D. Givoli, High-order local non-reflecting boundary conditions: a review, Wave Motion, vol.39, pp.319-326, 2004.

O. V. Atassi and J. M. Galan, Implementation of nonreflecting boundary conditions for the nonlinear euler equations, Journal of Computational Physics, vol.227, pp.1643-1662, 2008.

T. Hagstrom, E. Bécache, D. Givoli, and K. Stein, Complete radiation boundary conditions for convective waves, Communications in Computational Physics, vol.11, pp.610-628, 2012.
URL : https://hal.archives-ouvertes.fr/hal-00969307

D. Soares, Acoustic modelling by BEM-FEM coupling procedures taking into account explicit and implicit multidomain decomposition techniques, International Journal for Numerical Methods in Engineering, vol.78, pp.1076-1093, 2009.

R. J. Astley, Numerical methods for noise propagation in moving flows, with application to turbofan engines, Acoustical Science and Technology, vol.30, pp.227-239, 2009.

J. P. Bérenger, A perfectly matched layer for absorption of electromagnetic waves, Journal of Computational Physics, vol.114, pp.185-200, 1994.

I. Harari, M. Slavutin, and E. Turkel, Analytical and numerical studies of a finite element PML for the Helmholtz equation, Journal of Computational Acoustics, vol.8, pp.121-137, 2000.

E. Bécache, A. Dhia, and G. Legendre, Perfectly matched layers for the convected Helmholtz equation, SIAM Journal on Numerical Analysis, vol.42, issue.1, pp.409-433, 2004.

J. S. Hesthaven, On the analysis and construction of perfectly matched layers for the linearized euler equations, Journal of Computational Physics, vol.142, pp.129-147, 1998.

C. K. Tam, L. Auriault, and F. Cambuli, Perfectly matched layers as an absorbing boundary condition for the linearized euler equations in open and ducted domains, Journal of Computational Physics, vol.144, pp.213-243, 1998.

S. Abarbanel, D. Gottlieb, and J. Hesthaven, Well-posed perfectly matched layers for advective acoustics, Journal of Computational Physics, vol.145, issue.2, pp.266-283, 1999.

F. Q. Hu, A stable perfectly matched layer for linearized euler equations in unsplit physical variables, Journal of Computational Physics, vol.173, pp.455-480, 2001.

F. Q. Hu, Development of PML absorbing boundary conditions for computational aeroacoustics: a progress review, Computers & Fluids, vol.37, pp.336-348, 2008.

S. Parrish and F. Q. Hu, PML absorbing boundary conditions for the linearized and nonlinear euler equations in the case of oblique mean flow, Journal of Computational Physics, vol.60, pp.565-589, 2009.

Y. Özyörük, Numerical prediction of aft radiation of turbofan tones through exhaust jets, Journal of Sound and Vibration, vol.325, pp.122-144, 2009.

J. Diaz and P. Joly, A time domain analysis of PML models in acoustics, Computer Methods in Applied Mechanics and Engineering, vol.195, pp.3820-3853, 2006.
URL : https://hal.archives-ouvertes.fr/inria-00410313

E. Bécache, A. Dhia, and G. Legendre, Perfectly matched layers for the time-harmonic acoustics in the presence of uniform flow, SIAM Journal on Numerical Analysis, vol.44, issue.3, pp.1191-1217, 2006.

F. Treysséde, G. Gabard, and M. B. Tahar, A mixed finite element method for acoustic wave propagation in moving fluids based on an Eulerian-Lagrangian description, Journal of the Acoustical Society of America, vol.113, pp.705-716, 2003.

F. Treyssède and M. B. Tahar, Validation of a finite element method for sound propagation and vibro-acoustic problems with swirling flows, Acta Acustica united with Acustica, vol.90, pp.731-745, 2004.

G. Gabard, F. Treysséde, and M. B. Tahar, A numerical method for vibro-acoustic problems with sheared mean flows, Journal of Sound and Vibration, vol.272, pp.991-1011, 2004.
URL : https://hal.archives-ouvertes.fr/hal-01064463

G. Gabard, R. J. Astley, and M. B. Tahar, Stability and accuracy of finite element methods for flow acoustics. II: two-dimensional effects, International Journal for Numerical Methods in Engineering, vol.63, pp.947-973, 2005.

X. Feng, M. B. Tahar, and R. Baccouche, Pml absorbing boundary conditions for the aeroacoustic Galbrun equation in the time domain, Journal of the Acoustical Society of America, vol.139, issue.1, pp.320-321, 2016.

O. A. Godin, Reciprocity and energy theorems for waves in a compressible inhomogeneous moving fluid, Wave Motion, vol.25, pp.143-167, 1996.

F. Treysséde and M. B. Tahar, Jump conditions for unsteady small perturbations at fluid-solid interfaces in the presence of initial flow and prestress, Wave Motion, vol.46, issue.2, pp.155-167, 2009.

H. Beriot, Eléments finis d'ordreélevé pour l'opérateur de Galbrun en régime harmonique, 2008.

D. C. Pridmore-brown, Sound propagation in a fluid flowing through an attenuating duct, Journal of Fluid Mechanics, vol.4, pp.393-406, 1958.

F. Treyssede and M. B. Tahar, Comparison of a finite element model with a multiple-scales solution for sound propagation in varying ducts with swirling flows, Journal of the Acoustical Society of America, vol.115, pp.2716-2730, 2004.

J. Cooper and N. Peake, Propagation of unsteady disturbances in a slowly varying duct with mean swirling flow, Journal of Fluid Mechanics, vol.445, pp.207-234, 2001.

F. Collino and P. Monk, Optimizing the perfectly matched layer, Computer Methods in Applied Mechanics and Engineering, vol.164, pp.157-171, 1998.

A. Bermudez, L. M. Hervella-nieto, A. Prieto, and R. Rodriguez, An optimal perfectly matched layer with unbounded function for time-harmonic acoustic scattering problems, Journal of Computational Physics, vol.223, pp.469-488, 2007.

A. Modave, E. Delhez, and C. Geuzaine, Optimizing perfectly matched layers in discrete contexts, International Journal for Numerical Methods in Engineering, vol.99, issue.6, pp.410-437, 2014.
URL : https://hal.archives-ouvertes.fr/hal-01386393

D. G. Rabinovich and E. Bécache, Comparison of high-order absorbing boundary conditions and perfectly matched layers in the frequency domain, International Journal for Numerical Methods in Engineering, vol.26, pp.1351-1369, 2010.
URL : https://hal.archives-ouvertes.fr/hal-00974876