Ludek Klimes:
Contributions to serial "Seismic Waves in Complex 3-D Structures"

  1. Klimes, L. (1994): Kirchhoff integrals and Fresnel zones. In: Seismic Waves in Complex 3-D Structures, Report 1, Dep. Geophys., Charles Univ., Prague, pp. 77-84. GIF150, PS
  2. Klimes, L., Kvasnicka, M. and Cerveny, V. (1994): Grid computations of rays and travel times. In: Seismic Waves in Complex 3-D Structures, Report 1, Dep. Geophys., Charles Univ., Prague, pp. 85-114. GIF150
  3. Klimes, L. (1994): Grid travel-time tracing: second-order method for the first arrivals in smooth media. In: Seismic Waves in Complex 3-D Structures, Report 1, Dep. Geophys., Charles Univ., Prague, pp. 115-126. GIF150, PS
  4. Klimes, L. (1994): Accuracy of finite differences in smooth media. In: Seismic Waves in Complex 3-D Structures, Report 1, Dep. Geophys., Charles Univ., Prague, pp. 127-149. GIF150, PS
  5. Klimes, L. (1994): Finite differences at structural interfaces. In: Seismic Waves in Complex 3-D Structures, Report 1, Dep. Geophys., Charles Univ., Prague, pp. 151-161. GIF150, PS
  6. Klimes, L. (1994): Fortran77 packages MODEL and CRT. In: Seismic Waves in Complex 3-D Structures, Report 1, Dep. Geophys., Charles Univ., Prague, pp. 241-252. GIF150
  7. Klimes, L. (1995): Examples of seismic models. In: Seismic Waves in Complex 3-D Structures, Report 3, Dep. Geophys., Charles Univ., Prague, pp. 5-35. GIF150, PS
  8. Klimes, L. (1995): Travel-time calculation in heterogeneous 3-D structures. In: Seismic Waves in Complex 3-D Structures, Report 3, Dep. Geophys., Charles Univ., Prague, pp. 145-156. GIF150, PS
  9. Klimes, L. (1995): Grid travel-time tracing: second-order method for the first arrivals in smooth media. In: Seismic Waves in Complex 3-D Structures, Report 3, Dep. Geophys., Charles Univ., Prague, pp. 157-174. GIF150, PS
  10. Klimes, L. (1996): Accuracy and resolution of the travel-time tomography. In: Seismic Waves in Complex 3-D Structures, Report 4, Dep. Geophys., Charles Univ., Prague, pp. 13-24. GIF150, (PS)
  11. Klimes, L. (1996): Correlation function of a self-affine random medium. In: Seismic Waves in Complex 3-D Structures, Report 4, Dep. Geophys., Charles Univ., Prague, pp. 25-38. GIF150, PS
  12. Bulant, P. and Klimes, L. (1996): Examples of seismic models. Part 2. In: Seismic Waves in Complex 3-D Structures, Report 4, Dep. Geophys., Charles Univ., Prague, pp. 39-52. GIF150, PS
  13. Klimes, L. (1996): Travel times in the INRIA Marmousi models. In: Seismic Waves in Complex 3-D Structures, Report 4, Dep. Geophys., Charles Univ., Prague, pp. 53-60. GIF150, PS
  14. Klimes, L. (1996): Synthetic seismograms in 2-D model UNCONFORMITY. In: Seismic Waves in Complex 3-D Structures, Report 4, Dep. Geophys., Charles Univ., Prague, pp. 77-89. GIF150, PS
  15. Klimes, L. (1996): Grid travel-time tracing: accuracy comparison of several methods. In: Seismic Waves in Complex 3-D Structures, Report 4, Dep. Geophys., Charles Univ., Prague, pp. 143-150. GIF150, PS
  16. Klimes, L. (1997): Accuracy and resolution of the travel-time tomography. In: Seismic Waves in Complex 3-D Structures, Report 6, Dep. Geophys., Charles Univ., Prague, pp. 13-24. GIF150, PS
  17. Klimes, L. (1997): Correlation functions of random media. In: Seismic Waves in Complex 3-D Structures, Report 6, Dep. Geophys., Charles Univ., Prague, pp. 25-40. GIF150, PS
