Abstract
For the isotropic Lamé system we prove that if the Lamé coefficient μ is a positive constant, both Lamé coefficients may be recovered from the partial Cauchy data.
Editor-in-Chief: Kabanikhin, Sergey I.
Managing Editor: Shishlenin, Maxim A.
null Friedman, Avner / Gorenflo, Rudolf / Lax, P. / Nishida, T. / Pukhnachev, Vladislav V. / Sabatier, P. / Alessandrini, G. / Anikonov, Yurii E. / Banks, H.T. / Belishev, M. / Belov, Yurii Ya. / Bukhgeim, A.L. / Chavent, G. / Cheng, Jin / Denisov, A.N. / Engl, Heinz W. / Hasanoglu, Alemdar / Hofmann, Bernd / Kojima, Hisako / Kokurin, Mihail Yu. / Kress, R. / Lorenzi, Alfredo / Neubauer, Andreas / Novikov, Roman G. / Paivarinta, L. / Prilepko, A. / Romanov, Vladimir G. / Sacks, Paul / Uhlmann, G. / Vasin, Vladimir V. / Wang, Yanfei / Yagola, Anatoly G. / Yamamoto, Masahiro / Yurko, Vacheslav A. / Zou, Jun
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On reconstruction of Lamé coefficients from partial Cauchy data
1Department of Mathematics, Colorado State University, 101 Weber Building, Fort Collins CO, 80523, USA.
2Department of Mathematical Sciences, The University of Tokyo, Komaba, Meguro, Tokyo 153, Japan.
Citation Information: Journal of Inverse and Ill-posed Problems. Volume 19, Issue 6, Pages 881–891, ISSN (Online) 1569-3945, ISSN (Print) 0928-0219, DOI: 10.1515/jiip.2011.060, November 2011
Publication History:
Received: 28/09/2011;
Published Online: 28/02/2012
Keywords.: Inverse problem; Lamé system
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