References for the
Ultrasound Interface
1.
A.D. Pierce,
Acoustics and Introduction to its Physical Principles and Applications
, Acoustical society of America, 1991.
2.
A.D. Pierce, “Wave equation for sound in fluids with unsteady inhomogeneous flow,”
J. Acoust. Soc. Am.
, vol. 87, p. 2293, 1990.
3.
J.S. Hesthaven and T. Warburton,
Nodal Discontinuous Galerkin Methods: Algorithms, Analysis, and Applications
, Springer, 2008.
4.
M.K. Myers, “On the Acoustic Boundary Condition in the Presence of Flow,”
J. Sound Vibration
, vol. 73, pp. 429–434, 1980.
5.
P.G. Petropoulos, L. Zhao, and A.C. Cangellaris, “A Reflectionless Sponge Layer Absorbing Boundary Condition for the Solution of Maxwell’s Equations with High-Order Staggered Finite Difference Schemes,”
J. Comp. Phys.
, vol. 139, pp. 184–208, 1998.
6.
C.W. Tam, “Computational Aeroacoustics: Issues and Methods,”
AIAA Journal
, vol. 33, 1995.
7.
M.D. Diaz, M.A. Solovchuk, and T.W.H. Sheu, “A conservative numerical scheme for modeling nonlinear acoustic propagation in thermoviscous homogeneous media,”
J. Comp. Phys.
, vol. 363, pp. 200–230, 2018.
8.
E.F. Toro,
Riemann Solvers and Numerical Methods for Fluid Dynamics. A Practical Introduction
, 3rd Ed., Springer, 2009.