  18. Klimes, L. (1997): Resolution of prestack seismic migration. In: Seismic Waves in Complex 3-D Structures, Report 6, Dep. Geophys., Charles Univ., Prague, pp. 41-54. GIF150, PS
  19. Klimes, L. (1997): Calculation of the third and higher travel-time derivatives in isotropic and anisotropic media. In: Seismic Waves in Complex 3-D Structures, Report 6, Dep. Geophys., Charles Univ., Prague, pp. 157-166. GIF150, PS
  20. Klimes, L. (1997): Phase shift of the Green function due to caustics in anisotropic media. In: Seismic Waves in Complex 3-D Structures, Report 6, Dep. Geophys., Charles Univ., Prague, pp. 167-173. GIF150, PS
  21. Klimes, L. (ed.) (1997): SW3D-CD-1 (CD-ROM). In: Seismic Waves in Complex 3-D Structures, Report 6, Dep. Geophys., Charles Univ., Prague, p. 367.
  22. Bulant, P. and Klimes, L. (1998): Interpolation of ray-theory travel times within ray cells. In: Seismic Waves in Complex 3-D Structures, Report 7, Dep. Geophys., Charles Univ., Prague, pp. 17-32. GIF150, PS
  23. Bulant, P. and Klimes, L. (1998): Computations in the model composed during the 1998 consortium meeting. In: Seismic Waves in Complex 3-D Structures, Report 7, Dep. Geophys., Charles Univ., Prague, pp. 33-56. GIF150, PS
  24. Klimes, L. (1998): Comparison of ray-matrix and finite-difference methods in a simple 1-D model. In: Seismic Waves in Complex 3-D Structures, Report 7, Dep. Geophys., Charles Univ., Prague, pp. 169-180. GIF150, PS
  25. Bulant, P. and Klimes, L. (1998): Coupling ray theory in weakly anisotropic media. In: Seismic Waves in Complex 3-D Structures, Report 7, Dep. Geophys., Charles Univ., Prague, pp. 215-223. GIF150, PS
  26. Klimes, L. (1998): Packages FORMS version 5.20, MODEL version 5.20, CRT version 5.20, NET version 3.10, FD version 5.20 and RMATRIX. In: Seismic Waves in Complex 3-D Structures, Report 7, Dep. Geophys., Charles Univ., Prague, pp. 399-402. GIF150, PS
  27. Klimes, L. (ed.) (1998): SW3D-CD-2 (CD-ROM). In: Seismic Waves in Complex 3-D Structures, Report 7, Dep. Geophys., Charles Univ., Prague, p. 405.
  28. Klimes, L. (1999): Lyapunov exponents for 2-D ray tracing without interfaces. In: Seismic Waves in Complex 3-D Structures, Report 8, Dep. Geophys., Charles Univ., Prague, pp. 83-96. GIF150, PS
  29. Klimes, L. (1999): Perturbation of the polarization vectors in the isotropic ray theory. In: Seismic Waves in Complex 3-D Structures, Report 8, Dep. Geophys., Charles Univ., Prague, pp. 97-102. GIF150, PS
  30. Klimes, L. (1999): Analytical one-way plane-wave solution in the 1-D anisotropic "twisted crystal" model. In: Seismic Waves in Complex 3-D Structures, Report 8, Dep. Geophys., Charles Univ., Prague, pp. 103-118. GIF150, PS
  31. Bulant, P., Klimes, L. and Psencik, I. (1999): Comparison of ray methods with the exact solution in the 1-D anisotropic "twisted crystal" model. In: Seismic Waves in Complex 3-D Structures, Report 8, Dep. Geophys., Charles Univ., Prague, pp. 119-126. GIF150, PS
  32. Bucha, V. and Klimes, L. (1999): Finite differences above the MODEL package. In: Seismic Waves in Complex 3-D Structures, Report 8, Dep. Geophys., Charles Univ., Prague, pp. 171-192. GIF150, PS
  33. Bucha, V. and Klimes, L. (eds.) (1999): SW3D-CD-3 (CD-ROM). In: Seismic Waves in Complex 3-D Structures, Report 8, Dep. Geophys., Charles Univ., Prague, p. 193.
