Difference between revisions of "Zone of normal attraction"

A domain of the form $ 0 \leq x \leq \psi ( n) $ for which

$$ \frac{ {\mathsf P} \{ Z _ {n} \geq x \} }{ {\mathsf P} \{ Y \geq x \} } \rightarrow 1 \ \textrm{ or } \ \ \frac{ {\mathsf P} \{ Z _ {n} \leq - x \} }{ {\mathsf P} \{ Y \leq - x \} } \rightarrow 1 $$

as $ n \rightarrow \infty $, where $ \{ \psi ( n) \} \uparrow \infty $, $ \{ Z _ {n} \} $ is a sequence of random variables and $ Y $ is a random variable with a normal distribution. Zones of normal attraction have been studied for the case

$$ Z _ {n} = \frac{1}{\sigma \sqrt n } \sum_{j=1} ^ { n } ( X _ {j} - a ) , $$

where $ \{ X _ {n} \} $ is a sequence of independent, identically-distributed random variables with mathematical expectation $ a $ and finite positive variance $ \sigma ^ {2} $.

References

Comments

A rather general formulation of the problems of large deviations is as follows, [a3]. Suppose that for a family of stochastic processes $ \xi ^ {a} ( t) $ a result of the law-of-large-numbers type holds (cf. Law of large numbers), $ \xi ^ {a} \rightarrow x $ as $ a \rightarrow \infty $. Problems on large deviations of the process $ \xi ^ {a} ( t) $ from its most probable path $ x( t) $ for large values of $ a $ are concerned with the limiting behaviour as $ a \rightarrow \infty $ of the infinitesimal probabilities $ p ^ {a} ( \xi ^ {a} \in A ) $ for measurable sets $ A $ that are at a positive distance from the non-random limiting function $ x $( in a suitable function space (space of paths)). Problems concerning the asymptotics as $ a \rightarrow \infty $ of expectations of the form $ {\mathsf E} ^ {a} [ f ^ { a } ( \xi ^ {a} )] $ also form part of large deviation theory if the main part of these expectations for large values of $ a $ comes from the low probability values of $ \xi ^ {a} $.

References