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Integrability conditions for SDEs and semilinear SPDEs
- Source :
- Ann. Probab. 45, no. 5 (2017), 3223-3265
- Publication Year :
- 2017
-
Abstract
- By using the local dimension-free Harnack inequality established on incomplete Riemannian manifolds, integrability conditions on the coefficients are presented for SDEs to imply the nonexplosion of solutions as well as the existence, uniqueness and regularity estimates of invariant probability measures. These conditions include a class of drifts unbounded on compact domains such that the usual Lyapunov conditions cannot be verified. The main results are extended to second-order differential operators on Hilbert spaces and semilinear SPDEs.
- Subjects :
- Statistics and Probability
Lyapunov function
Pure mathematics
Class (set theory)
010102 general mathematics
Hilbert space
Differential operator
01 natural sciences
local Harnack inequality
SDE
010104 statistics & probability
symbols.namesake
invariant probability measure
60J45
symbols
60H15
Uniqueness
0101 mathematics
Statistics, Probability and Uncertainty
Invariant (mathematics)
Nonexplosion
Probability measure
Harnack's inequality
Mathematics
SPDE
Subjects
Details
- Language :
- English
- Database :
- OpenAIRE
- Journal :
- Ann. Probab. 45, no. 5 (2017), 3223-3265
- Accession number :
- edsair.doi.dedup.....a8b71f71fee63baa5f41895246b038fb