J. Carrier, L. Greengard, and V. Rokhlin, A Fast Adaptive Multipole Algorithm for Particle Simulations, SIAM Journal on Scientific and Statistical Computing, vol.9, issue.4, pp.669-686, 1988.
DOI : 10.1137/0909044

URL : http://math.nyu.edu/faculty/greengar/cgr_88.pdf

J. Nédélec, Acoustic and Electromagnetic Equations: Integral Representations for Harmonic Problems, Applied Mathematical Sciences, 2001.

B. Faermann, Local a-posteriori error indicators for the Galerkin discretization of boundary integral equations, Numerische Mathematik, vol.79, issue.1, pp.43-76, 1998.
DOI : 10.1007/s002110050331

B. Faermann, Localization of the Aronszajn-Slobodeckij norm and application to adaptive boundary elements methods. Part I. The two-dimensional case, IMA Journal of Numerical Analysis, vol.20, issue.2, pp.203-234, 2000.
DOI : 10.1093/imanum/20.2.203

B. Faermann, Localization of the Aronszajn?Slobodeckij norm and application to adaptive boundary element methods. Part II. The three-dimensional case, Numer. Anal, vol.92, pp.467-499, 2002.

M. Maischak, P. Mund, and E. P. Stephan, Adaptive multilevel BEM for acoustic scattering, Computer Methods in Applied Mechanics and Engineering, vol.150, issue.1-4, pp.351-367, 1997.
DOI : 10.1016/S0045-7825(97)00081-9

J. T. Chen, K. H. Chen, and C. T. Chen, Adaptive boundary element method of time-harmonic exterior acoustics in two dimensions, Computer Methods in Applied Mechanics and Engineering, vol.191, issue.31, pp.191-3331, 2002.
DOI : 10.1016/S0045-7825(02)00214-1

R. H. Nochetto and B. Stamm, A posteriori error estimates for the electric field integral equation on polyhedra, 2012. ArXiv e-prints arXiv, pp.1204-3930

C. Carstensen, An a posteriori error estimate for a first-kind integral equation, Mathematics of Computation, vol.66, issue.217, pp.139-155, 1997.
DOI : 10.1090/S0025-5718-97-00790-4

URL : http://www.ams.org/mcom/1997-66-217/S0025-5718-97-00790-4/S0025-5718-97-00790-4.pdf

C. Carstensen, M. Maischak, D. Praetorius, and E. P. Stephan, Residual-based a posteriori error estimate for hypersingular equation on surfaces, Numerische Mathematik, vol.97, issue.3, pp.397-425, 2004.
DOI : 10.1007/s00211-003-0506-5

C. Carstensen and D. Praetorius, Averaging Techniques for the Effective Numerical Solution of Symm's Integral Equation of the First Kind, SIAM Journal on Scientific Computing, vol.27, issue.4, pp.1226-1260, 2006.
DOI : 10.1137/040609033

C. Carstensen and D. Praetorius, Averaging Techniques for a Posteriori Error Control in Finite Element and Boundary Element Analysis, Boundary Element Analysis, pp.29-59, 2007.
DOI : 10.1007/978-3-540-47533-0_2

M. Feischl, T. F. Führer, N. Heuer, M. Karkulik, and D. Praetorius, Adaptive Boundary Element Methods, Archives of Computational Methods in Engineering, vol.24, issue.2, pp.2014-309
DOI : 10.1002/nme.1620240206

URL : http://arxiv.org/pdf/1402.0744

M. Feischl, M. Karkulik, J. M. Melenk, and D. Praetorius, Quasi-optimal Convergence Rate for an Adaptive Boundary Element Method, SIAM Journal on Numerical Analysis, vol.51, issue.2, pp.1327-1348, 2013.
DOI : 10.1137/110842569

C. Carstensen, M. Feischl, M. Page, and D. Praetorius, Axioms of adaptivity, Computers & Mathematics with Applications, vol.67, issue.6, pp.1195-1253, 2014.
DOI : 10.1016/j.camwa.2013.12.003

W. Mclean, Strongly Elliptic Systems and Boundary Integral Equations, 2000.

A. Bespalov, A. Haberl, and D. Praetorius, Adaptive FEM with coarse initial mesh guarantees optimal convergence rates for compactly perturbed elliptic problems, Computer Methods in Applied Mechanics and Engineering, vol.317, pp.317-318, 2017.
DOI : 10.1016/j.cma.2016.12.014

URL : http://arxiv.org/pdf/1606.08319

M. Feischl, T. Führer, and D. Praetorius, Adaptive FEM with Optimal Convergence Rates for a Certain Class of Nonsymmetric and Possibly Nonlinear Problems, SIAM Journal on Numerical Analysis, vol.52, issue.2, pp.601-625, 2014.
DOI : 10.1137/120897225

X. Antoine and M. Darbas, Generalized combined field integral equations for the iterative solution of the three-dimensional Helmholtz equation, ESAIM: Mathematical Modelling and Numerical Analysis, vol.26, issue.1, pp.147-167, 2007.
DOI : 10.1007/BF00384672

URL : https://hal.archives-ouvertes.fr/hal-00141047

D. Levadoux, F. Millot, and S. Pernet, A well-conditioned boundary integral equation for transmission problems of electromagnetism, Journal of Integral Equations and Applications, vol.27, issue.3, pp.431-454, 2015.
DOI : 10.1216/JIE-2015-27-3-431

I. H. Sloan and A. Spence, The Galerkin Method for Integral Equations of the First Kind with Logarithmic Kernel: Theory, IMA Journal of Numerical Analysis, vol.8, issue.1, pp.105-122, 1988.
DOI : 10.1093/imanum/8.1.105

M. Lecouvez, F. Collino, P. Joly, and B. Stupfel, Quasi-local transmission conditions for non-overlapping domain decomposition methods for the Helmholtz equation, Comptes Rendus Physique, vol.15, issue.5, pp.403-414, 2014.
DOI : 10.1016/j.crhy.2014.04.005

URL : https://hal.archives-ouvertes.fr/hal-01116028

S. Marburg and B. Nolte, Computational Acoustics of Noise Propagation in Fluids ? Finite and Boundary Element Method, 2008.
DOI : 10.1007/978-3-540-77448-8

P. G. Ciarlet, Finite Element Method for Elliptic Problems, Society for Industrial and Applied Mathematics, 2002.

P. Grisvard, Singularities in Boundary Value Problems, Recherches en Mathématiques Appliquées, 1992.

J. Jou and J. Liu, A posteriori boundary element error estimation, Journal of Computational and Applied Mathematics, vol.106, issue.1, pp.1-19, 1999.
DOI : 10.1016/S0377-0427(99)00049-7

URL : https://doi.org/10.1016/s0377-0427(99)00049-7