论文信息 - A pseudodifferential equation with damping for one-way wave propagation in inhomogeneous acoustic media

A pseudodifferential equation with damping for one-way wave propagation in inhomogeneous acoustic media

A one-way wave equation is an evolution equation in one of the space directions that describes (approximately) a wave field. The exact wave field is approximated in a high frequency, microlocal sense. Here we derive the pseudodifferential one-way wave equation for an inhomogeneous acoustic medium using a known factorization argument. We give explicitly the two highest order terms, that are necessary for approximating the solution. A wave front (singularity) whose propagation velocity has non-zero component in the special direction is correctly described. The equation cannot describe singularities propagating along turning rays, i.e. rays along which the velocity component in the special direction changes sign. We show that incorrectly propagated singularities are suppressed if a suitable dissipative term is added to the equation.

Christiaan C. Stolk

[1] L. Hörmander. Fourier integral operators. I , 1995 .

[2] Ru-Shan Wu,et al. Generalization of the phase-screen approximation for the scattering of acoustic waves , 2000 .

[3] L. Hörmander,et al. Fourier integral operators. II , 1972 .

[4] M. Czubak,et al. PSEUDODIFFERENTIAL OPERATORS , 2020, Introduction to Partial Differential Equations.

[5] L. Hörmander. The analysis of linear partial differential operators , 1990 .

[6] L. Trefethen,et al. Wide-angle one-way wave equations. , 1988, The Journal of the Acoustical Society of America.

[7] J. F. Clearbout. Imaging the Earth's interior. , 1985 .

[8] Michael Taylor,et al. Reflection of singularities of solutions to systems of differential equations , 1975 .

[9] Christiaan C. Stolk. Parametrix for a hyperbolic initial value problem with dissipation in some region , 2003 .