D. Mead, A general theory of harmonic wave propagation in linear periodic systems with multiple coupling, Journal of Sound and Vibration, vol.27, pp.235-260, 1973.

D. Duhamel, B. R. Mace, and M. J. Brennan, Finite element analysis of the vibrations of waveguides and periodic structures, Journal of Sound and Vibration, vol.294, pp.205-220, 2006.

Y. Waki, B. Mace, and M. Brennan, Free and forced vibrations of a tyre using a wave finite element approach, Journal of Sound and Vibration, vol.323, pp.737-756, 2009.

W. Zhou and M. Ichchou, Wave propagation in mechanical waveguide with curved members using wave finite element solution, Computer Methods in Applied Mechanics and Engineering, vol.199, pp.2099-2109, 2010.

M. Ichchou, J. Mencik, and W. Zhou, Wave finite elements for low and mid-frequency description of coupled structures with damage, Computer Methods in Applied Mechanics and Engineering, vol.198, pp.1311-1326, 2009.

B. Lossouarn, M. Aucejo, and J. Deu, Electromechanical wave finite element method for interconnected piezoelectric waveguides, Computers & Structures, vol.199, pp.46-56, 2018.
URL : https://hal.archives-ouvertes.fr/hal-01739213

A. Kessentini, M. Taktak, M. B. Souf, O. Bareille, M. Ichchou et al., Computation of the scattering matrix of guided acoustical propagation by the wave finite element approach, Applied Acoustics, vol.108, pp.92-100, 2016.

J. Mencik, A wave finite element approach for the analysis of periodic structures with cyclic symmetry in dynamic substructuring, Journal of Sound and Vibration, vol.431, pp.441-457, 2018.
URL : https://hal.archives-ouvertes.fr/hal-01992190

T. Gras, M. Hamdi, M. B. Tahar, O. Tanneau, and L. Beaubatie, On a coupling between the finite element (fe) and the wave finite element (wfe) method to study the effect of a local heterogeneity within a railway track, Journal of Sound and Vibration, vol.429, pp.45-62, 2018.

J. Mencik and D. Duhamel, A wave finite element-based approach for the modeling of periodic structures with local perturbations, Finite Elements in Analysis and Design, vol.121, pp.40-51, 2016.

J. M. Mencik and D. Duhamel, A wave-based model reduction technique for the description of the dynamic behavior of periodic structures involving arbitrary-shaped substructures and large-sized finite element models, Finite Elements in Analysis and Design, vol.101, pp.1-14, 2015.

T. Hoang, D. Duhamel, and G. Foret, Wave finite element method for vibration of periodic structures subjected to external loads, 6th European Conference on Computational Mechanics (ECCM 6), 2018.
URL : https://hal.archives-ouvertes.fr/hal-02142446

A. Bottcher and S. M. Grudsky, Toeplitz Matrices -Asymptotic Linear Algebra and Functional Analysis, 2000.

W. F. Trench, Inversion of Toeplitz band matrices, Mathematics of Computation, vol.28, pp.1089-1095, 1974.