Wave simulation in dissipative media described by distributed-order fractional time derivatives

We develop and solve a dissipative model for the propagation and attenuation of two-dimensional dilatational waves, using a new modeling algorithm based on distributed-order fractional time derivatives. We consider two distributions. The first has n powers of the order of differentiation as the weight function, and the second is based on a generalized Dirac’s comb function. The wave equation is solved with the fractional derivative by means of a generalization of the Grünwald—Letnikov approximation. The modeling uses the Fourier method to compute the spatial derivatives, and therefore can handle complex geometries and general material-property variability. We verify the results by comparison with the two-dimensional analytical solution obtained for wave propagation in homogeneous media. Moreover, we illustrate the use of the modeling algorithm by simulating waves in the presence of an interface separating two dissimilar media.

[1]  Francesco Mainardi,et al.  The Two Forms of Fractional Relaxation of Distributed Order , 2007 .

[2]  I. Podlubny Fractional differential equations , 1998 .

[3]  Francesco Mainardi,et al.  Seismic pulse propagation with constant Q and stable probability distributions , 1997, 1008.1341.

[4]  Time-fractional Diffusion of Distributed Order , 2007, cond-mat/0701132.

[5]  A. Hanyga,et al.  Power-law attenuation in acoustic and isotropic anelastic media , 2003 .

[6]  Michele Caputo,et al.  Mean fractional-order-derivatives differential equations and filters , 1995, ANNALI DELL UNIVERSITA DI FERRARA.

[7]  M. Caputo,et al.  A new dissipation model based on memory mechanism , 1971 .

[8]  Einar Kjartansson,et al.  Constant Q-wave propagation and attenuation , 1979 .

[9]  B. Auld,et al.  Acoustic fields and waves in solids , 1973 .

[10]  M. Caputo Linear Models of Dissipation whose Q is almost Frequency Independent-II , 1967 .

[11]  F. Mainardi,et al.  Fractals and fractional calculus in continuum mechanics , 1997 .

[12]  P. Morse,et al.  Methods of theoretical physics , 1955 .

[13]  José M. Carcione,et al.  Theory and modeling of constant-Q P- and S-waves using fractional time derivatives , 2009 .

[14]  José M. Carcione,et al.  Wave fields in real media : wave propagation in anisotropic, anelastic, porous and electromagnetic media , 2007 .

[15]  José M. Carcione,et al.  Time-domain Modeling of Constant-Q Seismic Waves Using Fractional Derivatives , 2002 .