Asymptotic results for super-Brownian motions and semilinear differential equations
Author:
Tzong-Yow Lee
Journal:
Electron. Res. Announc. Amer. Math. Soc. 4 (1998), 56-62
MSC (1991):
Primary 60B12, 60F10; Secondary 60F05, 60J15
DOI:
https://doi.org/10.1090/S1079-6762-98-00048-1
Published electronically:
September 14, 1998
MathSciNet review:
1641127
Full-text PDF Free Access
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Abstract: Limit laws for three-dimensional super-Brownian motion are derived, conditioned on survival up to a large time. A large deviation principle is proved for the joint behavior of occupation times and their difference. These are done via analyzing the generating function and exploiting a connection between probability and differential/integral equations.
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- Bramson, M., Cox, J.T. and Griffeath, D. (1988) Occupation time large deviations of the voter model. Probab. Th. Rel. Fields 77, 401-413.
- Cox, J.T. and Griffeath, D. (1985) Occupation times for critical branching Brownian motions. Ann. Probab. 13, 1108-1132.
- Dawson, D. (1977) The critical measure diffusion process. Z. Wahrsch. Verw. Gebiete 40, 125-145.
- Dawson, D., and Gartner, J. (1987) Large deviations for McKean-Vlasov limit of weakly interacting diffusions. Stochastics, 20, 247-308.
- Deuschel, J.-D. and Rosen, J. (1998) Occupation time large deviations for critical branching Brownian motion, super-Brownian motion and related processes. Ann. Probab. 26, no. 2, 602-643.
- Dynkin, E. B. (1989) Superprocesses and their linear additive functionals. Trans. Amer. Math. Soc., 314, 255-282.
- Iscoe, I. (1986) A weighted occupation time for a class of measure-valued branching processes. Z. Wahr. verw. Gebiete. 71, 85-116.
- Iscoe, I. (1986) Ergodic theory and a local occupation time for measure-valued critical branching Brownian motion. Stochastics, 18, 197-243.
- Iscoe, I. and Lee, T.-Y. (1993) Large deviations for occupation times of measure-valued branching Brownian motions. Stochastics and Stochastic Reports, 45, 177-209.
- Lee, T.-Y. (1990) Some limit theorems for critical branching Bessel processes and related semilinear differential equations. Probab. Th. Rel. Fields, 84, 505-520.
- Lee, T.-Y. and Remillard, B. (1995) Large deviations for the three-dimensional super-Brownian motion. Ann. Probab. 23, 1755-1771.
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Additional Information
Tzong-Yow Lee
Affiliation:
University of Maryland, College Park, MD
Email:
tyl@math.umd.edu
Keywords:
Large deviations,
occupation time,
measure-valued process,
branching Brownian motion,
semilinear PDE,
asymptotics
Received by editor(s):
April 15, 1998
Published electronically:
September 14, 1998
Communicated by:
Mark Freidlin
Article copyright:
© Copyright 1998
American Mathematical Society
