REFERENCES
- M. A. Aguilo , W. Aquino , J. C. Brigham , and M. Fatemi ( 2010 ). An inverse problem approach for elasticity imaging through vibroacoustics . IEEE Trans. Med. Imaging 29 : 1012 – 1021 .
- H. Ammari , P. Garapon , and F. Jouve ( 2010 ). Separation of scales in elasticity imgaing: A numerical study . J. Comp. Math. 28 : 354 – 370 .
- A. Arnold , S. Reichling , O. Bruhns , and J. Mosler ( 2010 ). Efficient computation of the elastography inverse problem by combining variational mesh adaption and clustering technique . Phys. Med. Biol. 55 : 2035 – 2056 .
- E. Beretta , E. Bonnetier , E. Francini , and A. Mazzucato ( 2012 ). Small volume asymptotics for anisotropic elastic inclusions . Inverse Probl. Imaging 6 : 1 – 23 .
- D. Braess ( 2007 ). Finite Elements: Theory, Fast Solvers, and Applications in Solid Mechanics. , 3rd ed. , Cambridge University Press , Cambridge , UK .
- F. Brezzi and M. Fortin ( 1991 ). Mixed and Hybrid Finite Element Methods . Springer-Verlag , New York .
- N. Cahill , B. Jadamba , A. A. Khan , M. Sama , and B. Winkler ( 2013 ). A first-order adjoint and a second-order hybrid method for an energy output least squares elastography inverse problem of identifying tumor location . Boundary Value Problems 263 .
- Z. Cai and G. Starke ( 2004 ). Least-squares methods for linear elasticity . SIAM J. Numer. Anal. 42 : 826 – 842 .
- T. F. Chan and X. C. Tai ( 2003 ). Identification of discontinuous coefficients in elliptic problems using total variation regularization . SIAM J. Sci. Comput. 25 : 881 – 904 .
- Z. Chen and J. Zou ( 1999 ). An augmented Lagrangian method for identifying discontinuous parameters in elliptic systems . SIAM J. Control Optim. 37 : 892 – 910 .
- E. Crossen , M. S. Gockenbach , B. Jadamba , A. A. Khan , and B. Winkler ( 2014 ). An equation error approach for the elasticity imaging inverse problem for predicting tumor location . Computers & Mathematics with Applications 67 ( 1 ): 122 – 135 .
- D. C. Dobson and F. Santosa ( 1996 ). Recovery of blocky images from noisy and blurred data . SIAM J. Appl. Math. 56 : 1181 – 1198 .
- Z. Dai and P. Lamm ( 2008 ). Local regularization for the nonlinear inverse autoconvolution problem . SIAM J. Numer. Anal. 46 : 832 – 868 .
- M. M. Doyley ( 2012 ). Model-based elastography: A survey of approaches to the inverse elasticity problem . Phys. Med. Biol. 57 : R35 . DOI: 10.1088/0031-9155/57/3/R35
- M. M. Doyley , P. M. Meaney , and J. C. Bamber ( 2000 ). Evaluation of an iterative reconstruction method for quantitative elastography . Phys. Med. Biol. 45 : 1521 – 1540 .
- L. Evans and R. Gariepy ( 1992 ). Measure Theory and Fine Properties of Functions . CRC Press , Boca Raton .
- J. Fehrenbach , M. Masmoudi , R. Souchon , and P. Trompette ( 2006 ). Detection of small inclusions by elastography . Inverse Problems 22 : 1055 – 1069 .
- E. Giusti ( 1984 ). Minimal Surfaces and Functions of Bounded Variation . Monographs in Mathematics , Vol . 80. Birkhauser Verlag, Basel.
- M. S. Gockenbach and A. A. Khan ( 2005 ). Identification of Lamé parameters in linear elasticity: A fixed point approach . J. Ind. Manag. Optim. 1 : 487 – 497 .
- M. S. Gockenbach and A. A. Khan ( 2007 ). An abstract framework for elliptic inverse problems. Part 1: An output least-squares approach . Math. Mech. Solids 12 : 259 – 276 .
- M. S. Gockenbach , B. Jadamba , and A. A. Khan ( 2006 ). Numerical estimation of discontinuous coefficients by the method of equation error . Int. J. Math. Comput. Sci. 1 : 343 – 359 .
