[1] J. Pitman, “Uniform rates of convergence for Markov chain transition probabilities,” Z. Wahrsch. Verw. Gebiete 29 (1974) 193-227, Math. Review.
[2] J. Pitman, Stopping time identities and limit theorems for Markov chains. PhD thesis, Dept. Prob. and Stat., University of Sheffield, 1974.
[3] J. Pitman, “An identity for stopping times of a Markov Process,” in Studies in Probability and Statistics, pp. 41-57. Jerusalem Academic Press, 1974. Math. Review.
[4] J. Pitman, “Path decomposition for conditional Brownian motion,” Tech. Rep. 11, Inst. Math. Stat., Univ. of Copenhagen, 1974.
[1] J. Pitman, “One-dimensional Brownian motion and the three-dimensional Bessel process,” Advances in Applied Probability 7 (1975) 511-526, Math. Review.
[1] J. Pitman, “On coupling of Markov chains,” Z. Wahrsch. Verw. Gebiete 35 (1976) 315-322, Math. Review.
[1] J. Pitman, “Occupation measures for Markov chains,” Advances in Applied Probability 9 (1977) 69-86.
[2] M. Jacobsen and J. Pitman, “Birth, death and conditioning of Markov chains,” Annals of Probability 5 (1977) 430-450, Math. Review.
[1] J. Pitman, “An extension of de Finetti’s theorem,” Advances in Applied Probability 10 (1978) 268-270.
[2] P. Greenwood and J. Pitman, “Fluctuation identities for random walk by path decomposition at the maximum,” Advances in Applied Probability 12 (1980) 291-293.
[1] D. Aldous and J. Pitman, “On the zero-one law for exchangeable events,” Annals of Probability 7 (1979) 704-723, Math. Review.
[1] L. Dubins and J. Pitman, “A pointwise ergodic theorem for the group of rational rotations,” Trans. Amer. Math. Soc. 251 (1980) 299-308, Math. Review.
[2] P. Greenwood and J. Pitman, “Fluctuation identities for Lévy processes and splitting at the maximum,” Advances in Applied Probability 12 (1980) 893-902, Math. Review.
[3] P. Greenwood and J. Pitman, “Construction of local time and Poisson point processes from nested arrays,” Journal of the London Mathematical Society 22 (1980) 182-192, Math. Review.
[4] J. Pitman and M. Yor, “Processus de Bessel, et mouvement brownien, avec drift,” C.R. Acad. Sc. Paris, Série A 291 (1980) 151-153, Math. Review.
[5] L. Dubins and J. Pitman, “A maximal inequality for skew fields,” Z. Wahrsch. Verw. Gebiete 52 (1980) 219-227, Math. Review.
[6] L. Dubins and J. Pitman, “A divergent, two-parameter, bounded martingale,” Proc. Amer. Math. Soc. 78 (1980), no. 3, 414-416, Math. Review.
[1] J. Pitman, “A note on L2 maximal inequalities,” in Séminaire de Probabilités XV, vol. 850 of Lecture Notes in Math, pp. 251-258. Springer, 1981. Math. Review.
[2] J. Pitman, “Lévy systems and path decompositions,” in Seminar on Stochastic Processes, 1981, pp. 79-110. Birkhäuser, Boston, 1981. Math. Review.
[3] L. C. G. Rogers and J. Pitman, “Markov functions,” Annals of Probability 9 (1981) 573-582, Math. Review.
[4] J. Pitman and M. Yor, “Bessel Processes and infinitely divisible Laws,” in Stochastic Integrals, vol. 851 of Lecture Notes in Math., pp. 285-370. Springer, 1981. Math. Review.
[1] J. Pitman and M. Yor, “A decomposition of Bessel bridges,” Z. Wahrsch. Verw. Gebiete 59 (1982) 425-457, Math. Review.
[2] J. Pitman and M. Yor, “Sur une décomposition des ponts de Bessel,” in Functional Analysis in Markov Processes, M. Fukushima, ed., vol. 923 of Lecture Notes in Math, pp. 276-285. Springer, 1982. Math. Review.
