface 1. Fourier series and Fourier transforms 2. Distributions 3. Elliptic equations (fundamental theory) 4. Initial value problems (Cauchy problems) 5. Evolution equations 6. Hyperbolic equations 7. Semi-linear hyperbolic equations 8. Green's functions and spectra Supplementary remarks Guide to the literature Bibliography Symbols Index.
527 citations
01 Jan 2016
TL;DR: The integral equation methods in scattering theory is universally compatible with any devices to read and is available in the book collection an online access to it is set as public so you can download it instantly.
Abstract: Thank you very much for downloading integral equation methods in scattering theory. Maybe you have knowledge that, people have look numerous times for their favorite readings like this integral equation methods in scattering theory, but end up in malicious downloads. Rather than enjoying a good book with a cup of coffee in the afternoon, instead they juggled with some harmful virus inside their laptop. integral equation methods in scattering theory is available in our book collection an online access to it is set as public so you can download it instantly. Our books collection saves in multiple countries, allowing you to get the most less latency time to download any of our books like this one. Kindly say, the integral equation methods in scattering theory is universally compatible with any devices to read.
154 citations
01 Jan 1983
TL;DR: In this article, the basic integral equations for two-dimensional elastic linear material problems are introduced and extended to deal with initial stress and strain type loads, such kind of loads are not only important to take into account temperature or other similar loads, but also to model nonlinear material behaviour when used in conjunction with a well established successive elastic solution technique.
Abstract: This chapter is concerned with the introduction of the basic integral equations for two-dimensional elastic linear material problems. It starts by briefly reviewing the partial differential equations for linear elastic material and introducing the necessary notations involved in the formulation. These governing equations are also extended to deal with problems in which initial stress and strain type loads are applied. Such kind of loads are not only important to take into account temperature or other similar loads, but also to model nonlinear material behaviour when used in conjunction with a well established successive elastic solution technique.
124 citations