- M. S. Gockenbach , B. Jadamba , and A. A. Khan ( 2008 ). Equation error approach for elliptic inverse problems with an application to the identification of Lamé parameters . Inverse Problems in Science and Engineering 16 : 349 – 367 .
- M. S. Gockenbach , B. Jadamba , A. A. Khan , C. Tammer , and B. Winkler ( 2014 ). Proximal Method for The Elastography Inverse Problem of Tumor Identification Using an Equation Error Approach . Advances in Variational and Hemivariational Inequalities with Applications. Springer , New York .
- P. Houston , D. Schotzau , and T. P. Wihler ( 2006 ). An hp-adaptive mixed discontinuous Galerkin FEM for nearly incompressible linear elasticity . Comput. Methods Appl. Mech. Engrg. 195 : 25–28, 3224–3246.
- B. Jadamba , A. A. Khan , and F. Raciti (2008). On the inverse problem of identifying Lamé coefficients in linear elasticity. Comput. Math. Appl. 56:431–443.
- B. Jadamba , A. A. Khan , and M. Sama ( 2011 ). Inverse Problems of Parameter Identification in Partial Differential Equations . Mathematics in Science and Technology. World Science , Hackensack , NJ, pp . 228 – 258 .
- B. Jadamba , A. A. Khan , G. Rus , M. Sama , and B. Winkler (to appear). A new convex inversion framework for parameter identification in saddle point problems with an application to the elasticity imaging inverse problem of predicting tumor location. SIAM Applied Mathematics.
- L. Ji and J. McLaughlin ( 2004 ). Recovery of Lamé parameter μ in biological tissues . Inverse Problems 20 : 1 – 24 .
- B. Jin , T. Khan , and P. Maass ( 2012 ). A reconstruction algorithm for electrical impedance tomography based on sparsity regularization . Internat. J. Numer. Methods Engrg. 89 : 337 – 353 .
- F. Kallel and M. Bertrand ( 1996 ). Tissue elasticity reconstruction using linear perturbation method . Medical Imaging, IEEE Trans. Med. Imaging 15 : 299 – 313 .
- I. Knowles ( 2001 ). Parameter identification for elliptic problems . J. Comp. Appl. Math. 131 : 175 – 194 .
- H. Mehrabian , G. Campbell , and A. Samani ( 2012 ). A constrained reconstruction technique of hyperelasticity parameters for breast cancer assessment . Phys. Med. Bio. 53 : 7489 – 7508 .
- M. Z. Nashed and O. Scherzer ( 1997 ). Stable approximation of nondifferentiable optimization problems with variational inequalities. In: Recent Developments in Optimization Theory and Nonlinear Analysis (Jerusalem, 1995). Contemporary Mathematics, Vol. 204. American Mathematical Society, Providence, RI, pp. 155–170.
- A. A. Oberai , N. H. Gokhale , and G. R. Feijóo ( 2003 ). Solution of inverse problems in elasticity imaging using the adjoint method . Inverse Problems 19 : 297 – 313 .
- S. Osher , A. Solé , and L. Vese ( 2003 ). Image decomposition and restoration using total variation minimization and the H 1 norm . Multiscale Model. Simul. 1 : 349 – 370 .
- E. Park and A. M. Maniatty ( 2006 ). Shear modulus reconstruction in dynamic elastography: Time harmonic case . Phy. Med. Bio. 51 : 3697 – 3721 .
- K. J. Parker , S. R. Huang , R. A. Musulin , and R. M. Lerner ( 1990 ). Tissue response to mechanical vibrations for sonoelasticity imaging . Ultrasound Med. Biol. 16 : 241 – 246 .
- K. R. Raghavan and A. E. Yagle ( 1994 ). Forward and inverse problems in elasticity imaging of soft tissues . IEEE. Trans. Nucl. Sci. 41 : 1639 – 1648 .
- J. Zou ( 1998 ). Numerical methods for elliptic inverse problems . Int. J. Comput. Math. 70 : 211 – 232 .
- Color versions of one or more of the figures in the article can be found online at www.tandfonline.com/lnfa.