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Applicable Analysis
An International Journal
Volume 88, 2009 - Issue 5: Inverse Problems
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Original Articles

An inverse resistivity problem: 1. Lipschitz continuity of the gradient of the objective functional

Balgaisha Mukanova The Faculty of Mechanics and Mathematics, Al-Farabi Kazakh, National University, Almaty-505012, Masanchi str. 39/47, KazakhstanCorrespondence[email protected]
Pages 749-765 | Received 10 Feb 2009, Accepted 04 Apr 2009, Published online: 22 Jul 2009

Citations (5)

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Read on this site (2)

Balgaisha Mukanova. (2013) A numerical solution to the well resistivity-sounding problem in the axisymmetric case. Inverse Problems in Science and Engineering 21:5, pages 767-780.
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Balgaisha Mukanova. (2009) An inverse resistivity problem: 2. Unilateral convexity of the objective functional. Applicable Analysis 88:5, pages 767-788.
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Articles from other publishers (3)

Maciej Smołka. (2017) Differentiability of the objective in a class of coefficient inverse problems. Computers & Mathematics with Applications 73:11, pages 2375-2387.
Crossref
Alemdar Hasanov & Balgaisha Mukanova. 2015. Handbook of Geomathematics. Handbook of Geomathematics 1845 1862 .
AlemdarHasanov (Hasanoǧlu)Balgaisha Mukanova. 2020. Handbook of Geomathematics. Handbook of Geomathematics 1 16 .

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