Sequential Procedure of Testing Composite Hypotheses with Applications to the Kiefer–Weiss Problem

· 1991 · DOI 10.1137/1135036

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math.ST · 2026-05-29 · unverdicted · novelty 6.0

The nonparametric Kiefer-Weiss problem is solved by deriving an optimal stopping policy based on a two-dimensional statistic (likelihood ratio plus expected remaining sample size) whose randomization rule maps the likelihood ratio to an integer sample size.

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The Nonparametric Kiefer-Weiss Problem math.ST · 2026-05-29 · unverdicted · none · ref 14
The nonparametric Kiefer-Weiss problem is solved by deriving an optimal stopping policy based on a two-dimensional statistic (likelihood ratio plus expected remaining sample size) whose randomization rule maps the likelihood ratio to an integer sample size.

Sequential Procedure of Testing Composite Hypotheses with Applications to the Kiefer–Weiss Problem

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