1) spaces of(*) martingale
(*)鞅空间
2) Lipschitz martingale space
Lipschitz鞅空间
3) martingale space
鞅空间
1.
Atomic decompositions and density of finite martingales in martingale spaces
(*)鞅空间
2.
M and itsequivalentdefinition M , and its relevantproperties,furthermore elucidates its connections with othermartingale spaces.
(*)鞅空间
3.
According to the martingale inequalities and the inter-imbedding relationship in martingale spaces,we describe the boundedness of the paraproduct martingale operator on Banach-space-valued martingale spaces and give the relations between the boundedness and the geometrical properties of the Banach space.
(*)鞅空间
4) quasimartingale space
拟鞅空间
1.
As a result,some quasimartingale inequalities are obtained,which are applied to investigate the relation between some B-valued quasimartingale spaces.
(*)鞅空间
5) αK Φ martingale space
αKΦ鞅空间
6) martingale Hardy space
鞅Hardy空间
1.
In this paper, the so-called subregularity condition is introduced under which the equivalence relations of martingale Hardy spaces H * p,H S p and H s p and some inequalities of martingale transforms are proved for 0<p≤1.
(*)鞅空间
补充资料:鞅
| 鞅 martingale 一类特殊的随机过程。起源于对公平赌博过程的数学描述 。鞅为满足如下条件的随机过程:在已知过程在时刻s之前的变化规律的条件下 ,过程在将来某一时刻t的期望值等于过程在时刻s的值。例如 ,用Z(t)表示某一赌徒在公平赌博中t时刻所拥有的本金 ,那么Z={Z(t),t>0}为鞅,也就是说无论该赌徒在s时刻以后的赌博中如何利用他在s时刻之前所取得的经验 ,他所能期望在将来t时刻拥有的本金只能是Z(s),这正是“公平性”的体现。P.莱维早在1935年就发表了一些孕育着鞅论的工作。1939年,莱维首次采用了鞅这个名称。但对鞅系统地进行研究并使它成为随机过程的一个重要分支的,则应归功于J.L.杜布。鞅已成为研究随机过程的一个有力工具。 |
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条