References
- Ammari H, Garapon P, Jouve F. Separation of scales in elasticity imaging: a numerical study. J Comput Math. 2010;28(3):354–370.
- Boehm C, Ulbrich M. A semismooth Newton-CG method for constrained parameter identification in seismic tomography. SIAM J Sci Comput. 2015;37(5):S334–S364.
- Boiger R, Kaltenbacher B. An online parameter identification method for time dependent partial differential equations. Inverse Prob. 2016;32(4):045006, 28.
- Clason C. L∞ fitting for inverse problems with uniform noise. Inverse Prob. 2012;28(10):104007, 18.
- Crossen E, Gockenbach MS, Jadamba B, et al. An equation error approach for the elasticity imaging inverse problem for predicting tumor location. Comput Math Appl. 2014;67(1):122–135.
- Evstigneev RO, Medvedik MY, Smirnov YG. Inverse problem of determining parameters of inhomogeneity of a body from acoustic field measurements. Comput Math Math Phys. 2016;56(3):483–490.
- Gholami A, Mang A, Biros G. An inverse problem formulation for parameter estimation of a reaction-diffusion model of low grade gliomas. J Math Biol. 2016;72(1–2):409–433.
- Gockenbach MS, Jadamba B, Khan AA, et al. Proximal methods for the elastography inverse problem of tumor identification using an equation error approach. In: Han W, Migórski S, Sofonea M, editors. Advances in variational and hemivariational inequalities. Vol. 33, Advances in mechanics and mathematics. Cham: Springer; 2015. p. 173–197.
- Guchhait S, Banerjee B. Constitutive error based material parameter estimation procedure for hyperelastic material. Comput Methods Appl Mech. Eng. 2015;297:455–475.
- Hager W, Ngo C, Yashtini M, et al. An alternating direction approximate Newton algorithm for ill-conditioned inverse problems with application to parallel MRI. J Oper Res Soc China. 2015;3(2):139–162.
- Kindermann S, Mutimbu LD, Resmerita E. A numerical study of heuristic parameter choice rules for total variation regularization. J Inverse Ill-Posed Prob. 2014;22(1):63–94.
- Kuchment P, Steinhauer D. Stabilizing inverse problems by internal data. II: non-local internal data and generic linearized uniqueness. Anal Math Phys. 2015;5(4):391–425.
- Liu T. A wavelet multiscale-homotopy method for the parameter identification problem of partial differential equations. Comput Math Appl. 2016;71(7):1519–1523.
- Manservisi S, Gunzburger M. A variational inequality formulation of an inverse elasticity problem. Appl Numer Math. 2000;34(1):99–126.
- Neubauer A, Hein T, Hofmann B, et al. Improved and extended results for enhanced convergence rates of Tikhonov regularization in Banach spaces. Appl Anal. 2010;89(11):1729–1743.
- Xu Y, Zou J. Convergence of an adaptive finite element method for distributed flux reconstruction. Math Comp. 2015;84(296):2645–2663.
- Al-Jamal MF, Gockenbach MS. Stability and error estimates for an equation error method for elliptic equations. Inverse Prob. 2012;28(9):095006, 15.
- Chen Z, Zou J. An augmented Lagrangian method for identifying discontinuous parameters in elliptic systems. SIAM J Control Optim. 1999;37(3):892–910.
- Knowles I. Parameter identification for elliptic problems. J Comput Appl Math. 2001;131(1–2):175–194.
- Tucciarelli T, Ahlfeld DP. A new formulation for transmissivity estimation with improved global convergence properties. Water Resour Res. 1991;27(2):243–251.
- Gockenbach MS, Khan AA. An abstract framework for elliptic inverse problems: Part 1. An output least-squares approach. Math Mech Solids. 2007;12(3):259–276.
- Gockenbach MS, Jadamba B, Khan AA. Numerical estimation of discontinuous coefficients by the method of equation error. Int J Math Comput Sci. 2006;1(3):343–359.
- Gockenbach MS, Khan AA. Identification of Lamé parameters in linear elasticity: a fixed point approach. J Ind Manag Optim. 2005;1(4):487–497.
