PUBLICATIONS

by Mark M. Meerschaert


  1. Large deviations for local time fractional Brownian motion and applications, Journal of Mathematical Analysis and Applications, Vol. 346 (2008), pp. 432–445 (with Erkan Nane and Yimin Xiao, Department of Statistics and Probability, Michigan State University).
  2. Transport of Conservative Solutes in Simulated Fracture Networks 2. Ensemble Solute Transport and the Correspondence to Operator-Stable Limit Distributions, Water Resources Research, Vol. 44 (2008), W05410, doi:10.1029/2008WR006858 (with Donald M. Reeves, Desert Research Institute, Reno, Nevada, USA; and David A. Benson, Department of Geology and Geological Engineering, Colorado School of Mines; and Hans-Peter Scheffler, Department of Mathematics, University of Siegen, Germany). 
  3. Transport of Conservative Solutes in Simulated Fracture Networks 1. Synthetic Data Generation, Water Resources Research, Vol. 44 (2008), W05404, doi:10.1029/2007WR006069 (with D.M. Reeves; and D.A. Benson).
  4. Numerical solutions for fractional reaction-diffusion equations, Computers and Mathematics with Applications, Vol. 55 (2008), pp. 2212–2226 (with Boris Baeumer and Mihaly Kovacs, Department of Mathematics & Statistics, University of Otago, Dunedin, New Zealand).
  5. Ensemble Solute Transport in 2-D Operator-Scaling Random Fields, Water Resources Research, Vol. 44 (2008), W02434, doi:10.1029/2007WR005998 (with Nathan D. Monnig and David A. Benson, Department of Geology and Geological Engineering, Colorado School of Mines; and Boris Baeumer). 
  6. A new stochastic model for fracture transmissivity assessment, Water Resources Research, Vol. 44 (2008), p. W02435, doi:10.1029/2007WR006053 (with Tomasz J. Kozubowski, Department of Mathematics and Statistics, University of Nevada, Reno; and Gunnar Gustafson, Department of GEO Engineering, Chalmers University of Technology, Gothenburg, Sweden).
  7.  Innovations Algorithm Asymptotics for Periodically Stationary Time Series with Heavy Tails, Journal of Multivariate Analysis, Vol. 99 (2008), No. 1, pp. 94-116, DOI 10.1016/j.jmva.2007.02.005 (with Paul L. Anderson, Department of Mathematics and Computer Science, Albion College, Albion, Michigan; and Laimonis Kavalieris, Department of Mathematics &  Statistics, University of Otago, Dunedin, New Zealand).
  8. Fractional reproduction-dispersal equations and heavy tail dispersal kernels (corrected version), Bulletin of Mathematical Biology, Vol. 69 (2007), pp. 2281-2297 (with Boris Baeumer; and Mihaly Kovacs, Department of Mathematics & Statistics, University  of Otago, Dunedin, New Zealand).
  9. Extreme events with power law interarrivals, Geophysical Research Letters, Vol. 34 (2007), No. 16, L16404 (5 pp.) (with David A. Benson; and Rina Schumer, Desert Research Institute, Reno).
  10. Fourier-PARMA Models and Their Application to Modeling of River  Flows, Journal of Hydrologic Engineering, Vol. 12 (2007), No. 5, pp. 462-472 (with Yonas Gebeyehu Tesfaye, Graduate Program in Hydrologic Sciences, University of Nevada, Reno; and Paul L. Anderson).
  11. Mathematical Modeling , 3rd Edition, Academic Press, 2007, ISBN 978-0-12-370857-1.
  12. Space-fractional advection-dispersion equations with variable parameters: Diverse formulas, numerical solutions, and application to the MADE-site data,  Water Resources Research, Vol. 43 (2007), p. W05439, doi:10.1029/2006WR004912 (with Yong Zhang, Desert Research Institute, Las Vegas, Nevada; David A. Benson; and Eric M. LaBolle, Department of Land, Air, and Water Resources, University of  California, Davis).
  13. Operator Scaling Stable Random Fields, Stochastic Processes and their Applications, Vol. 117 (2007), pp. 312–332 (with Hermine Biermé, Université René Descartes, Paris, France; and H.P. Scheffler, Department of Mathematics, University of Siegen, Germany).
  14. A second order accurate numerical method for the two-dimensional fractional diffusion equation, Journal of Computational Physics, Vol. 220 (2007) pp. 813–823 (with Charles Tadjeran, Department of Physics, University of Nevada, Reno).  Click here to download the FORTRAN source code used in Section 5 of this paper to implement the Crank-Nicholson alternating directions implicit method with interpolation scheme.