[1] J. Pitman, “Remarks on the convex minorant of Brownian motion,” in Seminar on Stochastic Processes, 1982, pp. 219-227. Birkhäuser, Boston, 1983. Math. Review.
[2] D. Aldous and J. Pitman, “The asymptotic speed and shape of a particle system,” in Probability, Statistics and Analysis, London Math. Soc. Lecture Notes, pp. 1-23. Cambridge Univ. Press, 1983. Math. Review.
[1] J. Pitman and M. Yor, “The asymptotic joint distribution of windings of planar Brownian motion,” Bulletin of the American Mathematical Society 10 (1984) 109-111, Math. Review.
[1] J. Pitman, “Stationary excursions,” in Séminaire de Probabilités XXI, vol. 1247 of Lecture Notes in Math., pp. 289-302. Springer, 1986. Math. Review.
[2] J. Pitman and M. Yor, “Asymptotic laws of planar Brownian motion,” Annals of Probability 14 (1986) 733-779, Article [.pdf], Math. Review.
[3] J. Pitman and M. Yor, “Some divergent integrals of Brownian motion,” in Analytic and Geometric Stochastics: Papers in Honour of G. E. H. Reuter (Special supplement to Adv. App. Prob), D. G. Kendall, J. F. C. Kingman, and D. Williams, eds., pp. 109-116. Applied Prob. Trust, 1986. Math. Review.
[4] J. Pitman and M. Yor, “Level crossings of a Cauchy process,” Annals of Probability 14 (1986) 780-792.
[5] P. Diaconis and J. Pitman, “Permutations, record values and random measures.” Unpublished lecture notes. Dept. Statistics, U.C. Berkeley, 1986.
[1] J. Pitman and M. Yor, “Compléments à l’étude asymptotique des nombres de tours du mouvement brownien complexe autour d’un nombre fini de points,” C.R. Acad. Sc. Paris, Série I 305 (1987) 757-760, Math. Review.
[1] K. Burdzy, J. Pitman, and M. Yor, “Some Asymptotic Laws for Crossings and Excursions,” in Colloque Paul Lévy sur les Processus Stochastiques, Astérisque 157-158, pp. 59-74. Société Mathématique de France, 1988. Math. Review.
[1] J. Pitman and M. Yor, “Further asymptotic laws of planar Brownian motion,” Annals of Probability 17 (1989) 965-1011, Article [.pdf], Math. Review.
[2] A. Adhikari and J. Pitman, “The shortest planar arc of width one,” Amer. Math. Monthly 96, No 4 (1989) 309-327, Article [.pdf], Math. Review.
[3] M. Barlow, J. Pitman, and M. Yor, “On Walsh’s Brownian motions,” in Séminaire de Probabilités XXIII, vol. 1372 of Lecture Notes in Math., pp. 275-293. Springer, 1989. Math. Review.
[4] M. Barlow, J. Pitman, and M. Yor, “Une extension multidimensionnelle de la loi de l’arc sinus,” in Séminaire de Probabilités XXIII, vol. 1372 of Lecture Notes in Math., pp. 294-314. Springer, 1989. Math. Review.
[5] J. Neveu and J. Pitman, “Renewal Property of the Extrema and Tree Property of a One-dimensional Brownian Motion,” in Séminaire de Probabilités XXIII, vol. 1372 of Lecture Notes in Math., pp. 239-247. Springer, 1989. Math. Review.
[6] J. Neveu and J. Pitman, “The Branching Process in a Brownian Excursion,” in Séminaire de Probabilités XXIII, vol. 1372 of Lecture Notes in Math., pp. 248-257. Springer, 1989. Math. Review.
[1] K. Burdzy, J. Pitman, and M. Yor, “Brownian crossings between spheres,” J. of Mathematical Analysis and Applications 148, No. 1 (1990) 101-120, Math. Review.
[2] D. Freedman and J. Pitman, “A singular measure which is locally uniform,” Proc. Amer. Math. Soc. 108 (1990) 371-381, Math. Review.