  34. Klimes, L. (2000): Sobolev scalar products in the construction of velocity models. In: Seismic Waves in Complex 3-D Structures, Report 10, Dep. Geophys., Charles Univ., Prague, pp. 15-40. GIF150, PS
  35. Klimes, L. (2000): Smoothing the Marmousi model for Gaussian-packet migrations. In: Seismic Waves in Complex 3-D Structures, Report 10, Dep. Geophys., Charles Univ., Prague, pp. 63-74. GIF150, PS
  36. Klimes, L. (2000): Calculation of geometrical spreading from gridded slowness vectors in 2-D. In: Seismic Waves in Complex 3-D Structures, Report 10, Dep. Geophys., Charles Univ., Prague, pp. 115-120. GIF150, PS
  37. Bucha, V., Bulant, P. & Klimes, L. (eds.) (2000): SW3D-CD-4 (CD-ROM). In: Seismic Waves in Complex 3-D Structures, Report 10, Dep. Geophys., Charles Univ., Prague, p. 227.
  38. Klimes, L. (2001): Application of the medium covariance functions to travel-time tomography. In: Seismic Waves in Complex 3-D Structures, Report 11, Dep. Geophys., Charles Univ., Prague, pp. 73-89. GIF150, PS
  39. Klimes, L. (2001): Correlation functions of random media. In: Seismic Waves in Complex 3-D Structures, Report 11, Dep. Geophys., Charles Univ., Prague, pp. 91-109. GIF150, PS
  40. Klimes, L. (2001): Estimating the correlation function of a self-affine random medium. In: Seismic Waves in Complex 3-D Structures, Report 11, Dep. Geophys., Charles Univ., Prague, pp. 111-131. GIF150, PS
  41. Psencik, I., Bulant, P., V.Cerveny, & Klimes, L. (2001): Ray methods in the modelling of seismic wave fields. In: Seismic Waves in Complex 3-D Structures, Report 11, Dep. Geophys., Charles Univ., Prague, pp. 203-210. GIF150, PS
  42. Bulant, P., & Klimes, L. (2001): Numerical algorithm of the coupling ray theory in weakly anisotropic media. In: Seismic Waves in Complex 3-D Structures, Report 11, Dep. Geophys., Charles Univ., Prague, pp. 263-277. GIF150, PS
  43. Bucha, V., Bulant, P. & Klimes, L. (eds.) (2001): SW3D-CD-5 (CD-ROM). In: Seismic Waves in Complex 3-D Structures, Report 11, Dep. Geophys., Charles Univ., Prague, p. 357.
