References
- Brühl M, Hanke M, Vogelius MS. A direct impedance tomography algorithm for locating small inhomogeneities. Numer. Math. 2003;93:635–654.
- Ammari H, Kang H. Polarization and moment tensors with applications to inverse problems and effective medium theory. New York (NY): Springer; 2007.
- Cedio-Fengya DJ, Moskow S, Vogelius MS. Identification of conductivity imperfections of small diameter by boundary measurements. Continuous dependence and computational reconstruction. Inverse Prob. 2001;14:553–595.
- Hashin Z, Shtrikman S-A. A variational approach to the theory of the elastic behaviour of multiphase materials. J. Mech. Phys. Solids. 1963;11:127–140.
- Golden K, Papanicolaou G. Bounds for effective parameters of heterogeneous media by analytic continuation. Commun. Math. Phys. 1983;90:473–491.
- Kohn RV, Milton GW. On bounding the effective conductivity of anisotropic composites. In: Ericksen JL, Kinderlehrer D, Kohn RV, Lions J-L, editors. Homogenization and effective moduli of materials and media. New York (NY): Springer; 1986. p. 97–125.
- Belyaev AY, Kozlow SM. Hierarchical structures and estimates for homogenized coefficients. Russ. J. Math. Phys. 1993;1:5–18.
- Lipton R. Inequalities for electric and elastic polarization tensors with applications to random composites. J. Mech. Phys. Solids. 1993;41:809–833.
- Capdeboscq Y, Vogelius MS. Pointwise polarization tensor bounds, and applications to voltage perturbations caused by thin inhomogeneities. Asymptot. Anal. 2006;50:175–204.
- Griesmaier R, Hanke M. Multifrequency impedance imaging with multiple signal classification. SIAM J. Imaging Sci. 2015;8:939–967.
- McLean W. Strongly elliptic systems and boundary integral equations. Cambridge: Cambridge University Press; 2000.
- Verchota G. Layer potentials and regularity for the Dirichlet problem for Laplace’s equation in Lipschitz domains. J. Funct. Anal. 1984;59:572–611.
- Plemelj J. Potentialtheoretische Untersuchungen. Leipzig: B.G. Teubner; 1911.
- Schiffer M. Fredholm eigenvalues and conformal mapping. In: Fichera G, editor. Autovalori e autosoluzioni. Berlin: Springer; 2011. p. 205–234.
- Khavinson D, Putinar M, Shapiro HS. Poincaré’s variational problem in potential theory. Arch. Ration. Mech. Anal. 2007;185:143–184.
- Helsing J, Perfekt K-M. On the polarizability and capacitance of the cube. Appl. Comput. Harmonic Anal. 2013;34:445–468.
- Landkof NS. Foundations of modern potential theory. Berlin: Springer; 1972.
- Steinbach O, Wendland WL. On C. Neumann’s method for second-order elliptic systems in domains with non-smooth boundaries. J. Math. Anal. Appl. 2001;262:733–748.
- Rudin W. Functional analysis. 2nd ed. New York (NY): McGraw-Hill; 1991.
- Ammari H, Chow YT, Liu K, et al. Optimal shape design by partial spectral data. SIAM J. Sci. Comput. 2015;37:B855–B883.
- Bergman DJ. The dielectric constant of a composite material–a problem in classical physics. Phys. Rep. 1987;43:377–407.
- Milton GW. The theory of composites. Cambridge: Cambridge University Press; 2002.
- Keller JB. A theorem on the conductivity of a composite medium. J. Math. Phys. 1964;5:548–549.
- Evans LC, Gariepy RF. Measure theory and fine properties of functions. Boca Raton (FL): CRC Press; 1992.
- Kress R. Linear integral equations. 3rd ed. New York (NY): Springer; 2014.
- Ru CQ, Schiavone P. On the elliptic inclusion in anti-plane shear. Math. Mech. Solids. 1996;1:327–333.
- Kang H, Milton GW. Solutions to the Pólya--Szegő conjecture and the weak Eshelby conjecture. Arch. Ration. Mech. Anal. 2008;188:93–116.
- Liu LP. Solutions to the Eshelby conjectures. Proc. R. Soc. London Ser. A. 2008;464:573–594.
- Schiffer M. The Fredholm eigen values of plane domains. Pac. J. Math. 1957;7:1187–1225.
- Capdeboscq Y, Kang H. Improved bounds on the polarization tensor of thick domains. Contemporary Mathematics. In: Ammari H, Kang H, editors. Inverse problems, multi-scale analysis, and effective medium theory, Providence (RI): American Mathematical Society; 2006. pp. 69–74.
- Kang H, Milton GW. Inverse problems, multi-scale analysis, and effective medium theory. Contemporary Mathematics, In: Ammari H, Kang H, editors. On conjectures of Polya--Szegő and Eshelby. Providence (RI): American Mathematical Society; 2006. pp. 75–79.
- Capdeboscq Y, Vogelius MS. A general representation formula for boundary voltage perturbations caused by internal conductivity inhomogeneities of low volume fraction, M2AN Math. Model. Numer. Anal. 2003;37:159–173.