DIFFERENTIAL SUBORDINATION UNDER CHANGE OF LAW
成果类型:
Article
署名作者:
Domelevo, Komla; Petermichl, Stefanie
署名单位:
Universite de Toulouse; Universite Toulouse III - Paul Sabatier
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
DOI:
10.1214/18-AOP1274
发表日期:
2019
页码:
896-925
关键词:
l-p-bounds
sharp inequalities
hilbert transform
bellman functions
beurling-ahlfors
riesz transforms
NORM
martingales
摘要:
We prove optimal L-2 bounds for a pair of Hilbert space valued differentially subordinate martingales under a change of law. The change of law is given by a process called a weight and sharpness, and in this context refers to the optimal growth with respect to the characteristic of the weight. The pair of martingales is adapted, uniformly integrable and cadlag. Differential subordination is in the sense of Burkholder, defined through the use of the square bracket. In the scalar dyadic setting with underlying Lebesgue measure, this was proved by Wittwer [Math. Res. Lett. 7 (2000) 1-12], where homogeneity was heavily used. Recent progress by Thiele-Treil-Volberg [Adv. Math. 285 (2015) 1155-1188] and Lacey [Israel J. Math. 217 (2017) 181-195] independently resolved the so-called nonhomogenous case using discrete in time filtrations, where one martingale is a predictable multiplier of the other. The general case for continuous-in-time filtrations and pairs of martingales that are not necessarily predictable multipliers, remained open and is addressed here. As a very useful second main result, we give the explicit expression of a Bellman function of four variables for the weighted estimate of subordinate martingales with jumps. This construction includes an analysis of the regularity of this function as well as a very precise convexity, needed to deal with the jump part.
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