TY - JOUR
T1 - Hölder regularity and gradient estimates for sdes driven by cylindrical α-stable processes*
AU - Chen, Zhen Qing
AU - Hao, Zimo
AU - Zhang, Xicheng
N1 - Publisher Copyright:
© 2020, Institute of Mathematical Statistics. All rights reserved.
PY - 2020
Y1 - 2020
N2 - We establish Hölder regularity and gradient estimates for the transition semigroup of the solutions to the following SDE: dXt = σ(t, Xt−)dZt + b(t, Xt)dt, X0 = x ∈ Rd, where (Zt)t≥0 is a d-dimensional cylindrical α-stable process with α ∈ (0, 2), σ(t, x): R+ × Rd → Rd ⊗ Rd is bounded measurable, uniformly nondegenerate and Lipschitz continuous in x uniformly in t, and b(t, x): R+ × Rd → Rd is bounded β-Hölder continuous in x uniformly in t with β ∈ [0, 1] satisfying α + β > 1. Moreover, we also show the existence and regularity of the distributional density of X(t, x). Our proof is based on Littlewood-Paley’s theory.
AB - We establish Hölder regularity and gradient estimates for the transition semigroup of the solutions to the following SDE: dXt = σ(t, Xt−)dZt + b(t, Xt)dt, X0 = x ∈ Rd, where (Zt)t≥0 is a d-dimensional cylindrical α-stable process with α ∈ (0, 2), σ(t, x): R+ × Rd → Rd ⊗ Rd is bounded measurable, uniformly nondegenerate and Lipschitz continuous in x uniformly in t, and b(t, x): R+ × Rd → Rd is bounded β-Hölder continuous in x uniformly in t with β ∈ [0, 1] satisfying α + β > 1. Moreover, we also show the existence and regularity of the distributional density of X(t, x). Our proof is based on Littlewood-Paley’s theory.
KW - Cylindrical Lévy process
KW - Gradient estimate
KW - Heat kernel
KW - Hölder regularity
KW - Littlewood-Paley’s decomposition
UR - http://www.scopus.com/inward/record.url?scp=85097824810&partnerID=8YFLogxK
U2 - 10.1214/20-EJP542
DO - 10.1214/20-EJP542
M3 - Article
AN - SCOPUS:85097824810
SN - 1083-6489
VL - 25
SP - 1
EP - 23
JO - Electronic Journal of Probability
JF - Electronic Journal of Probability
M1 - 137
ER -