W., & Goodman, L

· 1957 · arXiv aoms/1177707

2 Pith papers cite this work. Polarity classification is still indexing.

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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.

Modelling the term-structure of default risk under IFRS 9 within a multistate regression framework

q-fin.RM · 2025-02-20 · unverdicted · novelty 3.0

Compares Markov chain, beta regression and multinomial logistic regression for loan default term-structures on mortgage data and reports successive outperformance plus new diagnostics.

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The Nonparametric Kiefer-Weiss Problem math.ST · 2026-05-29 · unverdicted · none · ref 3
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.

W., & Goodman, L

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