  15. Fractional diffusion with two time scales, Physica A: Statistical Mechanics and Its Applications, Vol. 373 (2007), pp. 237–251 (with Boris Baeumer).
  16. Ultrafast subordinators and their hitting times, Publications de l'Institut Mathematique, Nouvelle série, Vol. 80(94) (2006), 193–206; Memorial volume for Tatjana Ostrogorski (with Mihaly Kovacs).
  17. Fractional Laplace Motion, Advances in Applied Probability, Vol. 38 (2006), No. 2, pp. 451-464. (with Tomasz J. Kozubowski, Department of Mathematics and Statistics, University of Nevada, Reno; and Krzysztof Podgórski, Department of Mathematical Statistics, Lund University, Sweden).
  18. Random walk approximation of fractional-order multiscaling anomalous diffusion, Physical Review E, Vol. 74 (2006), 026706 (10 pp) (with Yong Zhang; David A. Benson; Eric M. LaBolle; and H.P. Scheffler).
  19. Coupled continuous time random walks in finance, Physica A: Statistical Mechanics and Its Applications, Vol. 370 (2006), pp. 114-118  (with Enrico Scalas, Dipartimento di Scienze e Tecnologie Avanzate, Università del Piemonte Orientale, Alessandria, Italy).
  20. Lagrangian characterization of contaminant transport through multidimensional heterogeneous media with limited heterogeneity informationConference Proceedings for MODFLOW and MORE 2006: Managing Ground-Water Systems, International Ground Water Modeling Center, pp. 639-643  (with Zhang Yong; David A. Benson; Eric M. LaBolle; and H.P. Scheffler).
  21. Stochastic model for ultraslow diffusion, Stochastic Processes and Their Applications, Volume 116, Issue 9, September 2006, Pages 1215-1235 (with H.P. Scheffler).
  22. Fractional vector calculus for fractional advection-dispersion, Physica A: Statistical Mechanics and Its Applications, Vol. 367 (2006), pp. 181-190 (with  Jeff Mortensen, Department of Mathematics and Statistics, University of Nevada, Reno; and Stephen W. Wheatcraft, Department of Geologic Sciences, University of Nevada, Reno).
  23. On using random walks to solve the space-fractional advection-dispersion equations, Journal of Statistical Physics, Vol. 123 (2006), No.1, pp. 89-110 (with Yong Zhang; David A. Benson; and Hans-Peter Scheffler). 
  24. Heavy tailed log hydraulic conductivity distributions imply heavy tailed log velocity distributions (10.2 MB), Water Resources Research, Vol. 42 (2006), No. 4, article W04411 (12 pp.), doi:10.1029/2004WR003815 (with Matthew Kohlbecker, AMEC Earth & Environmental, Inc.,Portland, Oregon; and Stephen W. Wheatcraft).
  25. Parameter Estimation for the Truncated Pareto Distribution, Journal of the American Statistical Association: Theory and Methods, Volume 101 (2006), Number 473, pp.270-277 (with Inmaculada B. Aban, Department of Biostatistics, School of Public Health, University of Alabama at Birmingham; and Anna K. Panorska, Department of Mathematics and Statistics, University of Nevada, Reno).  Winner of the 2007 best paper award for a University of Alabama at Birmingham Based Investigator in the Area of General Statistics, from the Science Unbound Foundation.  Click here to download the Microsoft Excel spreadsheet  tool for computing the trauncated Pareto parameter conditional maximum likelihood estimator from this paper.  
  26. A second order accurate numerical approximation for the fractional diffusion equation, Journal of Computational Physics, Vol. 213 (2006), No. 1, pp. 205-213 (with Hans-Peter Scheffler; and Charles Tadjeran).  Click here to download the FORTRAN source code used in Section 5 of this paper to implement the Crank-Nicholson method and interpolation scheme.
  27. Identification of PARMA Models and Their Application to the Modeling of Riverflows, Water Resources Research, Vol. 42 (2006), No. 1, W01419 (11pp.), doi:10.1029/2004WR003772 (with Yonas Gebeyehu Tesfaye; and Paul L. Anderson).
  28. Aquifer Operator-Scaling and the Effect on Solute Mixing and Dispersion, Water Resources Research, Vol. 42 (2006), No. 1, W01415 (18 pp.), doi:10.1029/2004WR003755 (with David A. Benson; Boris Baeumer;  and Hans-Peter Scheffler).
