Асосий контентга ўтиш
AkademIndex

Маҳсулотлар

Ишлаб чиқувчилар учун

AkademBaseЭкотизим учун очиқ API
Мақола

Best Constants in Moment Inequalities for Linear Combinations of Independent and Exchangeable Random Variables

1985en
ABI

Аннотация

In [4] Rosenthal proved the following generalization of Khintchine's inequality: \begin{equation*} \tag{B} \begin{cases} \max \{ \| \sigma^n_{i=1} X_i \|_2, (\sigma^n_{i=1} \| X_i \|^p_p)^{1/p}\} \\ \leq \| \sigma^n_{i=1} X_i \|_p \leq B_p\max \{ \| \sigma^n_{i=1} X_i \|_2, (\sigma^n_{i-i} \| X_i \|^p_p)^{1/p}\} \\ \text{for all independent symmetric random variables} X_1, X_2,\cdots, \text{with finite} pth \text{moment}, 2 < p < \infty.\end{cases}\end{equation*} Rosenthal's proof of (B) as well as later proofs of more general results by Burkholder [1] yielded only exponential of $p$ estimates for the growth rate of $B_p$ as $p \rightarrow \infty$. The main result of this paper is that the actual growth rate of $B_p$ as $p \rightarrow \infty$ is $p/\operatorname{Log} p$, as compared with a growth rate of $\sqrt p$ in Khintchine's inequality.

Ҳали таржима қилинмаган

Идентификаторлар

Иқтибослар ва манбалар

5 та иқтибос0 та фойдаланилган манба