  44. Klimes, L. (2002): Weak-contrast reflection/transmission coefficients in a generally anisotropic background. In: Seismic Waves in Complex 3-D Structures, Report 12, Dep. Geophys., Charles Univ., Prague, pp. 41-52. GIF150, PS
  45. Klimes, L. (2002): Transformations for dynamic ray tracing in anisotropic media with a homogeneous Hamiltonian of an arbitrary degree. In: Seismic Waves in Complex 3-D Structures, Report 12, Dep. Geophys., Charles Univ., Prague, pp. 67-78. GIF150, PS
  46. Klimes, L. (2002): Relation of the wave-propagation metric tensor to the curvatures of the slowness and ray-velocity surfaces. In: Seismic Waves in Complex 3-D Structures, Report 12, Dep. Geophys., Charles Univ., Prague, pp. 79-87. GIF150, PS
  47. Bulant, P. & Klimes, L. (2002): Comparison of quasi-isotropic approximations of the coupling ray theory with the exact solution in the 1-D anisotropic "oblique twisted crystal" model. In: Seismic Waves in Complex 3-D Structures, Report 12, Dep. Geophys., Charles Univ., Prague, pp. 171-184. GIF150, PS
  48. Klimes, L. & Bulant, P. (2002): Errors due to the common ray approximations of the coupling ray theory. In: Seismic Waves in Complex 3-D Structures, Report 12, Dep. Geophys., Charles Univ., Prague, pp. 185-212. GIF150, PS
  49. Klimes, L. (2003): Perturbations and spatial derivatives of amplitude in isotropic and anisotropic media. In: Seismic Waves in Complex 3-D Structures, Report 13, Dep. Geophys., Charles Univ., Prague, pp. 107-118. GIF150, PS
  50. Klimes, L. (2003): Common ray tracing and dynamic ray tracing for S waves in a smooth elastic anisotropic medium. In: Seismic Waves in Complex 3-D Structures, Report 13, Dep. Geophys., Charles Univ., Prague, pp. 119-141. GIF150, PS
  51. Klimes, L. (2004): Gaussian packets in smooth isotropic media. In: Seismic Waves in Complex 3-D Structures, Report 14, Dep. Geophys., Charles Univ., Prague, pp. 43-54. GIF150, PS
  52. Klimes, L. (2004): Notes on summation of Gaussian beams and packets. In: Seismic Waves in Complex 3-D Structures, Report 14, Dep. Geophys., Charles Univ., Prague, pp. 55-70. GIF150, PS
  53. Bulant, P. & Klimes, L. (2004): Anisotropic common ray approximation of the coupling ray theory. In: Seismic Waves in Complex 3-D Structures, Report 14, Dep. Geophys., Charles Univ., Prague, pp. 107-122. GIF150, PS
  54. Cerveny, V., Klimes, L. & Psencik, I. (2005): Seismic ray method: Recent developments. In: Seismic Waves in Complex 3-D Structures, Report 15, Dep. Geophys., Charles Univ., Prague, pp. 57-172.
  55. Klimes, L. (2005): Hamiltonian formulation of the Finsler and Riemann geometries. In: Seismic Waves in Complex 3-D Structures, Report 15, Dep. Geophys., Charles Univ., Prague, pp. 207-216. GIF150, PS
  56. Klimes, L. & Bulant, P. (2005): Errors due to the anisotropic-common-ray approximation of the coupling ray theory. In: Seismic Waves in Complex 3-D Structures, Report 15, Dep. Geophys., Charles Univ., Prague, pp. 267-287. GIF150, PS
  57. Bulant, P. & Klimes, L. (2006): Numerical comparison of the isotropic-common-ray and anisotropic-common-ray approximations of the coupling ray theory. In: Seismic Waves in Complex 3-D Structures, Report 16, Dep. Geophys., Charles Univ., Prague, pp. 155-178. GIF150, PS
  58. Bulant, P. & Klimes, L. (2007): Comparison of VSP and sonic-log data in non-vertical wells in a heterogeneous structure. In: Seismic Waves in Complex 3-D Structures, Report 17, Dep. Geophys., Charles Univ., Prague, pp. 17-26. GIF150, PS