  29. Finite difference approximations for two-sided space-fractional partial differential equations, Applied Numerical Mathematics, Vol. 56 (2006), No. 1, pp. 80-90 (with Charles Tadjeran). Click here to download the FORTRAN source code used in Section 4 of this paper to implement the implicit Euler method for a two-sided fractional Fokker-Planck equation.
  30. Finite difference methods for two-dimensional fractional dispersion equation, Journal of Computational Physics, Vol. 211 (2006), No. 1, pp. 249-261  (with Hans-Peter Scheffler; and Charles Tadjeran).  Click here to download the FORTRAN source code used in Section 4 of this paper to implement the implicit Euler ADI method.
  31. Inhomogeneous fractional diffusion equations, Fractional Calculus and Applied Analysis, Vol. 8, No 4 (2005), pp. 371-386 (with Boris Baeumer; and Satoko Kurita, Department of Mathematics and Statistics, University of Nevada, Reno).
  32. Speculative option valuation and the fractional diffusion equation, Fractional derivatives and their applications, pp. 265-274, A. Le Mehauté, J. A. Tenreiro Machado, J. C. Trigeassou and J. Sabatier, Eds. (2005), Ubooks, Germany, ISBN 3-86608-026-3 (with Enrico Scalas, Dipartimento di Scienze e Tecnologie Avanzate, Università del Piemonte Orientale, Alessandria, Italy; Rudolf Gorenflo, Erstes Matematisches Institut, Freie Universität Berlin, Berlin, Germany; and Francesco Mainardi, Dipartimento di Fisica and INFN, Università di Bologna, Bologna, Italy).
  33.  Do heterogeneous sediment properties and turbulent velocity fluctuations have something in common?  Some history and a new stochastic process.    Dynamics of Fluids and Transport in Fractured Rock. B. Faybishenko, P.A.Witherspoon, and J. Gale, Editors. Geophysical Monograph Series, Volume 162, 250 pages, hardbound, 2005, ISBN 0-87590-427-0 (with Fred J. Molz, Department of Environmental Engineering & Science, Clemson University, Clemson, SC;  Tomasz J. Kozubowski; and P.D. Hyden, Department of Mathematical Sciences, Clemson University).
  34. Parameter estimation for periodically stationary time series, Journal of Time Series Analysis, Vol. 26 (2005), No. 4, pp. 489-518 (with Paul L. Anderson).
  35. Fractal Travel Time Estimates for Dispersive Contaminants, Ground Water, Vol. 43, No. 3, May-June 2005 (pages 401-407) (with Danelle Clarke, Department of Mathematics and Statistics, University of Nevada, Reno; and Stephen W. Wheatcraft).
  36. Space-time fractional derivative operators, Proceedings of the American Mathematical Society, Vol. 133 (2005), No. 8, pp. 2273–2282 (with Boris Baeumer; and Jeff Mortensen).
  37. Advection and dispersion in time and space, Physica A: Statistical Mechanics and Its Applications, Vol. 350 (2005), No. 2-4, pp. 245-262 (with Boris Baeumer; and D.A. Benson).
  38. Limit theorems for continuous time random walks with slowly varying waiting times, Statistics and Probability Letters, Vol. 71 (2005), No. 1, pp.15-22 (with H.P. Scheffler).
  39. Operator geometric stable laws, Journal of Multivariate Analysis, Vol. 92 (2005) pp. 298-323 (with Tomasz J. Kozubowski; Anna K. Panorska; and H-P Scheffler).
  40. Dimension results for sample paths of operator stable Levy processes, Stochastic Processes and Their Applications Vol. 115 (2005), No. 1, pp. 55-75 (with Yimin Xiao, Department of Statistics and Probability, Michigan State University).
  41. Radial Fractional–Order Dispersion Through Fractured Rock, Water Resources Research, Vol. 40 (2004), No. 12, pp. 1-9, doi:10.1029/2004WR003314 (with D.A. Benson; Charles Tadjeran; Irene Farnham, Stoller Navarro Joint Venture, Las Vegas, Nevada; and Greg Pohll, Desert Research Institute, Reno, Nevada).
  42. Finite difference approximations for fractional advection-dispersion flow equations Journal of Computational and Applied Mathematics, Vol. 172 (2004), No. 1, pp. 65-77 (with Charles Tadjeran). Click here to download the FORTRAN source code as well as a sample terminal session used in section 3 of this paper to implement the implicit Euler method to solve the space-fractional radial flow equation.
