References
- Etter PC. Underwater acoustic modeling and simulation. 4th ed. Hoboken: CRC Press; 2013.
- Costa EGA, Godinho LMC, Santiago JAF, et al. Application of the method of fundamental solutions to predict the acoustic performance of T-shaped thin barriers. Eng Anal Boundary Elem. 2019;99:142–156. doi: 10.1016/j.enganabound.2018.11.009
- Grilli S, Pedersen T, Stepanishen P. A hybrid boundary element method for shallow water acoustic propagation over an irregular bottom. Eng Anal Boundary Elem. 1998;21:67–77.
- Godinho L, Tadeu A, Branco F. 3D acoustic scattering from an irregular fluid waveguide via the BEM. Eng Anal Boundary Elem. 2001;25:443–453. doi: 10.1016/S0955-7997(01)00042-X
- Santiago JAF, Wrobel LC. Modified Green's functions for shallow water acoustics wave propagation. Eng Anal Boundary Elem. 2004;28:1375–1385. doi: 10.1016/j.enganabound.2004.04.004
- Tadeu A, Santos PFA, Kausel E. Closed-form integration of singular terms for constant, linear and quadratic boundary elements – part I: SH wave propagation. Eng Anal Boundary Elem. 1999;23:123–130. doi: 10.1016/S0955-7997(98)00075-7
- Tadeu A, Santos PFA, Kausel E. Closed-form integration of singular terms for constant, linear and quadratic boundary elements – part II: SV-P wave propagation. Eng Anal Boundary Elem. 1999;23:207–213.
- Pekeris CL. Theory of propagation of explosive sound in shallow water. Geol. Soc. Am. Mem. 1948;27:1–117.
- Hardin RH. Applications of the split-step Fourier method to the numerical solution of nonlinear and variable coefficient wave equations. SIAM. 1973;24:484–494.
- Schmidt H, Tango G. Efficient global matrix approach to the computation of synthetic seismograms. Geophys J R Astron Soc. 1986;86:441–467.
- Tadeu A. Three-dimensional wave scattering by rigid circular pipelines submerged in an acoustic waveguide. J Comput Model Eng Sci. 2000;1:38–45.
- Jensen FB, Kuperman WA, Porter MB, et al. Computational ocean acoustics. New York (NY), USA: Springer; 2011.
- Wang Y, Tu H, Liu W, et al. Application of a Chebyshev collocation method to solve a parabolic equation model of underwater acoustic propagation. Acoust Aust. 2021;49:281–291. doi: 10.1007/s40857-021-00218-5
- Tappert FT. The parabolic equation approximation method in wave propagation and underwater acoustics. Vol. 70. New York (NY), USA: Springer; 1977.
- Desanto JA. Relation between the solutions of the Helmholtz and parabolic equations for sound propagation. J Acoust Soc Am. 1977;62:295–297. doi: 10.1121/1.381527
- Estes LE, Fain G. Numerical technique for computing the wide-angle acoustic field in an ocean with rang-dependent velocity profiles. J Acoust Soc Am. 1977;62:38–43. doi: 10.1121/1.381502
- McDaniel ST, Lee D. A finite-difference treatment of interface conditions for the parabolic wave equation: the horizontal interface. J Acoust Soc Am. 1982;71:855–858. doi: 10.1121/1.387611
- Pekeris CL. Theory of propagation of explosive sound in shallow water. Geol Soc Am Mem. 1948;27:1–117.
- Liu W, Wang Y, Zhang L. Numerical ocean acoustics. Beijing, China: Science Press; 2019.