  59. Klimes, L. (2007): Sensitivity of seismic waves to the structure. In: Seismic Waves in Complex 3-D Structures, Report 17, Dep. Geophys., Charles Univ., Prague, pp. 27-61. GIF150, PS
  60. Klimes, L. (2007): Coupling ray series. In: Seismic Waves in Complex 3-D Structures, Report 17, Dep. Geophys., Charles Univ., Prague, pp. 99-109. GIF150, PS
  61. Cerveny, V., Klimes, L. & Psencik, I. (2007): Attenuation vector in heterogeneous, weakly dissipative, anisotropic media. In: Seismic Waves in Complex 3-D Structures, Report 17, Dep. Geophys., Charles Univ., Prague, pp. 195-212. GIF150, PS
  62. Klimes, L. (2008): Computer representation of the model covariance function resulting from travel-time tomography. In: Seismic Waves in Complex 3-D Structures, Report 18, Dep. Geophys., Charles Univ., Prague, pp. 17-26. GIF150, PS
  63. Klimes, L. (2008): Calculation of the a priori geometrical covariances of travel times in a self-affine random medium. In: Seismic Waves in Complex 3-D Structures, Report 18, Dep. Geophys., Charles Univ., Prague, pp. 27-70. GIF150, PS
  64. Klimes, L. (2008): Stochastic wavefield inversion using the sensitivity Gaussian packets. In: Seismic Waves in Complex 3-D Structures, Report 18, Dep. Geophys., Charles Univ., Prague, pp. 71-85. GIF150, PS
  65. Klimes, L. (2008): Scalar products of the structural Gabor functions. In: Seismic Waves in Complex 3-D Structures, Report 18, Dep. Geophys., Charles Univ., Prague, pp. 87-93. GIF150, PS
  66. Klimes, L. (2008): Frame bounds and discretization error of the 1-D Gabor transform. In: Seismic Waves in Complex 3-D Structures, Report 18, Dep. Geophys., Charles Univ., Prague, pp. 95-108. GIF150, PS
  67. Klimes, L. (2008): A conjecture on the frame bounds of the multidimensional Gabor transform with complex-valued envelopes. In: Seismic Waves in Complex 3-D Structures, Report 18, Dep. Geophys., Charles Univ., Prague, pp. 109-114. GIF150, PS
  68. Klimes, L. (2008): Optimization of the structural Gabor functions in a homogeneous velocity model for a zero-offset surface seismic reflection survey. In: Seismic Waves in Complex 3-D Structures, Report 18, Dep. Geophys., Charles Univ., Prague, pp. 115-127. GIF150, PS
  69. Bulant, P. & Klimes, L. (2009): KTB sonic logs. In: Seismic Waves in Complex 3-D Structures, Report 19, Dep. Geophys., Charles Univ., Prague, pp. 17-38. GIF120, PS
  70. Klimes, L. (2009): Relation between the propagator matrix of geodesic deviation and second-order derivatives of characteristic function. In: Seismic Waves in Complex 3-D Structures, Report 19, Dep. Geophys., Charles Univ., Prague, pp. 103-114. GIF120, PS
  71. Cerveny, V. & Klimes, L. (2009): Transformation relations for second derivatives of travel time in anisotropic media. In: Seismic Waves in Complex 3-D Structures, Report 19, Dep. Geophys., Charles Univ., Prague, pp. 115-122. GIF120, PDF
  72. Klimes, L. (2009): System of two Hamilton-Jacobi equations for complex-valued travel time. In: Seismic Waves in Complex 3-D Structures, Report 19, Dep. Geophys., Charles Univ., Prague, pp. 157-171. GIF120, PS
  73. Klimes, L. (2009): Complex-valued eikonal-transport equation. In: Seismic Waves in Complex 3-D Structures, Report 19, Dep. Geophys., Charles Univ., Prague, pp. 173-190. GIF120, PS
  74. Klimes, L. (2010): Sensitivity Gaussian packets. In: Seismic Waves in Complex 3-D Structures, Report 20, Dep. Geophys., Charles Univ., Prague, pp. 29-34. PDF
  75. Klimes, L. (2010): Transformation of spatial and perturbation derivatives of travel time at a general interface between two general media. In: Seismic Waves in Complex 3-D Structures, Report 20, Dep. Geophys., Charles Univ., Prague, pp. 103-114. PDF