  43. Limit theorems for continuous time random walks with infinite mean waiting times Journal of Applied Probability, Vol 41 (2004), No. 3, pp. 623-638 (with Hans-Peter Scheffler).
  44. Vector Grünwald formula for fractional derivatives Fractional Calculus and Applied Analysis, Vol. 7 (2004), No. 1, pp. 61-81 (with Jeff Mortensen and H.P. Scheffler)
  45. Limit theorem for continuous time random walks with two time scales, Journal of Applied Probability, Vol. 41 (2004), pp. 455-466 (with P. Becker-Kern, Department of Mathematics, University of Dortmund, Germany; and H-P Scheffler, ).
  46. Fractional Laplace Model for Hydraulic Conductivity Geophysical Research Letters, Vol. 31, No. 8 (2004), pp. 1-4, doi:10.1029/2003GL019320 (with Fred J. Molz, Department of Environmental Engineering & Science, Clemson University, Clemson, SC;  Tomasz J. Kozubowski; and Silong Lu, Tetra Tech, Inc., Atlanta, GA).
  47. Generalized least squares estimators for the thickness of heavy tails, Journal of Statistical Planning and Inference, Vol. 119 (2004), pp. 341-352 (with Inmaculada B. Aban, Department of Biostatistics, School of Public Health, University of Alabama at Birmingham).
  48. Limit theorems for coupled continuous time random walks, The Annals of Probability, Vol. 32 (2004), No. 1B, pp. 730–756 (with P. Becker-Kern and H-P Scheffler).
  49. Fractal mobile/immobile solute transport, Water Resources Research, Vol. 39 (2003), No. 10, p. 1296 (12 pp.), doi:10.1029/2003WR002141,  (with Rina Schumer, Desert Research Institute, Reno; D.A. Benson; and Boris Baeumer)
  50. The operator nu-stable laws, Publ. Math. Debrecen, Vol. 63 (2003), No. 4, pp. 569-585 (with Tomasz J. Kozubowski and H-P Scheffler).
  51. Hausdorff dimension of operator stable sample paths, Monatshefte fur Mathematik, Vol. 140 (2003), No. 2, pp. 90-101 (with H. P. Scheffler and P. Becker-Kern).
  52. Nonparametric methods for heavy tailed vector data:  A survey with applications from finance and hydrology, Recent advances and trends in nonparametric statistics, pp. 265-279, M. G.  Akritas and D.N. Politis, Eds., Elsevier Science (2003), ISBN 0-444-51378-7 (with H. P. Scheffler).
  53. Portfolio modeling with heavy tailed random vectors, Handbook of Heavy-Tailed Distributions in Finance, pp. 595-640, S. T. Rachev, Ed., Elsevier North-Holland, New York (2003) ISBN 0-444-50896-1 (with H. P. Scheffler).
  54. Multiscaling fractional advection-dispersion equations and their solutions, Water Resources Research, Vol. 39 (2003) No. 1, pp. 1022-1032, article 10.1029/2001WR000756 (with Rina Schumer, David A. Benson, and Boris Baeumer).
  55. Regular variation and the functional central limit theorem for heavy tailed random vectors. Institut Mathématique. Publications. Nouvelle Série  (Belgrade Mathematics Institute Publications, New Series), Vol. 71 (2002), pp. 55-62 (with Steven Sepanski, Department of Mathematics, Saginaw Valley State University).
  56. Hydraulic conductivity, velocity, and the order of the fractional dispersion derivative in a highly heterogeneous system, Water Resources Research, Vol. 38 (2002), No. 11, pp. 1227-1239, article 10.1029/2001WR000914, (with Matt Herrick, Desert Research Institute; David A. Benson; Katherine R. McCall, Department of Physics, UNR; and Scott L. Painter, Southwest Research Institute, San Antonio TX).
  57. Governing equations and solutions of anomalous random walk limits, Physical Review E, Vol. 66 (2002) No. 6, pp. 102R-105R, article 060102(R) (with David A. Benson; H. P. Scheffler and Peter Becker-Kern).
  58. Stochastic solution of space-time fractional diffusion equations. Physical Review E, Vol. 65 (2002), No. 4, pp. 1103-1106, article 041103 (with David A. Benson; Hans-Peter Scheffler; and Boris Baeumer).
  59. Semistable Lévy motionFractional Calculus and Applied Analysis,Vol. 5 (2002), No. 1, pp. 27-54 (with Hans-Peter Scheffler).
