A globally convergent numerical method for an inverse elliptic problem of optical tomography

Michael V. Klibanov Department of Mathematics and Statistics, University of North Carolina at Charlotte, Charlotte, NC 28223, USACorrespondence[email protected]

Jianzhong Su Department of Mathematics, University of Texas at Arlington, Arlington, TX 76019, USA

Natee Pantong Department of Mathematics, University of Texas at Arlington, Arlington, TX 76019, USA

Hua Shan Department of Mathematics, University of Texas at Arlington, Arlington, TX 76019, USA

Hanli Liu Department of Bioengineering, University of Texas at Arlington, Arlington, TX 76019, USA

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Jianzhong Su, Michael V. Klibanov, Yueming Liu, Zhijin Lin, Natee Pantong & Hanli Liu. (2013) Optical imaging of phantoms from real data by an approximately globally convergent inverse algorithm. Inverse Problems in Science and Engineering 21:7, pages 1125-1150.
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Larisa Beilina & Michael V. Klibanov. (2012) The philosophy of the approximate global convergence for multidimensional coefficient inverse problems. Complex Variables and Elliptic Equations 57:2-4, pages 277-299.
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Natee Pantong, Aubrey Rhoden, Shao-Hua Yang, Sandra Boetcher, Hanli Liu & Jianzhong Su. (2011) A globally convergent numerical method for coefficient inverse problems for thermal tomography. Applicable Analysis 90:10, pages 1573-1594.
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Articles from other publishers (6)

Xiaomeng Liu, Kristofer Henderson, Joshua Rego, Suren Jayasuriya & Sanjeev Koppal. (2021) Dense Lissajous sampling and interpolation for dynamic light-transport. Optics Express 29:12, pages 18362.
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Larisa Beilina & Evgenii Karchevskii. 2015. Inverse Problems and Applications. Inverse Problems and Applications 125 134 .

Jianzhong Su, Yueming Liu, Zi-Jing Lin, Steven Teng, Aubrey Rhoden, Natee Pantong & Hanli Liu. (2014) Reconstructions for Continuous-Wave Diffuse Optical Tomography by a Globally Convergent Method. Journal of Applied Mathematics and Physics 02:05, pages 204-213.
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Aubrey Rhoden, Natee Patong, Yueming Liu, Jianzhong Su & Hanli Liu. 2013. Applied Inverse Problems. Applied Inverse Problems 105 128 .

Larisa Beilina & Michael V. Klibanov. 2013. Applied Inverse Problems. Applied Inverse Problems 15 36 .

A. V. Kuzhuget, L. Beilina & M. V. Klibanov. (2012) Approximate global convergence and quasireversibility for a coefficient inverse problem with backscattering data. Journal of Mathematical Sciences 181:2, pages 126-163.
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A globally convergent numerical method for an inverse elliptic problem of optical tomography

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A globally convergent numerical method for an inverse elliptic problem of optical tomography

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