- Gockenbach MS, Khan AA. An abstract framework for elliptic inverse problems. II. An augmented Lagrangian approach. Math Mech Solids. 2009;14(6):517–539.
- Jadamba B, Khan AA, Rus G, et al. 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 J Appl Math. 2014;74(5):1486–1510.
- Acar R, Vogel CR. Analysis of bounded variation penalty methods for ill-posed problems. Inverse Prob. 1994;10(6):1217–1229.
- Giusti E. Minimal surfaces and functions of bounded variation. Vol. 80, Monographs in mathematics. Basel: Birkhäuser Verlag; 1984.
- Chavent G. Local stability of the output least square parameter estimation technique. Mat Apl Comput. 1983;2(1):3–22.
- Kravaris C, Seinfeld JH. Identification of parameters in distributed parameter systems by regularization. SIAM J Control Optim. 1985;23(2):217–241.
- Robinson SM. Stability theory for systems of inequalities. II. Differentiable nonlinear systems. SIAM J Numer Anal. 1976;13(4):497–513.
- Alt W. Lipschitzian perturbations of infinite optimization problems. In: Mathematical programming with data perturbations, II (Washington, D.C., 1980). Vol. 85, Lecture notes in pure and applied mathematics. New York (NY): Dekker; 1983. p. 7–21.
- Colonius F, Kunisch K. Stability for parameter estimation in two-point boundary value problems. J Reine Angew Math. 1986;370:1–29.
- Alt W. Stability of solutions for a class of nonlinear cone constrained optimization problems. II. Application to parameter estimation. Numer Funct Anal Optim. 1989;10(11–12):1065–1076.
- Alessandrini G, Morassi A, Rosset E, et al. Global stability for an inverse problem in soil-structure interaction. Proc R Soc A. 2015;471(2179):20150117, 12.
- Bergounioux M, Schwindt EL. On the uniqueness and stability of an inverse problem in photo-acoustic tomography. J Math Anal Appl. 2015;431(2):1138–1152.
- de Hoop MV, Qiu L, Scherzer O. Local analysis of inverse problems: Hölder stability and iterative reconstruction. Inverse Prob. 2012;28(4):045001, 16.
- White LW. Stability of optimal output least squares estimators in certain beams and plate models. Appl Anal. 1990;39(1):15–33.
- Colonius F, Kunisch K. Stability of perturbed optimization problems with applications to parameter estimation. Numer Funct Anal Optim. 1990;11(9–10):873–915.
- Colonius F, Kunisch K. Output least squares stability in elliptic systems. Appl Math Optim. 1989;19(1):33–63.
- Alt W. Stability of solutions for a class of nonlinear cone constrained optimization problems, part 1: basic theory. Numer Funct Anal Optim. 1989;10(11–12):1053–1064.
- White LW. Estimation of flexural rigidity in a Kirchhoff plate model. Appl Math Comput. 1988;27(4, part II):337–359.
- Deckelnick K, Hinze M. Convergence and error analysis of a numerical method for the identification of matrix parameters in elliptic PDEs. Inverse Prob. 2012;28(11):115015, 15.
- Resmerita E, Scherzer O. Error estimates for non-quadratic regularization and the relation to enhancement. Inverse Prob. 2006;22(3):801–814.
- Borggaard J, van Wyk H-W. Gradient-based estimation of uncertain parameters for elliptic partial differential equations. Inverse Prob. 2015;31(6):065008, 33.
- Gwinner J, Jadamba B, Khan AA, et al. Identification in variational and quasi-variational inequalities. J Convex Anal. 2017:1–20.
- Cho M, Jadamba B, Kahler R, et al. First-order and second-order adjoint methods for the inverse problem of identifying nonlinear parameters in PDEs, Industrial Mathematics and Complex systems. Chennai: Springer; 2017. p. 1–16.
- Jadamba B, Khan AA, Oberai A, et al. First-order and second-order adjoint methods for parameter identification problems with an application to the elasticity imaging inverse problem. Inverse Prob Sci Eng. 2017;1–20.