References
- Abda A, Hassen F, Leblond J, et al. Sources recovery from boundary data: A model related to lectroencephalorgraphy. Math Comput Model. 2009;49:2213–2223.
- Ammari H, Bao G, Wood AW. Analysis of the electromagnetic scattering from a cavity. Japan J Indust Appl Math. 2002;19:301–310.
- Cakoni F, Colton D. Qualitative methods in inverse scattering theory. Berlin: Springer; 2005.
- Cheney M, Borden B. Problems in synthetic-aperture radar imaging. Inverse Probl. 2009;25:123005.
- Colton D, Kress R. Integral equation methods in scattering theory. Chichester: Wiley; 1983.
- Colton D, Kress R. Inverse acoustic and electromagnetic scattering theory. 2nd ed. Berlin: Springer; 1998.
- Feng L. Study of the some scattering and inverse scattering problems and its numerical methods in optics and electromagnetics [dissertation]. Changchun: Jilin University; 2003.
- Zheng E, Ma F, Zhang D. A least-squares finite element method for solving the polygonal-line arc-scattering problem. Appl Anal. 2014;93:1164–1177.
- Inglese G. An inverse problem in corrosion detection. Inverse Prob. 1997;13:977–994.
- Yu DH. Natural boundary integral method and its applications. Vol. 539. Mathematics and its applications. Dordrecht: Kluwer Academic; 2002.
- Han H, Wu X. Artificial boundary method. Berlin: Springer; 2013.
- Bérenger JP. A perfectly matched layer for the absorption of electromagnetic waves. J Comput Phys. 1994;114:185–200.
- Bérenger JP. Perfectly matched layer (PML) for computational electromagnetics. Vol. 8. Synthesis lectures on computational electromagnetics: Morgan & Claypool, London; 2007.
- Melenk JM, Sauter S. Wavenumber explicit convergence analysis for Galerkin discretization of the Helmholtz equation. SIAM J Numer Anal. 2011;49:1210–1243.
- Reed WH, Hill TR. Triangular mesh methods for the neutron transport equation. Tech Report LA-UR-73-479, Los Alamos Scientific Laboratory, Los Alamos (NM). 1973.
- Bassi F, Rebay S. A high-order accurate discontinuous finite element method for the numerical solution of the compressible Navier-Stokes equation. J Comput Phys. 1977;131:267–279.
- Brezzi F, Manzini G, Marini D, et al. Discontinuous Galerkin approximations for elliptic problems. Numer Meth Part D E. 2000;16:365–378.
- Castillo P, Cockburn B, Perugia I, et al. An a priori error analysis of the local discontinuous Galerkin method for the elliptic problems. Numer Meth Part D E. 2000;16:365–378.
- Cockburn B, Karniadakis GE, Shu CW, editors. Discontinuous Galerkin methods: theory, computation and applications. Berlin: Springer; 2000.
- Cockburn B, Shu CW. The local discontinuous Galerkin method for time-dependent convection-diffusion systems. SIAM J Numer Anal. 1998;35:2440–2463.
- Arnold DN. An interior penalty finite element method with discontinous elements. SIAM J Numer Anal. 1982;19:510–521.
- Arnold DN. An interior penalty finite element method with discontinuous elements. [Ph.D. thesis]. The University of Chicago, Chicago (IL), 1979.
- Baker G. Finite element methods for elliptic equations using nonconforming elements. Math Comput. 1977;137:45–59.
- Douglas J, Dupont T. Interior penalty procedures for elliptic and parabolic Galerkin methods. Lect Note Phys. 2008;58:207–216.
- Wheeler MF. An elliptic collocation-finite element method with interior penalties. SIAM J Numer Anal. 1978;15:152–161.
- Arnold DN, Brezzi F, Cockburn B, et al. Unified analysis of discontinuous Galerkin Methods for elliptic problems. SIAM J Numer Anal. 2002;39:1749–1779.
- Buffa A, Monk P. Error estimates for the ultra weak variational formulation of the helmholtz equation. Math Mod Numer Anal. 2008;42:925–940.
- Feng X, Wu H. Discontinuous Galerkin methods for the helmholtz equation with large wave number. SIAM J Numer Anal. 2009;47:2872–2896.
- Gittelson CJ, Hiptmair R, Perugia I. Plane wave discontinuous Galerkin methods. Research Report No. 2008–04. Seminar für Angewandte Mathematik Eidgenössische Technische Hochschule CH-8092 Zürich, Switzerland. 2008.
- Melenk JM, Parsania A, Sauter S. General DG-methods for highly indefinite Helmholtz problems. J Sci Comput. 2013;57:536–581.
- Nédélec JC. Acoustic and electromagnetic equations. New York (NY): Springer; 2001.
- Hsiao G, Wendland W. Boundary integral equations. Berlin: Springer; 2008.
- Kirsch A. An introduction to the mathematical theory of inverse problems. Berlin: Springer; 2011.
- Kress R. Linear integral equations. New York (NY): Springer-Verlag; 2014.
- Chandler-Wilde SN, Monk P. Wave-number-explicit bounds in time-harmonic scattering. SIAM J Math Anal. 2008;39:1428–1455.
- Ernst OG. A finite-element capacitance matrix method for exterior Helmholtz problems. Numer Math. 1996;75:175–204.
- Koyama D. Study on the wave equation with an artificial boundary condition. Report CS 00-01, 2000.
- Wood A. Analysis of electromagnetic scattering from an overfilled cavity in the ground plane. J Comput Phys. 2006;215:630–641.
- Shen J, Wang L. Analysis of a spectral-Galerkin approximation to the Helmholtz equation in exterior domains. SIAM J Numer Anal. 2007;45:1954–1978.
- Sobotikova V. Error analysis of a DG method employing ideal eLements applied to a nonlinear convection-diffusion problem. J Numer Math. 2011;19:137–163.