Limit Theorems for Self-Normalized Large Deviation
| Dublin Core | PKP Metadata Items | Metadata for this Document | |
| 1. | Title | Title of document | Limit Theorems for Self-Normalized Large Deviation |
| 2. | Creator | Author's name, affiliation, country | Qiying Wang; University of Sydney |
| 3. | Subject | Discipline(s) | |
| 3. | Subject | Keyword(s) | Cram'er large deviation, limit theorem, |
| 3. | Subject | Subject classification | Primary 60F05, Secondary 62E20. |
| 4. | Description | Abstract | Let $X, X_1, X_2, \cdots $ be i.i.d. random variables with zero mean and finite variance $\sigma^2$. It is well known that a finite exponential moment assumption is necessary to study limit theorems for large deviation for the standardized partial sums. In this paper, limit theorems for large deviation for self-normalized sums are derived only under finite moment conditions. In particular, we show that, if $EX^4<\infty$, then $$\frac {P(S_n /V_n \geq x)}{1-\Phi(x)} = \exp\left\{ -\frac{x^3 EX^3}{3\sqrt{ n}\sigma^3} \right\} \left[ 1 + O\left(\frac{1+x}{\sqrt {n}}\right) \right], $$ for $x\ge 0$ and $x=O(n^{1/6})$, where $S_n=\sum_{i=1}^nX_i$ and $V_n= (\sum_{i=1}^n X_i^2)^{1/2}$. |
| 5. | Publisher | Organizing agency, location | |
| 6. | Contributor | Sponsor(s) | |
| 7. | Date | (YYYY-MM-DD) | 2005-11-14 |
| 8. | Type | Status & genre | Peer-reviewed Article |
| 8. | Type | Type | |
| 9. | Format | File format | |
| 10. | Identifier | Uniform Resource Identifier | http://ejp.ejpecp.org/article/view/289 |
| 10. | Identifier | Digital Object Identifier | 10.1214/EJP.v10-289 |
| 11. | Source | Journal/conference title; vol., no. (year) | Electronic Journal of Probability; Vol 10 |
| 12. | Language | English=en | |
| 14. | Coverage | Geo-spatial location, chronological period, research sample (gender, age, etc.) | |
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