[1] J. Pitman and M. Yor, “Arcsine laws and interval partitions derived from a stable subordinator,” Proc. London Math. Soc. (3) 65 (1992) 326-356, Math. Review.
[2] M. Perman, J. Pitman, and M. Yor, “Size-biased Sampling of Poisson Point Processes and Excursions,” Probab. Th. Rel. Fields 92 (1992) 21-39, Math. Review.
[3] S. Kozlov, J. Pitman, and M. Yor, “Brownian interpretations of an elliptic integral,” in Seminar on Stochastic Processes, 1991, pp. 83-95. Birkhäuser, Boston, 1992. Math. Review.
[4] P. Diaconis, J. Fill, and J. Pitman, “Analysis of top in at random shuffles,” Combinatorics, Probability and Computing 1 (1992) 135-155, Math. Review.
[5] S. Kozlov, J. Pitman, and M. Yor, “Wiener football,” Theory Prob. Appl. 37 (1992) 550-553.
[6] J. Pitman, “The two-parameter generalization of Ewens’ random partition structure,” Tech. Rep. 345, Dept. Statistics, U.C. Berkeley, 1992.
[1] S. Evans and J. Pitman, “Does every Borel function have a somewhere continuous modification?,” Real Analysis Exchange 18(1) (1993) 276-280, Math. Review.
[2] J. Pitman and M. Yor, “Dilatations d’espace-temps, réarrangements des trajectoires browniennes, et quelques extensions d’une identité de Knight,” C.R. Acad. Sci. Paris t. 316, Série I (1993) 723-726, Math. Review.
[3] P. Fitzsimmons, J. Pitman, and M. Yor, “Markovian bridges: construction, Palm interpretation, and splicing,” in Seminar on Stochastic Processes, 1992, E. Çinlar, K. Chung, and M. Sharpe, eds., pp. 101-134. Birkhäuser, Boston, 1993. Math. Review.
[4] M. Klass and J. Pitman, “Limit laws for Brownian motion conditioned to reach a high level,” Statistics and Probability Letters 17 (1993) 13-17, Math. Review.
[5] J. Pitman, Probability. Springer-Verlag, New York, 1993.
[1] J. Bertoin and J. Pitman, “Path transformations connecting Brownian bridge, excursion and meander,” Bull. Sci. Math. (2) 118 (1994) 147-166, Math. Review.
[2] D. Aldous and J. Pitman, “Brownian bridge asymptotics for random mappings,” Random Structures and Algorithms 5 (1994) 487-512, Math. Review.
[1] J. Pitman, “Exchangeable and partially exchangeable random partitions,” Probab. Th. Rel. Fields 102 (1995) 145-158, Math. Review.
[2] P. Diaconis, M. McGrath, and J. Pitman, “Riffle shuffles, cycles and descents,” Combinatorica 15 (1995) 11-29, Math. Review.
[3] S. Asmussen, P. Glynn, and J. Pitman, “Discretization error in simulation of one-dimensional reflecting Brownian motion,” Ann. Applied Prob. 5 (1995) 875-896, Math. Review.
[1] J. Pitman and M. Yor, “Quelques identités en loi pour les processus de Bessel,” in Hommage à P.A. Meyer et J. Neveu, Astérisque, pp. 249-276. Soc. Math. de France, 1996. Math. Review.
[2] J. Pitman, “Random discrete distributions invariant under size-biased permutation,” Adv. Appl. Prob. 28 (1996) 525-539, Preprint [.ps.Z], Math. Review.
[3] J. Pitman and M. Yor, “Decomposition at the maximum for excursions and bridges of one-dimensional diffusions,” in Itô’s Stochastic Calculus and Probability Theory, N. Ikeda, S. Watanabe, M. Fukushima, and H. Kunita, eds., pp. 293-310. Springer-Verlag, 1996. Math. Review.
[4] J. Pitman, “Cyclically stationary Brownian local time processes,” Probab. Th. Rel. Fields 106 (1996) 299-329, Article [.ps.Z], SpringerLink, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[5] J. Pitman and M. Yor, “Random discrete distributions derived from self-similar random sets,” Electron. J. Probab. 1 (1996) Paper 4, 1-28, Article.