  76. Klimes, L. (2010): Transformation of paraxial matrices at a general interface between two general media. In: Seismic Waves in Complex 3-D Structures, Report 20, Dep. Geophys., Charles Univ., Prague, pp. 115-126. PDF
  77. Klimes, M. & Klimes, L. (2010): Perturbation expansions of complex-valued travel time along real-valued reference rays. In: Seismic Waves in Complex 3-D Structures, Report 20, Dep. Geophys., Charles Univ., Prague, pp. 193-205. PDF
  78. Klimes, L. (2010): Sensitivity of electromagnetic waves to a heterogeneous bianisotropic structure. In: Seismic Waves in Complex 3-D Structures, Report 20, Dep. Geophys., Charles Univ., Prague, pp. 207-213. PDF
  79. Klimes, L. (2011): Resolution of prestack depth migration. In: Seismic Waves in Complex 3-D Structures, Report 21, Dep. Geophys., Charles Univ., Prague, pp. 27-45. PDF
  80. Klimes, L. (2011): Zero-order ray-theory Green tensor in a heterogeneous anisotropic medium. In: Seismic Waves in Complex 3-D Structures, Report 21, Dep. Geophys., Charles Univ., Prague, pp. 115-123. PDF
  81. Klimes, L. & Bulant, P. (2012): Single-frequency approximation of the coupling ray theory. In: Seismic Waves in Complex 3-D Structures, Report 22, Dep. Geophys., Charles Univ., Prague, pp. 143-167. PDF
  82. L. Klimes (2013): Sensitivity of seismic waves to structure: Wide-angle broad-band sensitivity packets. In: Seismic Waves in Complex 3-D Structures, Report 23, Dep. Geophys., Charles Univ., Prague, pp. 17-44. PDF
  83. L. Klimes (2013): Relation between the propagator matrix of geodesic deviation and the second-order derivatives of the characteristic function for a general Hamiltonian function. In: Seismic Waves in Complex 3-D Structures, Report 23, Dep. Geophys., Charles Univ., Prague, pp. 121-134. PDF
  84. L. Klimes (2013): Calculation of the spatial gradient of the independent parameter along geodesics for a general Hamiltonian function. In: Seismic Waves in Complex 3-D Structures, Report 23, Dep. Geophys., Charles Univ., Prague, pp. 135-143. PDF
  85. L. Klimes (2013): Paraxial Super-Gaussian beams. In: Seismic Waves in Complex 3-D Structures, Report 23, Dep. Geophys., Charles Univ., Prague, pp. 145-148. PDF
  86. L. Klimes & P. Bulant (2013): Interpolation of the coupling-ray-theory S-wave Green tensor within ray cells. In: Seismic Waves in Complex 3-D Structures, Report 23, Dep. Geophys., Charles Univ., Prague, pp. 203-218. PDF
  87. Klimes, L. (2014): Phase shift of a general wavefield due to caustics in anisotropic media. Seismic Waves in Complex 3-D Structures, 24, 95-109. PDF
  88. Klimes, L. (2014): Calculation of the amplitudes of elastic waves in anisotropic media in Cartesian or ray-centred coordinates. Seismic Waves in Complex 3-D Structures, 24, 111-126. PDF
  89. Klimes, L. (2014): Superposition of Gaussian packets in heterogeneous anisotropic media. Seismic Waves in Complex 3-D Structures, 24, 127-130. PDF
  90. Klimes, L. & Bulant, P. (2014): Prevailing-frequency approximation of the coupling ray theory for S waves along the SH and SV reference rays in a transversely isotropic medium. Seismic Waves in Complex 3-D Structures, 24, 165-177. PDF
  91. Bulant, P. & Klimes, L. (2014): Anisotropic-ray-theory geodesic deviation and two-point ray tracing through a split intersection singularity. Seismic Waves in Complex 3-D Structures, 24, 179-187. PDF