- Ghaffar F, Badshah N, Islam S. Multigrid method for solution of 3D Helmholtz equation based on HOC schemes. Abstr Appl Anal. 2014;2014(SI51):1–14. doi: 10.1155/2014/954658
- Baleanu D, Aydogn SM, Mohammadi H, et al. On modelling of epidemic childhood diseases with the Caputo-Fabrizio derivative by using the Laplace Adomian decomposition method. Alexandria Eng J. 2020;59(5):3029–3039. doi: 10.1016/j.aej.2020.05.007
- Khan H, Alam K, Gulzar H, et al. A case study of fractal-Fractional tuberculosis model in China: existence and stability theories along with numerical simulations. Math Comput Simulat. 2022;198:455–473. doi: 10.1016/j.matcom.2022.03.009
- Baleanu D, Etemad S, Mohammadi H, et al. A novel modeling of boundary value problems on the glucose graph. Commun Nonlinear Sci Numer Simulat. 2021;100:105844. doi: 10.1016/j.cnsns.2021.105844
- Baleanu D, Jajarmi A, Mohammadi H, et al. A new study on the mathematical modelling of human liver with Caputo–Fabrizio fractional derivative. Chaos Solitons Fractals. 2020;134:109705. doi: 10.1016/j.chaos.2020.109705
- Tuan NH, Mohammadi H, Rezapour S. A mathematical model for COVID-19 transmission by using the Caputo fractional derivative. Chaos Solitons Fractals. 2020;140:110107. doi: 10.1016/j.chaos.2020.110107
- Baleanu D, Mohammadi H, Rezapour S. The existence of solutions for a nonlinear mixed problem of singular fractional differential equations. Adv Differ Equ. 2013;2013:359. doi: 10.1186/1687-1847-2013-359
- Ali I, Khan SU. A dynamic competition analysis of stochastic fractional differential equation arising in finance via pseudospectral method. Mathematics. 2023;11:1328. doi: 10.3390/math11061328
- Ali I, Saleem MT. Spatiotemporal dynamics of reaction–Diffusion system and its application to turing pattern formation in a gray–Scott model. Mathematics. 2023;11:1459. doi: 10.3390/math11061459
- Khan SU, Ali M, Ali I. A spectral collocation method for stochastic Volterra integro-differential equations and its error analysis. Adv Differ Equ. 2019;1:161. doi: 10.1186/s13662-019-2096-2
- Ma X, Wang Y, Zhu X, et al. A spectral method for two-dimensional ocean acoustic propagation. J Mar Sci Eng. 2021;9:892. doi: 10.3390/jmse9080892
- Ma X, Wang Y, Zhu X, et al. A high-efficiency spectral method for two-dimensional ocean acoustic propagation calculations. Entropy. 2021;23:1227. doi: 10.3390/e23091227
- Tu H, Wang Y, Lan Q, et al. A Chebyshev–Tau spectral method for normal modes of underwater sound propagation with a layered marine environment. J Sound Vib. 2021;492.
- Tu H, Wang Y, Lan Q, et al. Applying a Legendre collocation method based on domain decomposition to calculate underwater sound propagation in a horizontally stratified environment. J Sound Vib. 2021;511:116364.
- Tu H, Wang Y, Yang C, et al. A novel algorithm to solve for an underwater line source sound field based on coupled modes and a spectral method. J Comput Phys. 2022;468:111478.
- Tu H, Wang Y, Liu W, et al. A Chebyshev spectral method for normal mode and parabolic equation models in underwater acoustics. Math Probl Eng. 2020;2020:7461314.
- Ali A, Khan SU, Ali I, et al. On dynamics of stochastic avian influenza model with asymptomatic carrier using spectral method. Math Methods Appl Sci. 2022;45:8230–8246. doi: 10.1002/mma.v45.13
- Khan SU, Ali I. Convergence and error analysis of a spectral collocation method for solving system of nonlinear Fredholm integral equations of second kind. Comput Appl Math. 2019;38:125. doi: 10.1007/s40314-019-0897-2
- Ali I, Saleem MT. Applications of orthogonal polynomials in simulations of mass transfer diffusion equation arising in food engineering. Symmetry. 2023;15:527. doi: 10.3390/sym15020527
- Ali I, Khan SU. Asymptotic behavior of three connected stochastic delay neoclassical growth systems using spectral technique. Mathematics. 2022;10:3639. doi: 10.3390/math10193639
- Ali I, Khan SU. Threshold of stochastic SIRS epidemic model from infectious to susceptible class with saturated incidence rate using spectral method. Symmetry. 2022;14:1838. doi: 10.3390/sym14091838
- Ali I, Khan SU. Dynamics and simulations of stochastic COVID-19 epidemic model using Legendre spectral collocation method. AIMS Math. 2023;8:4220–4236. doi: 10.3934/math.2023210
- Mason JC, Handscomb DC. Chebyshev polynomials. New York, NY: CRC Press LLC; 2003.
- Gottlieb D, Hussaini MY, Orszag SA. Theory and application of spectral methods. In: Voigt RG, Gotlieb D, Hussaini MY editors. Spectral methods for partial differential equations. Philadelphia: SIAM; 1984. p. 1–55.
- Gottlieb D, Orszag SA. Numerical analysis of spectral methods: theory and applications. Philadelphia (PA), USA: SIAM; 1977.
- Canuto C, Hussaini MY, Quarteroni A, et al. Spectral methods: fundamentals in single domains. New York (NY), USA: Springer-Verlag; 2006. (Springer Series in Scientific Computation).
- Trefethen LN. Spectral methods in MATLAB. Philadelphia (PA), USA: SIAM; 2000.
- Yang M, Ma W, Ge Y. A meshless collocation method with barycentric Lagrange interpolation for solving the Helmholtz equation. Comput Model Eng Sci. 2021;126:25–54.
- Mastroianni G, Occorsio D. Optimal systems of nodes for Lagrange interpolation on bounded intervals. A survey. J Comput Appl Math. 2001;134(1–2):325–341.