[6] J. Pitman, “Some developments of the Blackwell-MacQueen urn scheme,” in Statistics, Probability and Game Theory; Papers in honor of David Blackwell, T. F. et al., ed., vol. 30 of Lecture Notes-Monograph Series, pp. 245-267. Institute of Mathematical Statistics, Hayward, California, 1996. Preprint [.ps.Z], Math. Review.
[1] J. Pitman, “Partition structures derived from Brownian motion and stable subordinators,” Bernoulli 3 (1997) 79-96, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[2] S. Evans and J. Pitman, “Stopped Markov chains with stationary occupation times,” Probab. Th. Rel. Fields 109 (1997) 425-433, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[3] H. Dette, J. Fill, J. Pitman, and W. Studden, “Wall and Siegmund duality relations for birth and death chains with reflecting barrier,” Journal of Theoretical Probability 10 (1997) 349-374, Preprint [.ps.Z], Math. Review.
[4] J. Pitman and M. Yor, “The two-parameter Poisson-Dirichlet distribution derived from a stable subordinator,” Ann. Probab. 25 (1997) 855-900, Article [.pdf], Project Euclid, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[5] R. Sheth and J. Pitman, “Coagulation and branching process models of gravitational clustering,” Mon. Not. R. Astron. Soc. 289 (1997) 66-80, Preprint [.ps.Z].
[6] J. Pitman, “Some probabilistic aspects of set partitions,” Amer. Math. Monthly 104 (1997) 201-209, Article [.pdf], Abstract[.txt], Preprint [.ps.Z], Math. Review.
[7] J. Pitman, “Probabilistic bounds on the coefficients of polynomials with only real zeros,” J. Comb. Theory A. 77 (1997) 279-303, Article [.pdf], ScienceDirect, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[8] J. Pitman and M. Yor, “On the relative lengths of excursions derived from a stable subordinator,” in Séminaire de Probabilités XXXI, vol. 1655 of Lecture Notes in Math., pp. 287-305. Springer, 1997. Abstract[.txt], Preprint [.ps.Z], Math. Review.
[9] J. Pitman and M. Yor, “On the lengths of excursions of some Markov processes,” in Séminaire de Probabilités XXXI, vol. 1655 of Lecture Notes in Math., pp. 272-286. Springer, 1997. Abstract[.txt], Preprint [.ps.Z], Math. Review.
[10] M. Jeanblanc, J. Pitman, and M. Yor, “The Feynman-Kac formula and decomposition of Brownian paths,” Comput. Appl. Math. 16 (1997) 27-52, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[1] S. Evans and J. Pitman, “Construction of Markovian coalescents,” Ann. Inst. Henri Poincaré 34 (1998) 339-383, Article [.pdf], ScienceDirect, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[2] D. Aldous and J. Pitman, “Tree-valued Markov chains derived from Galton-Watson processes,” Ann. Inst. Henri Poincaré 34 (1998) 637-686, Article [.pdf], ScienceDirect, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[3] J. Pitman, “Enumerations of trees and forests Related to branching processes and random walks,” in Microsurveys in Discrete Probability, D. Aldous and J. Propp, eds., no. 41 in DIMACS Ser. Discrete Math. Theoret. Comp. Sci, pp. 163-180. Amer. Math. Soc., Providence RI, 1998. Abstract[.txt], Preprint [.ps.Z], Math. Review.
[4] D. Aldous and J. Pitman, “The standard additive coalescent,” Ann. Probab. 26 (1998) 1703-1726, Article [.pdf], Project Euclid, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[5] J. Pitman and M. Yor, “Random Brownian scaling identities and splicing of Bessel processes,” Ann. Probab. 26 (1998) 1683-1702, Article [.pdf], Project Euclid, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[6] J. Pitman and M. Yor, “Ranked functionals of Brownian excursions,” C.R. Acad. Sci. Paris t. 326, Série I (1998) 93-97, Article [.pdf], ScienceDirect, Math. Review.
