A Cyclically Catalytic Super-Brownian Motion
Klaus Fleischmann and Jie Xiong
Source: Ann. Probab. Volume 29, Number 2
(2001), 820-861.
First Page:
Show
Hide
Keywords: Catalyst; reactant; superprocess; duality; martingale problem; cyclic reaction; global segregation of neighboring types; finite time survival; extinction; strong Markov selection; stochastic equation
Full-text: Open access
Links and Identifiers
Permanent link to this document: http://projecteuclid.org/euclid.aop/1008956694
Digital Object Identifier: doi:10.1214/aop/1008956694
Mathematical Reviews number (MathSciNet): MR1849179
Zentralblatt MATH identifier: 1017.60099
References
[1] Boerlijst, M. C. and Hogeweg P. (1995). Spatial gradients enhance persistence of hypercycles. Phys. D 88 29-39.
Zentralblatt MATH: 0888.35014
[2] Bramson, M. and Griffeath, D. (1989). Flux and fixation in cyclic particle systems. Ann. Probab. 17 26-45.
Mathematical Reviews (MathSciNet): MR89k:60154
Zentralblatt MATH: 0673.60103
Digital Object Identifier: doi:10.1214/aop/1176991492
Project Euclid: euclid.aop/1176991492
[3] Cox, J. T., Dawson, D. A., Klenke, A. and Perkins, E. A. (2000). On the growth of one-type blocks in the mutually catalytic branching model on Zd. Unpublished manuscript.
[4] Cox, J. T. and Klenke, A. (2000). Recurrence and ergodicity of interacting particle systems. Probab. Theory Related Fields 116 239-255.
Zentralblatt MATH: 0954.60095
Mathematical Reviews (MathSciNet): MR1743771
Digital Object Identifier: doi:10.1007/PL00008728
[5] Cox, J. T., Klenke, A. and Perkins, E. A. (2000). Convergence to equilibrium and linear systems duality. In Stochastic Models (L. G. Gorostiza and B. G. Ivanoff, eds.) 41-66. Amer. Math. Soc., Providence, RI.
Mathematical Reviews (MathSciNet): MR1765002
Zentralblatt MATH: 0955.60098
[6] Dawson, D. A., Etheridge, A. M., Fleischmann, K., Mytnik, L., Perkins, E. A. and Xiong,
J. (2000). Mutually catalytic branching in the plane: finite measure states. Preprint 615, WIAS Berlin.
[7] Dawson, D. A., Etheridge, A. M., Fleischmann, K., Mytnik, L., Perkins, E. A. and
Xiong, J. (2001). Mutually catalytic branching in the plane: infinite measure states. WIAS Berlin, Preprint 633.
[8] Dawson, D. A. and Fleischmann, K. (2000). In Infinite Dimensional Stochastic Analysis 145-170. Royal Netherlands Academy of Arts and Sciences, Amsterdam.
Mathematical Reviews (MathSciNet): MR1831416
[9] Dawson, D. A. and Fleischmann, K. (2000). Catalytic and mutually catalytic superBrownian motions. WIAS Berlin, Preprint 546.
Mathematical Reviews (MathSciNet): MR1831416
[10] Dawson, D. A., Fleischmann, K., Mytnik, L., Perkins, E. A. and Xiong, J. (2001). Mutually catalytic branching in the plane: uniqueness. Preprint 641, WIAS Berlin.
Mathematical Reviews (MathSciNet): MR1959845
Zentralblatt MATH: 1016.60091
Digital Object Identifier: doi:10.1016/S0246-0203(02)00006-7
[11] Dawson, D. A. and Perkins, E. A. (1998). Long-time behavior and coexistence in a mutually catalytic branching model. Ann. Probab. 26 1088-1138.
Mathematical Reviews (MathSciNet): MR99f:60167
Zentralblatt MATH: 0938.60042
Digital Object Identifier: doi:10.1214/aop/1022855746
Project Euclid: euclid.aop/1022855746
[12] Durrett, R. (1995). Ten lectures on particle sytems. Lecture Notes in Math. 1608 97-201. Springer, Berlin.
Mathematical Reviews (MathSciNet): MR1383122
Zentralblatt MATH: 0840.60088
[13] Durrett, R. and Levin S. A. (1998). Spatial aspects of interspecific competition. Theoret. Population Biol. 53 30-43.
Zentralblatt MATH: 0908.92031
[14] Dynkin, E. B. (1994). An Introduction to Branching Measure-valued Processes. Amer. Math. Soc., Providence, RI.
Mathematical Reviews (MathSciNet): MR1280712
Zentralblatt MATH: 0824.60001
[15] Eithier, S. N. and Kurtz, T. G. (1986). Markov Process: Characterization and Convergence. Wiley, New York.
Mathematical Reviews (MathSciNet): MR838085
[16] Freund, J. and Schimansky-Geier, L. (1999). Diffusion in discrete ratchets. Phys. Rev. E 60 1304-1309.
[17] Gravner, J. and Griffeath, D. (1998). Cellular automaton growth on z2: theorems, examples, and problems. Adv. in Appl. Math. 21 241-304.