  60. Limit Distributions for Sums of Independent Random Vectors:  Heavy Tails in Theory and Practice , Wiley & Sons, New York, 2001 (with Hans-Peter Scheffler).
  61. Stochastic solutions for fractional Cauchy problems (corrected version)Fractional Calculus and Applied Analysis, Vol. 4 (2001), No. 4, pp. 481-500 (with Boris Baeumer).
  62. Shifted Hill's estimator for heavy tails. Communications in Statistics: Simulation and Computation, Vol. 30 (2001), No. 4, pp. 949-962  (with I. Aban, Department of Mathematics, University of Nevada, Reno).
  63. Sample cross-correlations for moving averages with regularly varying tails. Journal of Time Series Analysis,  Vol. 22 (2001), No. 4, pp. 481-492 (with Hans-Peter Scheffler).
  64. Subordinated advection-dispersion equation for contaminant transport. Water Resources Research, Vol. 37 (2001), No. 6, pp. 1543-1550 (with Boris Baeumer; David A. Benson; and Stephen W. Wheatcraft).
  65. Eulerian derivation of the fractional advection-dispersion equation. Journal of Contaminant Hydrology, Vol. 38 (2001), pp. 69-88 (with D. A. Benson; Rina Schumer, Desert Research Institute, Reno NV; and S. W. Wheatcraft).
  66. Fractional dispersion, Le'vy motion, and the MADE tracer testsTransport in Porous Media, Vol. 42 (2001), pp. 211-240. (with D. A. Benson; R. Schumer; and S. W. Wheatcraft).
  67. Operator Lévy motion and multiscaling anomalous diffusion. Physical Review E, Vol. 63 (2001), pp. 021112-021117 (with D. A. Benson and B. Bäumer).
  68. Moving averages of random vectors with regularly varying tails, Journal of Time Series Analysis, Vol. 21 (2000), pp. 297-328 (with Hans-Peter Scheffler).
  69. Limit laws for symmetric k-tensors of regularly varying measures, Journal of Multivariate Analysis, vol. 73 (2000), pp. 241-261 (with Hans-Peter Scheffler).
  70. The fractional-order governing equation of Lévy motion, Water Resources Research, Vol. 36 , No. 6 (2000), pp. 1413-1424  (with David Benson and Stephen W. Wheatcraft).
  71. Application of a fractional advection-dispersion equation, Water Resources Research, Vol. 36 , No. 6 (2000), pp. 1403-1412  (with David Benson and Stephen W. Wheatcraft).
  72. One dimensional marginals of operator stable laws and their domains of attraction, Publicationes Mathematicae Debrecen, Vol. 55 (1999), No. 3-4, pp. 487-499 (with Hans-Peter Scheffler).
  73. Spectral decomposition for operator-self-similar processes and their generalized domains of attraction, Stochastic Processes and Their Applications , Vol. 84 (1999) pp. 71-80 (with Hans-Peter Scheffler).
  74. Moment estimator for random vectors with heavy tails, Journal of Multivariate Analysis, vol. 71 (1999), No. 1, pp. 145-159 (with Hans-Peter Scheffler).
  75. Innovations algorithm for periodically stationary time series (corrected version)Stochastic Processes and Their Applications, Vol. 83 (1999) pp. 149-169 (with Paul Anderson; and Aldo V. Vecchia, Water Resources Division, U.S. Geological Survey, Bismarck, North Dakota).
  76. Sample covariance matrix for random vectors with heavy tails, Journal of Theoretical Probability, Vol. 12 (1999), No. 3, pp. 821-838 (with Hans-Peter Scheffler).
  77. Techniques for assessing the effects of uncertainties in thermodynamic models and data, Fluid Phase Equilibria, Vol. 158-160 (1999) pp. 627-641 (with W. B. Whiting and V. R. Vasquez, Chemical and Metallurgical Engineering Department, University of Nevada, Reno).
  78. Multivariable advection and fractional dispersion, Physical Review E, Vol. 59 (1999) No. 5, pp. 5026-5028  (with David Benson and Boris Bäumer).
  79. Multivariable regular variation of functions and measures, Journal of Applied Analysis, Vol. 5 (1999), No. 1, pp. 125-146 (with Hans-Peter Scheffler).
  80. Mathematical Modeling , 2nd Edition, Academic Press, 1999.
  81. A simple robust estimation method for the thickness of heavy tails, Journal of Statistical Planning and Inference, Vol. 71 (1998), No. 1-2, pp. 19-34 (with Hans-Peter Scheffler).