[1] P. J. Fitzsimmons and J. Pitman, “Kac’s moment formula and the Feynman-Kac formula for additive functionals of a Markov process,” Stochastic Process. Appl. 79 (1999) 117-134, Preprint [.ps.Z], Article [.pdf], ScienceDirect, Math. Review.
[2] J. Pitman, “Coalescent random forests,” J. Comb. Theory A. 85 (1999) 165-193, Article [.pdf], ScienceDirect, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[3] J. Pitman and M. Yor, “Laplace Transforms related to excursions of a one-dimensional diffusion,” Bernoulli 5 (1999) 249-255, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[4] J. Pitman, “The SDE solved by local times of a Brownian excursion or bridge derived from the height profile of a random tree or forest,” Ann. Probab. 27 (1999) 261-283, Article [.pdf], Project Euclid, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[5] D. Aldous and J. Pitman, “A family of random trees with random edge lengths,” Random Structures and Algorithms 15 (1999) 176-195, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[6] J. Pitman and M. Yor, “The law of the maximum of a Bessel bridge,” Electron. J. Probab. 4 (1999) Paper 15, 1-35, Article, Math. Review.
[7] J. Pitman, “Coalescents with multiple collisions,” Ann. Probab. 27 (1999) 1870-1902, Article [.pdf], Project Euclid, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[8] P. Carmona, F. Petit, J. Pitman, and M. Yor, “On the laws of homogeneous functionals of the Brownian bridge,” Studia Sci. Math. Hungar. 35 (1999) 445-455, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[9] J. Pitman and M. Yor, “Path decompositions of a Brownian bridge related to the ratio of its maximum and amplitude,” Studia Sci. Math. Hungar. 35 (1999), no. 520, 457-474, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[10] J. Pitman, “The distribution of local times of Brownian bridge,” in Séminaire de Probabilités XXXIII, vol. 1709 of Lecture Notes in Math., pp. 388-394. Springer, 1999. Abstract[.txt], Preprint [.ps.Z], Math. Review.
[11] J. Pitman and M. Yor, “Some properties of the arc sine law related to its invariance under a family of rational maps,” Tech. Rep. 558, Dept. Statistics, U.C. Berkeley, 1999. Abstract[.txt], Preprint [.ps.Z].
[12] J. Pitman, “Brownian motion, bridge, excursion and meander characterized by sampling at independent uniform times,” Electron. J. Probab. 4 (1999) Paper 11, 1-33, Article, Math. Review.
[13] J. Pitman, “A lattice path model for the Bessel polynomials,” Tech. Rep. 551, Dept. Statistics, U.C. Berkeley, 1999. Abstract[.txt], Preprint [.ps.Z].
[14] J. Bertoin, J. Pitman, and J. R. de Chavez, “Constructions of a Brownian path with a given minimum,” Electronic Comm. Probab. 4 (1999) Paper 5, 1-7, Article, Math. Review.
[1] D. Aldous and J. Pitman, “Inhomogeneous continuum random trees and the entrance boundary of the additive coalescent,” Probab. Th. Rel. Fields 118 (2000) 455-482, Article [.pdf], SpringerLink, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[2] M. Camarri and J. Pitman, “Limit distributions and random trees derived from the birthday problem with unequal probabilities,” Electron. J. Probab. 5 (2000) Paper 2, 1-18, Article, Math. Review.
[3] B. Hansen and J. Pitman, “Prediction rules and exchangeable sequences related to species sampling,” Stat. and Prob. Letters 46 (2000) 251-256, Article [.pdf], ScienceDirect, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[4] J. Bertoin and J. Pitman, “Two coalescents derived from the ranges of stable subordinators,” Electron. J. Probab. 5 (2000) no. 7, 17 pp., Article, Math. Review.
[5] M. E. H. Ismail and J. Pitman, “Algebraic evaluations of some Euler integrals, duplication formulae for Appell’s hypergeometric function F1, and Brownian variations,” Canad. J. Math. 52 (2000) 961-981, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[6] J. Pitman and M. Yor, “Infinitely divisible laws associated with hyperbolic functions,” Tech. Rep. 581, Dept. Statistics, U.C. Berkeley, 2000. To appear in Canadian Journal of Mathematics, Abstract[.txt], Preprint [.ps.Z].
