10 citations to 10.1007/s00032-006-0056-2 (Crossref Cited-By Service)
  1. Michael V. Klibanov, Andrey V. Kuzhuget, Sergey I. Kabanikhin, Dmitriy V. Nechaev, “A new version of the quasi-reversibility method for the thermoacoustic tomography and a coefficient inverse problem”, Applicable Analysis, 87, no. 10-11, 2008, 1227  crossref
  2. Alfredo Lorenzi, Vladimir G. Romanov, “Recovering two Lamé kernels in a viscoelastic system”, Inverse Problems & Imaging, 5, no. 2, 2011, 431  crossref
  3. S. I. Kabanikhin, “Definitions and examples of inverse and ill-posed problems”, Journal of Inverse and Ill-posed Problems, 16, no. 4, 2008  crossref
  4. Michael V Klibanov, “Thermoacoustic tomography with an arbitrary elliptic operator”, Inverse Problems, 29, no. 2, 2013, 025014  crossref
  5. Nguyen Trung Thành, Larisa Beilina, Michael V. Klibanov, Michael A. Fiddy, “Imaging of Buried Objects from Experimental Backscattering Time-Dependent Measurements Using a Globally Convergent Inverse Algorithm”, SIAM J. Imaging Sci., 8, no. 1, 2015, 757  crossref
  6. Michael V Klibanov, Vladimir G Romanov, “Two reconstruction procedures for a 3D phaseless inverse scattering problem for the generalized Helmholtz equation”, Inverse Problems, 32, no. 1, 2016, 015005  crossref
  7. Alfredo Lorenzi, Francesca Messina, Vladimir G. Romanov, “Recovering a Lamé kernel in a viscoelastic system”, Applicable Analysis, 86, no. 11, 2007, 1375  crossref
  8. V. G. Romanov, “A two-dimensional inverse problem of viscoelasticity”, Dokl. Math., 84, no. 2, 2011, 649  crossref
  9. V.G. Romanov, M. Yamamoto, “Recovering a Lamé kernel in a viscoelastic equation by a single boundary measurement”, Applicable Analysis, 89, no. 3, 2010, 377  crossref
  10. V. G. Romanov, “A stability estimate for the solution to the ill-posed Cauchy problem for elasticity equations”, Journal of Inverse and Ill-posed Problems, 16, no. 6, 2008  crossref