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1 results

  • A central limit theorem for empirical processes

  • Part of
  • David Pollard
  • Journal:
    Journal of the Australian Mathematical Society. Series A. Pure Mathematics and Statistics / Volume 33 / Issue 2 / October 1982
    Published online by Cambridge University Press:
    09 April 2009, pp. 235-248
    Print publication:
    October 1982
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  • The empirical measure Pn for independent sampling on a distribution P is formed by placing mass n−1 at each of the first n sample points. In this paper, n½(PnP) is regarded as a stochastic process indexed by a family of square integrable functions. A functional central limit theorem is proved for this process. The statement of this theorem involves a new form of combinatorial entropy, definable for classes of square integrable functions.