Stable reformulation of transfer matrix method for wave propagation in layered anisotropic media.

The numerical instability problem in the standard transfer matrix method has been resolved by introducing the layer stiffness matrix and using an efficient recursive algorithm to calculate the global stiffness matrix for an arbitrary anisotropic layered structure. For general anisotropy the computational algorithm is formulated in matrix form. In the plane of symmetry of an orthotropic layer the layer stiffness matrix is represented analytically. It is shown that the elements of the stiffness matrix are as simple as those of the transfer matrix and only six of them are independent. Reflection and transmission coefficients for layered media bounded by liquid or solid semi-spaces are formulated as functions of the total stiffness matrix elements. It has been demonstrated that this algorithm is unconditionally stable and more efficient than the standard transfer matrix method. The stiffness matrix formulation is convenient in satisfying boundary conditions for different layered media cases and in obtaining modal solutions. Based on this method characteristic equations for Lamb and surface waves in multilayered orthotropic media have been obtained. Due to the stability of the stiffness matrix method, the solutions of the characteristic equations are numerically stable and efficient. Numerical examples are given.

[1]  M.J.S. Lowe,et al.  Matrix techniques for modeling ultrasonic waves in multilayered media , 1995, IEEE Transactions on Ultrasonics, Ferroelectrics and Frequency Control.

[2]  G. J. Tango,et al.  Efficient global matrix approach to the computation of synthetic seismograms , 1986 .

[3]  Michel Castaings,et al.  Transfer matrix of multilayered absorbing and anisotropic media. Measurements and simulations of ultrasonic wave propagation through composite materials , 1993 .

[4]  S. Rokhlin,et al.  Equivalent boundary conditions for thin orthotropic layer between two solids: reflection, refraction, and interface waves. , 1992, The Journal of the Acoustical Society of America.

[5]  Time Resolved Line Focus Acoustic Microscopy of Composites , 1999 .

[6]  E.L. Adler,et al.  Matrix methods applied to acoustic waves in multilayers , 1990, IEEE Transactions on Ultrasonics, Ferroelectrics and Frequency Control.

[7]  L. Frazer,et al.  Seismic waves in stratified anisotropic media. II: Elastodynamic eigensolutions for some anisotropic systems , 1987 .

[8]  Ajit K. Mal,et al.  WAVE PROPAGATION IN LAYERED COMPOSITE LAMINATES UNDER PERIODIC SURFACE LOADS , 1988 .

[9]  L. Neil Frazer,et al.  Seismic waves in stratified anisotropic media , 1984 .

[10]  R. Rajapakse,et al.  An Exact Stiffness Method for Elastodynamics of a Layered Orthotropic Half-Plane , 1994 .

[11]  Jean-François de Belleval,et al.  Acoustic propagation in anisotropic periodically multilayered media: A method to solve numerical instabilities , 1993 .

[12]  J. Nation,et al.  Ionization Instability in Atmospheric‐Pressure Gas Discharges , 1972 .

[13]  B. Kennett,et al.  Seismic waves in a stratified half space. , 1979 .

[14]  Michel Castaings,et al.  Delta operator technique to improve the Thomson–Haskell‐method stability for propagation in multilayered anisotropic absorbing plates , 1994 .

[15]  S. Rokhlin,et al.  Ultrasonic wave interaction with a thin anisotropic layer between two anisotropic solids: Exact and asymptotic‐boundary‐condition methods , 1992 .

[16]  Henrik Schmidt,et al.  A full wave solution for propagation in multilayered viscoelastic media with application to Gaussian beam reflection at fluid–solid interfaces , 1985 .

[17]  A. Nayfeh The general problem of elastic wave propagation in multilayered anisotropic media , 1991 .

[18]  S. Rokhlin,et al.  Reflection and refraction of elastic waves on a plane interface between two generally anisotropic media , 1985 .

[19]  L. Knopoff A matrix method for elastic wave problems , 1964 .

[20]  Dale E. Chimenti,et al.  Ultrasonic Wave Reflection From Liquid-Coupled Orthotropic Plates With Application to Fibrous Composites , 1988 .

[21]  B. Kennett,et al.  Seismic Wave Propagation in Stratified Media , 1983 .

[22]  E. Kausel,et al.  Stiffness matrices for layered soils , 1981 .

[23]  S. Rokhlin,et al.  Ultrasonic wave interaction with a thin anisotropic layer between two anisotropic solids. II. Second‐order asymptotic boundary conditions , 1993 .