This is a preview of subscription content, log in via an institution to check access.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
Preview
Unable to display preview. Download preview PDF.
References
P.L. Chow. Stochastic partial differential equations in turbulence related problems, in "Probabilistic Analysis and Related Topics", Vol. 1, Academic Press, 1978.
C. Cutler. Some topological and measure-theoretic results for measure-valued and set-valued stochastic processes, Ph.D. thesis, Carleton University, Ottawa, 1984.
D.A. Dawson. Stochastic evolution equations and related measure processes, J. Mult. Anal. 5 (1975), 1–52.
D.A. Dawson. Geostochastic calculus, Canad. J. of Stat. 6 (1978), 143–168.
D.A. Dawson. Limit theorems for interaction free geostochastic systems, Coll. Math. Soc. J. Bolyai 24 (1978), 27–47.
D.A. Dawson and K.J. Hochberg. The carrying dimension of a stochastic measure diffusion, Ann. Prob. 7, 693–703.
D.A. Dawson and H. Salehi. Spatially homogeneous random evolutions, J. Mult. Anal. 10(1980), 141–180.
D.A. Dawson and T.G. Kurtz. Application of duality to measurevalued processes, Lecture Notes in Control and Information Sci. 42 (1982), ed. W. Fleming and L.G. Gorostiza, Springer-Verlag, 91–105.
D.A. Dawson and K.J. Hochberg. Wandering random measures in the Fleming Viot model, Ann. Prob. 10(1982), 554–580.
D.A. Dawson and G.C. Papanicolaou, A random wave process, J. Appl. Math. Opt., 1984.
D.A. Dawson. Asymptotic analysis of multilevel stochastic systems, Tech. Rep. 30 (1984), Laboratory for Research in Statistics and Probability, Ottawa.
D.A. Dawson and K.J. Hochberg. Qualitative behavior of a selectively neutral allelic model, Theor. Pop. Biol. 23 (1983), 1–18.
N. El Karoui. Non-linear evolution equations and functionals of measure-valued branching processes, preprint, 1984.
S.N. Ethier and T.G. Kurtz. The infinitely-many-neutral-alleles diffusion model, Adv. Appl. Prob. 13 (1981), 429–452.
S.N. Ethier and T.G. Kurtz. Markov processes: characterization and convergence, Wiley, 1984.
W. Feller. Diffusion processes in genetics. Proc. Second Berkeley Symp., Univ. of Calif. Press (1951), 22772-246.
K. Fleischmann and J. Gärtner. Occupation time processes at a critical point, preprint, 1984.
W.H. Fleming and M. Viot. Some measure-valued Markov processes in population genetics theory, Indiana Univ. Math. J. 28 (1979), 817–843.
L.G. Gorostiza. High density limit theorems for infinite systems of unscaled branching Brownian motions, Ann. Prob. 11 (1983), 374–392.
R.A. Holley and D.W. Stroock. Generalized Ornstein-Uhlenbeck processes and infinite particle branching Brownian motions, Publ. R.I.M.S., Kyoto Univ. 14 (1978), 741–788.
J. Horowitz. Measure-valued random processes, preprint, 1984.
I. Iscoe. The man-hour process associated with measure-valued branching random motions in Rd, Ph.D. thesis, Carleton University, Ottawa, 1980.
I. Iscoe. Personal communication, 1982.
I. Iscoe. A weighted occupation time for a class of measure-valued branching processes, Carleton U. — U. Ottawa Res. Lab. Prob. Stat. Tech. Rep. 27 (1983).
N.V. Krylov and B.L. Rozovskii. Stochastic evolution equations, J. Soviet Math. (Itogi Nauki i Techniki 14 (1981)), 1233–1277.
T.G. Kurtz. Approximation of population processes, S.I.A.M. (1981).
B. Mandelbrot. Fractals: form, chance and dimension, Freeman, San Francisco, 1977.
G. Matheron. Random sets and integral geometry, John Wiley, New York, 1975.
S. Mizuno. On some infinite dimensional martingale problems and related stochastic evolution equations, Ph.D. thesis, Carleton University, Ottawa, 1978.
E. Pardoux. Stochastic partial differential equations and filtering of diffusion processes, Stochastics 3 (1979), 127–167.
S. Roelly-Coppoleta. Processus de diffusion a valeurs mesures multiplicatifs, Thèse de 3e cycle, Univ. Paris 6, 1984.
S. Sawyer and J. Fleischman. The maximum geographical range of a mutant allele considered as a subtype of a Brownian branching random field, Proc. N.A.S., U.S.A. 76 (1978), 872–875.
A. Shimizu. Construction of a solution of a certain evolution equation I, Nagoya Math. J. 66(1977) 23–36; II 71(1978) 181–198.
D.W. Stroock and S.R.S. Varadhan. Multidimensional diffusion processes, Springer-Verlag, New York, 1979.
T. Shiga. Wandering phenomena in infinite allelic diffusion models, Adv. Appl. Prob. 14 (1982), 457–483.
M. Viot. Methodes de compacité et de monotonie compacité pour les equations aux dérivees partielles stochastiques, Thèse, Univ. de Paris, 1975.
D. Yonglong. On absolute continuity and singularity of random measures, Chinese Annals of Math. 3 (1982), 241–248.
U. Zähle. Random fractals generated by random cutouts, preprint, Friedrich-Schiller Univ., Jena, 1982.
Author information
Authors and Affiliations
Editor information
Rights and permissions
Copyright information
© 1986 Springer-Verlag
About this paper
Cite this paper
Dawson, D. (1986). Measure-valued processes Construction, qualitative behavior and stochastic geometry. In: Tautu, P. (eds) Stochastic Spatial Processes. Lecture Notes in Mathematics, vol 1212. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0076239
Download citation
DOI: https://doi.org/10.1007/BFb0076239
Published:
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-540-16803-4
Online ISBN: 978-3-540-47053-3
eBook Packages: Springer Book Archive