Mathematical Reviews (MathSciNet): MR99g:68141
Zentralblatt MATH: 0919.68090
Digital Object Identifier: doi:10.1006/aama.1998.0599
[18] Ikeda, N. and Watanabe, S. (1981). Stochastic Differential Equations and Diffusion Processes. North-Holland, Amsterdam.
Mathematical Reviews (MathSciNet): MR1011252
[19] Jacod, J. and Shiryaev, A. N. (1987). Limit Theorems for Stochastic Processes. Springer, Berlin.
Mathematical Reviews (MathSciNet): MR89k:60044
[20] Kallianpur, G. and Xiong, J. (1995). Stochastic Differential Equations in InfiniteDimensional Spaces. IMS, Hayward, CA.
Mathematical Reviews (MathSciNet): MR98h:60001
Zentralblatt MATH: 0859.60050
[21] Krylov, N. V. (1993). The selection of a Markov process from a Markov system of processes Izv. Akad. Nauk SSSR Ser. Mat. 37 691-708 (in Russian).
Mathematical Reviews (MathSciNet): MR339338
Digital Object Identifier: doi:10.1070/IM1973v007n03ABEH001971
[22] Merino, S. (1996). Cyclic competition of three species in the time periodic and diffusive case. J. Math. Biol. 34 789-809.
Mathematical Reviews (MathSciNet): MR97j:92010
Zentralblatt MATH: 0873.92024
[23] Mitoma, I. (1985). An -dimensional inhomogeneous Langevin equation. J. Funct. Anal. 61 342-359.
Mathematical Reviews (MathSciNet): MR87i:60066
Zentralblatt MATH: 0579.60053
Digital Object Identifier: doi:10.1016/0022-1236(85)90027-8
[24] Molina, A., Gonzalez, J. and Lopez-Tenes, M. (1998). Application of the superposition principle to the study of CEC, CE, EC and catalytic mechanisms in cyclic chronopotentiometry III. J. Math. Chem. 23 277-296.
Zentralblatt MATH: 0909.92038
[25] Mollison, D., ed. (1995). Epidemics Models: Their Structure and Relation to Data. Cambridge Univ. Press.
[26] Mueller, C. and Perkins, E. A. (2000). Extinction for two parabolic stochastic PDEs on the lattice. Ann. Inst. H. Poincar´e Probab. Statist., 36 301-338.
Mathematical Reviews (MathSciNet): MR2001i:60104
Zentralblatt MATH: 0966.60060
Digital Object Identifier: doi:10.1016/S0246-0203(00)00128-X
[27] Mytnik, L. (1998). Uniqueness for a mutually catalytic branching model. Probab. Theory Related Fields 112 245-253.
Mathematical Reviews (MathSciNet): MR99i:60125
Zentralblatt MATH: 0912.60076
Digital Object Identifier: doi:10.1007/s004400050189
[28] Revuz, D. and Yor, M. (1991). Continuous Martingales and Brownian Motion. Springer, Berlin.
Mathematical Reviews (MathSciNet): MR92d:60053
[29] Rogers, L. C. G. and Williams, D. (1987). Diffusions, Markov Processes, and Martingales 2. It o Calculus. Wiley, Chichester.
Mathematical Reviews (MathSciNet): MR921238
Zentralblatt MATH: 0977.60005
[30] Rujigrok, Th. and Rujigrok, M. (1997). A reaction-diffusion equation for a cyclic system with three components. J. Statist. Phys. 87 1145-1164.
Zentralblatt MATH: 0913.92033
Mathematical Reviews (MathSciNet): MR1470648
Digital Object Identifier: doi:10.1007/BF02181277
[31] Shiga, T. (1994). Two contrasting properties of solutions for one-dimensional stochastic partial differential equations. Canad. J. Math. 46 415-437.
Mathematical Reviews (MathSciNet): MR95h:60099
[32] Stroock, D. W. and Varadhan, S. R. S. (1979). Multidimensional Diffusion Processes. Springer, Berlin.
Mathematical Reviews (MathSciNet): MR81f:60108
[33] Swart, J. M. (1999). Clustering of linearly interacting diffusions and universality of their long-time distribution. Preprint, Kathol. Univ. Nijmegen. Available at http://www-math.sci.kun.nl/math/onderzoek/reports/reports nl.html.
URL: Link to item
[34] Tribe, R. (1995). Large time behavior of interface solutions to the heat equation with Fisher- Wright white noise. Probab. Theory Related Fields 102 289-311.
Mathematical Reviews (MathSciNet): MR97a:60085
Zentralblatt MATH: 0831.60071
Digital Object Identifier: doi:10.1007/BF01192463
[35] Walsh, J. B. (1986). An introduction to stochastic partial differential equations. ´Ecole d' ´Et´e de Probabilit´es de Saint-Flour XIV. Lecture Notes in Math. 1180 266-439. Springer, Berlin.
[36] Williams, D. (1991). Probability with Martingales. Cambridge Univ. Press.
Mathematical Reviews (MathSciNet): MR1155402
Zentralblatt MATH: 0722.60001
The Annals of Probability
