A. Loseille, A. Dervieux, A. , and F. , Fully anisotropic goal-oriented mesh adaptation for 3D steady Euler equations, Journal of Computational Physics, vol.229, pp.2866-2897, 2010.
DOI : 10.1016/j.jcp.2009.12.021

J. Kirz, R. , and R. , DLR TAU Simulations for the Second AIAA Sonic Boom Prediction Workshop, Journal of Aircraft
DOI : 10.2514/6.2017-3253

A. A. Elmiligui, M. Carter, S. E. Cliff, S. N. Nayani, and J. M. Pearl, USM3D Simulations for 2nd Sonic Boom Workshop, Journal of Aircraft
DOI : 10.2514/6.2017-3254

G. Anderson, M. J. Aftosmis, and M. Nemec, Cart3D Simulations for the Second AIAA Sonic Boom Prediction Workshop, Journal of Aircraft
DOI : 10.2514/6.2017-3255

D. Howe, Improved Sonic Boom Minimization with Extendable Nose Spike, 43rd AIAA Aerospace Sciences Meeting and Exhibit, 2005.
DOI : 10.2514/6.2005-1014

M. A. Park and M. Nemec, Near Field Summary and Statistical Analysis of the Second AIAA Sonic Boom Prediction Workshop, Journal of Aircraft

S. K. Rallabhandi and A. Loubeau, Propagation Summary of the Second AIAA Sonic Boom Prediction Workshop, Journal of Aircraft

M. A. Park, R. L. Campbell, A. A. Elmiligui, S. E. Cliff, and S. Nayani, Specialized CFD Grid Generation Methods for Near-Field Sonic Boom Prediction, 52nd Aerospace Sciences Meeting, 2014.
DOI : 10.2514/6.2014-0115
URL : http://hdl.handle.net/2060/20140007302

M. Wintzer, I. Ordaz, and J. W. Fenbert, Under-Track CFD-Based Shape Optimization for a Low-Boom Demonstrator Concept, 33rd AIAA Applied Aerodynamics Conference, 2015.

A. Loseille, A. Dervieux, A. , and F. , Anisotropic Norm-Oriented Mesh Adaptation for Compressible Flows, 53rd AIAA Aerospace Sciences Meeting, 2015.
DOI : 10.2514/6.2015-2037
URL : https://hal.archives-ouvertes.fr/hal-01256131

J. M. Derlaga and M. A. Park, Application of Exact Error Transport Equations and Adjoint Error Estimation to AIAA Workshops, 55th AIAA Aerospace Sciences Meeting, 2017.

P. Spalart, A. , and S. , A one-equation turbulence model for aerodynamic flows, 30th Aerospace Sciences Meeting and Exhibit, 1992.

L. Eca, M. Hoekstra, A. Hay, and D. Pelletier, Verification of RANS Solvers with Manufactured Solutions, Engineering with Computers, vol.23, issue.4

S. Catris, A. , and B. , Density corrections for turbulence models, Aerospace Science and Technology, vol.4, pp.1-11, 2000.
DOI : 10.1016/s1270-9638(00)00112-7

P. Batten, N. Clarke, C. Lambert, C. , and D. M. , On the choice of wavespeeds for the HLLC Riemann solver, SIAM Journal on Scientific Computing, vol.18, issue.6, pp.1553-1570, 1997.

B. V. Leer, Towards the ultimate conservative difference scheme I. The quest of monotonicity, Lecture notes in physics, vol.18, pp.163-168, 1973.

P. Cournède, B. Koobus, and A. Dervieux, Positivity statements for a Mixed-Element-Volume scheme on fixed and moving grids, European Journal of Computational Mechanics, vol.15, issue.7, pp.767-798, 2006.

A. Harten, High Resolution Schemes for Hyperbolic Conservation Laws, Journal of Computational Physics, vol.49, pp.357-393, 1983.

M. Park and J. Carlson, Turbulent Output-Based Anisotropic Adaptation, 48th AIAA Aerospace Sciences Meeting Including the New Horizons Forum and Aerospace Exposition, 2010.

A. Loseille and R. Lohner, Anisotropic Adaptive Simulations in Aerodynamics, 48th AIAA Aerospace Sciences Meeting Including the New Horizons Forum and Aerospace Exposition, 2010.
URL : https://hal.archives-ouvertes.fr/hal-00935369

T. Coupez, Génération de maillages et adaptation de maillage par optimisation locale, Revue Européenne des Éléments Finis, vol.9, pp.403-423, 2000.

X. L. Li, M. S. Shephard, and M. W. Beall, 3D anisotropic mesh adaptation by mesh modification, Computer Methods in Applied Mechanics and Engineering, vol.194, pp.4915-4950, 2005.