[1] R. Pemantle, Y. Peres, J. Pitman, and M. Yor, “Where did the Brownian particle go?,” Electron. J. Probab. 6 (2001) Paper 10, 1-22, Article, Math. Review.
[2] J. Bennies and J. Pitman, “Asymptotics of the Hurwitz binomial distribution related to mixed Poisson Galton-Watson trees,” Combinatorics, Probability and Computing 10 (2001) 203-211, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[3] J. Pitman and M. Yor, “On the distribution of ranked heights of excursions of a Brownian bridge,” Ann. Probab. 29 (2001) 361-384, Article [.pdf], Project Euclid, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[4] P. Biane, J. Pitman, and M. Yor, “Probability laws related to the Jacobi theta and Riemann zeta functions, and Brownian excursions,” Bull. Amer. Math. Soc. 38 (2001) 435-465, Article, Math. Review.
[1] J. Pitman, “Forest volume decompositions and Abel-Cayley-Hurwitz multinomial expansions,” J. Comb. Theory A. 98 (2002) 175-191, Article [.pdf], ScienceDirect, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[2] J. Pitman, “Poisson-Dirichlet and GEM invariant distributions for split-and-merge transformations of an interval partition,” Combinatorics, Probability and Computing 11 (2002) 501-514, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[3] J. Pitman and R. Stanley, “A polytope related to empirical distributions, plane trees, parking functions and the associahedron,” Discrete and Computational Geometry 27 (2002) 603-634, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[4] D. Aldous and J. Pitman, “Invariance principles for non-uniform random mappings and trees,” in Asymptotic Combinatorics with Aplications in Mathematical Physics, V. Malyshev and A. M. Vershik, eds., pp. 113-147. Kluwer Academic Publishers, 2002. Abstract[.txt], Preprint [.ps.Z].
[5] D. Aldous and J. Pitman, “Two recursive decompositions of Brownian bridge related to the asymptotics of random mappings,” Tech. Rep. 595, Dept. Statistics, U.C. Berkeley, 2002. Abstract[.txt], Preprint [.ps.Z].
[6] D. Aldous and J. Pitman, “The asymptotic distribution of the diameter of a random mapping,” C.R. Acad. Sci. Paris, Ser. I 334 (2002) 1021-1024, Article [.pdf], ScienceDirect, Abstract[.txt], Preprint [.ps.Z], Math. Review.
[7] D. Aldous, G. Miermont, and J. Pitman, “Brownian bridge asymptotics for random p-mappings,” Tech. Rep. 624, Dept. Statistics, U.C. Berkeley, 2002. Abstract[.txt], Preprint [.ps.Z].
[8] J. Pitman, “Combinatorial Stochastic Processes,” Tech. Rep. 621, Dept. Statistics, U.C. Berkeley, 2002. Lecture notes for St. Flour course, July 2002. Corrections to version of July 1,2002, Abstract[.txt], Preprint [.ps.Z].
[9] J. Pitman, “The Mathematics Survey Proposal.” Submitted to Notices AMS, 2002. Article.
[10] J. Pitman, “Two rules of scholarly communication: publish for the public, and keep the journals.” Submitted to Notices AMS, 2002. Article.
[11] J. Pitman, “The digital revolution in scholarly communication.” 2002. Article.
[1] J. Pitman and M. Yor, “Hitting, occupation, and inverse local times of one-dimensional diffusions: martingale and excursion approaches,” Bernoulli 9 (2003) 1-24, Abstract[.txt], Preprint [.ps.Z].
[2] J. Pitman, “Poisson-Kingman partitions,” in Science and Statistics: A Festschrift for Terry Speed, D. R. Goldstein, ed., vol. 30 of Lecture Notes-Monograph Series, pp. 1-34. Institute of Mathematical Statistics, Hayward, California, 2003. Article, Abstract[.txt], Preprint [.ps.Z].
[3] J. Pitman, “The future of IMS journals,” IMS Bulletin 32 (2003) Issue 1, p. 1, Article.