[Anderson03] | John David Anderson, Modern Compressible Flow: With Historical Perspective, McGraw-Hill, 2003. ISBN 0072424435. |
[Chang95] | Sin-Chung Chang, “The Method of Space-Time Conservation Element and Solution Element – A New Approach for Solving the Navier-Stokes and Euler Equations”, Journal of Computational Physics, Volume 119, Issue 2, July 1995, Pages 295-324. doi: 10.1006/jcph.1995.1137 |
[Chen11] | Yung-Yu Chen, A Multi-Physics Software Framework on Hybrid Parallel Computing for High-Fidelity Solutions of Conservation Laws, Ph.D. Thesis, The Ohio State University, United States, Aug. 2011. (OhioLINK) |
[Chen12] | Yung-Yu Chen, Lixiang Yang, and Sheng-Tao John Yu, “Hyperbolicity of Velocity-Stress Equations for Waves in Anisotropic Elastic Solids”, Journal of Elasticity, Volume 106, Issue 2, Feb. 2012, Page 149-164. doi: 10.1007/s10659-011-9315-8 |
[Lax73] | Peter D. Lax, “Hyperbolic Systems of Conservation Laws and the Mathematical Theory of Shock Waves”, Society for Industrial Mathematics, 1973. ISBN 0898711770. |
[Sod78] | Sod, G. A., “A Survey of Several Finite Difference Methods for Systems of Nonlinear Hyperbolic Conservation Laws”, J. Comput. Phys., 27: 1–31. |
[Mavriplis97] | D. J. Mavriplis, Unstructured grid techniques, Annual Review of Fluid Mechanics 29. (1997) |
[Warming75] | R. F. Warming, Richard M. Beam, and B. J. Hyett, “Diagonalization and Simultaneous Symmetrization of the Gas-Dynamic Matrices”, Mathematics of Computation, Volume 29, Issue 132, Oct. 1975, Page 1037-1045. http://www.jstor.org/stable/2005742 |
[Wesselling01] | Pieter Wesseling, “Principles of Computational Fluid Dynamics”. |
[Yang13] | Lixiang Yang, Yung-Yu Chen, Sheng-Tao John Yu, “Viscoelasticity determined by measured wave absorption coefficient for modeling waves in soft tissues”, Wave Motion, Volume 50, Issue 2, March 2013, Page 334-346. doi: 10.1016/j.wavemoti.2012.09.002. |