A NOTE ON THE ASYMPTOTIC NORMALITY OF SEQUENTIAL DENSITY ESTIMATORS
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概要
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Let $f_{n}(x)$ be the recursive kernel estimators of an unknown density function $f(x)$ at a given point $x$ . Also, let $N(t)(t>0)$ be a family of positive integer-valued random variables. We consider the sequential estimators $f_{N(t)}(x)$ . In this paper, under certain regularity conditions on $N(t)$ we shall show that $(N(t)h_{N(t)}^{p})^{1/2}(f_{N(i)}(x)-f(x))$ is asymptotically normally distributed as $t$ tends to infinity. Our conditions on $N(t)$ generalize those given by Carroll [2], Stute [9] and Isogai [6].
- Yokohama City Universityの論文
- 1992-00-00
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