  92. Klimes, L. & Bulant, P. (2014): Anisotropic-ray-theory rays in velocity model SC1_II with a split intersection singularity. Seismic Waves in Complex 3-D Structures, 24, 189-205. PDF
  93. Klimes, L. (2014): Approximating the complex-valued Green-tensor amplitude by a real-valued Green-tensor amplitude. Seismic Waves in Complex 3-D Structures, 24, 207-209. PDF
  94. Bulant, P. & Klimes, L. (2015): Nonlinear hypocentre determination. Seismic Waves in Complex 3-D Structures, 25, 17-36. PDF
  95. Bucha, V. & Klimes, L. (2015): Nonlinear hypocentre determination in the 3-D Western Bohemia a priori velocity model. Seismic Waves in Complex 3-D Structures, 25, 37-50. PDF
  96. Klimes, L. (2015): Superpositions of Gaussian beams and column Gaussian packets in heterogeneous anisotropic media. Seismic Waves in Complex 3-D Structures, 25, 103-108. PDF
  97. Klimes, L. (2015): Determination of the reference symmetry axis of a generally anisotropic medium which is approximately transversely isotropic. Seismic Waves in Complex 3-D Structures, 25, 177-185. PDF
  98. Klimes, L. & Bulant, P. (2015): Ray tracing and geodesic deviation of the SH and SV reference rays in a heterogeneous generally anisotropic medium which is approximately transversely isotropic. Seismic Waves in Complex 3-D Structures, 25, 187-208. PDF
  99. Klimes, L. (2016): Superpositions of Gaussian beams and column Gaussian packets in heterogeneous anisotropic media. Seismic Waves in Complex 3-D Structures, 26, 123-130. PDF
  100. Klimes, L. (2016): Reference transversely isotropic medium approximating a given generally anisotropic medium. Seismic Waves in Complex 3-D Structures, 26, 155-168. PDF
  101. Klimes, L. (2016): Frequency-domain ray series for viscoelastic waves with a non-symmetric stiffness matrix. Seismic Waves in Complex 3-D Structures, 26, 159-166. PDF
  102. Klimes, L. (2016): Ray series for electromagnetic waves in static heterogeneous bianisotropic dielectric media. Seismic Waves in Complex 3-D Structures, 26, 167-182. PDF
  103. Klimes, L. (2017): Representation theorem for viscoelastic waves with a non-symmetric stiffness matrix. Seismic Waves in Complex 3-D Structures, 27, 93-96. PDF
  104. Klimes, L. (2017): Rotationally invariant viscoelastic medium with a non-symmetric stiffness matrix. Seismic Waves in Complex 3-D Structures, 27, 97-103. PDF
  105. Klimes, L. (2017): Field equivalence principle for electromagnetic waves in a heterogeneous generally bianisotropic medium. Seismic Waves in Complex 3-D Structures, 27, 105-110. PDF
  106. Klimes, L. (2017): Rotationally invariant bianisotropic electromagnetic medium. Seismic Waves in Complex 3-D Structures, 27, 111-118. PDF
  107. Klimes, L. (2017): Uniaxial bianisotropic electromagnetic medium with a split intersection slowness-surface singularity. Seismic Waves in Complex 3-D Structures, 27, 119-125. PDF
  108. Klimes, L. (2017): Determination of the reference symmetry axis of a generally bianisotropic electromagnetic medium which could be approximately rotationally invariant. Seismic Waves in Complex 3-D Structures, 27, 127-131. PDF
  109. Klimes, L. (2020): Two S-wave eigenvectors of the Christoffel matrix need not exist in anisotropic viscoelastic media. Seismic Waves in Complex 3-D Structures, 30, 73-76. PDF
  110. Klimes, L. (2020): Tracing real-valued reference rays in anisotropic viscoelastic media. Seismic Waves in Complex 3-D Structures, 30, 77-94. PDF
  111. Klimes, L. (2022): S-wave polarization vectors in anisotropic viscoelastic media. Seismic Waves in Complex 3-D Structures, 31, 69-87. PDF

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