  82. Modeling river flows with heavy tails, Water Resources Research, Vol. 34 (1998)  No. 9, pp. 2271-2280  (with Paul Anderson).
  83. Convergence of semitypes, Publicationes Mathematicae Debrecen , Vol. 53 (1998), No. 1-2, pp. 119-131 (with Hans-Peter Scheffler).
  84. Periodic moving averages of random variables with regularly varying tails, The Annals of Statistics, Vol. 25 (1997), No. 2, pp. 771-185 (with Paul Anderson).
  85. The structure of generalized domains of semistable attraction, Statistics and Probability Letters, Vol. 33 (1997), pp. 367-372 (with Hans-Peter Scheffler).
  86. Spectral decomposition for generalized domains semistable of attraction, The Journal of Theoretical Probability, Vol. 10 (1997), No. 1, pp. 51-71 (with Hans-Peter Scheffler).
  87. Series representation for semistable laws and their domains of semistable attraction, The Journal of Theoretical Probability, Vol. 9 (1996) No. 4, pp. 931-959 (with Hans-Peter Scheffler, Department of Mathematics, University of Dortmund, Germany).
  88. Generalized domains of semistable attraction of nonnormal laws, The Journal of Applied Analysis, Vol. 2 (1996), No. 2, pp. 203-215 (with Hans-Peter Scheffler, Department of Mathematics, University of Dortmund, Germany).
  89. Mathematical modeling experience for teachers, Proceedings of the Second Biannual Symposium of Mathematical Modeling, June 13-15, 1996 (with Chaitan Gupta, Department of Mathematics, UNR).
  90. Symmetry Groups in d-Space, Statistics and Probability Letters , Vol. 22 (1995), No. 1, pp. 1-6 (with Jerry Alan Veeh, Department of Algebra, Analysis, and Combinatorics, Auburn University).
  91. Norming Operators for Generalized Domains of Attraction, Journal of Theoretical Probability, Vol. 7 (1994), pp. 793-798.
  92. Sample Moments and Symmetric Statistics, Stochastic Analysis on Infinite Dimensional Spaces, Pitman Research Notes in Mathematics, Vol. 310 (1994), pp. 197-210. (with V. Mandrekar, Department of Statistics and Probability, Michigan State University).
  93. Mathematical Modeling , Academic Press, 1993.
  94. Regular Variation and Generalized Domains of Attraction in Rk , Statistics and Probability Letters, Vol. 18 (1993) No. 2, pp. 233-239.
  95. The Structure of the Exponents and Symmetries of an Operator Stable Law, Journal of Theoretical Probability, Vol. 6 (1993), No. 4, 713-726. (with Jerry Alan Veeh, Department of Algebra, Analysis, and Combinatorics, Auburn University).
  96. Pseudomoments for Generalized Domains of Attraction, Proceedings of the American Mathematical Society, vol. 113 (1991), pp. 1071-1075.
  97. Regular Variation in Rk and Vector-Normed Domains of Attraction, Statistics and Probability Letters, vol. 11 (1991), pp. 287-289.
  98. Spectral Decomposition for Generalized Domains of Attraction, The Annals of Probability, vol. 19 (1991), pp. 875-892.
  99. Computing the Symmetries and Exponents of Operator-Stable Laws, Proceedings of the 22nd Symposium on the Interface between Computer Science and Statistics, May 1990, 461-462.
  100. Moments of Random Vectors which Belong to Some Domain of Normal Attraction, The Annals of Probability, vol. 18 (1990), pp. 870-876.
  101. AMS Referendum, letter to the editor, Notices of the American Mathematical Society, vol. 36 (1989).
  102. Modelling the Performance of a Scanning Radio Communications Sensor, Naval Research Logistics Quarterly, vol. 35 (1988), pp. 307-315 (with W. Peter Cherry, Vector Research, Inc., Ann Arbor, MI).
  103. Regular Variation in Rk, Procedings of the American Mathematical Society, vol. 102 (1988), pp. 341-348.
  104. Domains of Attraction of Nonnormal Operator-Stable Laws, Journal of Multivariate Analysis, vol. 19 (1986), pp. 342-347.
  105. Regular Variation and Domains of Attraction in Rk, Statistics and Probability Letters, vol. 4 (1986), pp. 43-45.
  106. Multivariable Domains of Attraction and Regular Variation, Doctoral Thesis, The University of Michigan, August 1984.