C. Dobrzynski and P. J. Frey, Anisotropic Delaunay Mesh Adaptation for Unsteady Simulations, Proc. of 17th Int. Meshing Rountable, pp.177-194, 2008.
URL : https://hal.archives-ouvertes.fr/hal-00353786

T. Michal, K. , and J. , Anisotropic mesh Adaptation through edge primitive operations, AIAA Paper, pp.2011-0159

A. Loseille and V. Menier, Serial and Parallel Mesh Modification Through a Unique Cavity-Based Primitive, Proceedings of the 22th International Meshing Roundtable, pp.541-558, 2013.
URL : https://hal.archives-ouvertes.fr/hal-00935356

A. Bowyer, Computing Dirichlet tessellations, The Computer Journal, vol.24, issue.2, pp.162-166, 1981.

D. Watson, Computing the n-dimensional Delaunay tessellation with application to Voronoi polytopes, The Computer Journal, vol.24, issue.2, pp.167-172, 1981.

F. Hermeline, Triangulation automatique d'un polyèdre en dimension N, RAIRO-Analyse numérique, vol.16, issue.3, pp.211-242, 1982.

A. Loseille, Metric-orthogonal anisotropic mesh generation, Proceedings of the 23th International Meshing Roundtable, Procedia Engineering, vol.82, pp.403-415, 2014.
URL : https://hal.archives-ouvertes.fr/hal-01113345

F. Alauzet, L. , and A. , High Order Sonic Boom Modeling by Adaptive Methods, Journal of Computational Physics, vol.229, pp.561-593, 2010.
URL : https://hal.archives-ouvertes.fr/inria-00363206

M. J. Castro-díaz, F. Hecht, B. Mohammadi, and O. Pironneau, Anisotropic Unstructured Mesh Adaptation for Flow Simulations, International Journal for Numerical Methods in Fluids, vol.25, pp.475-491, 1997.

J. Dompierre, M. G. Vallet, M. Fortin, Y. Bourgault, W. Habashi et al., Anisotropic mesh adaptation-Towards a solver and user independent CFD, 35th Aerospace Sciences Meeting and Exhibit, 1997.

Y. Vasilevski and K. Lipnikov, Error bounds for controllable adaptive algorithms based on a hessian recovery, Computational Mathematics and Mathematical Physics, vol.45, issue.8, pp.1374-1384, 2005.

W. Huang, Metric tensors for anisotropic mesh generation, Journal of Computational Physics, vol.204, pp.633-665, 2005.

P. J. Frey, A. , and F. , Anisotropic mesh adaptation for CFD computations, Computer Methods in Applied Mechanics and Engineering, vol.194, pp.5068-5082, 2005.

L. Chen, P. Sun, and J. Xu, Optimal anisotropic meshes for minimizing interpolation errors in L p-norm, Mathematics of Computation, vol.76, issue.257, pp.179-204, 2007.

A. Loseille, A. , and F. , Continuous mesh framework. Part II: validations and applications, SIAM J. Numer. Anal, vol.49, issue.1, pp.61-86, 2011.

A. Loseille, A. Dervieux, P. Frey, A. , and F. , Achievement of Global Second Order Mesh Convergence for Discontinuous Flows with Adapted Unstructured Meshes, 18th AIAA Computational Fluid Dynamics Conference, 2007.

M. Giles and E. Suli, Adjoint methods for PDEs: a posteriori error analysis and postprocessing by duality, Acta Numerica, pp.145-236, 2002.

W. Jones, E. Nielsen, P. , and M. , Validation of 3D Adjoint Based Error Estimation and Mesh Adaptation for Sonic Boom Prediction, 44th AIAA Aerospace Sciences Meeting and Exhibit, 2006.

D. A. Venditti and D. L. Darmofal, Grid adaptation for functional outputs: application to two-dimensional inviscid flows, Journal of Computational Physics, vol.176, issue.1, pp.40-69, 2002.

P. Power, C. Pain, M. Piggott, F. Fang, G. Gorman et al., Adjoint a posteriori error measures for anisotropic mesh optimization, Computers & Mathematics with Applications, vol.52, pp.1213-1242, 2006.

A. Loseille, Adaptation de maillage 3D anisotrope multi-échelles et ciblé à une fonctionnelle. Application à la prédiction haute-fidélité du bang sonique, p.35, 2008.

A. Belme, A. Dervieux, A. , and F. , Time accurate anisotropic goal-oriented mesh adaptation for unsteady flows, Journal of Computational Physics, vol.231, pp.6323-6348, 2012.
URL : https://hal.archives-ouvertes.fr/hal-00940095

M. B. Giles, On adjoint equations for error analysis and optimal grid adaptation in CFD, 1997.

M. Giles, P. , and N. , Improved lift and drag estimates using adjoint Euler equations, 14th Computational Fluid Dynamics Conference, 1999.