Skip Navigation

Biometrika 1976 63(1):13-25; doi:10.1093/biomet/63.1.13
© 1976 by Biometrika Trust
This Article
Right arrow Full Text (PDF)
Right arrow Alert me when this article is cited
Right arrow Alert me if a correction is posted
Services
Right arrow Email this article to a friend
Right arrow Similar articles in this journal
Right arrow Alert me to new issues of the journal
Right arrow Add to My Personal Archive
Right arrow Download to citation manager
Right arrowRequest Permissions
Google Scholar
Right arrow Articles by SWITZER, P.
Right arrow Search for Related Content
Social Bookmarking
Add to CiteULike   Add to Connotea   Add to Del.icio.us  
What's this?

Confidence procedures for two-sample problems

PAUL SWITZER

Department of Statistics, Stanford University California

In the usual two-sample problem one is estimating the constant additive effect of a treat ment or the additive constant by which two random variables differ. However, if the treatment-effect may depend on the response level, then a more general approach to two-sample problems seems appropriate. We deflr a treatment-effect function t and characterize distribution-free confidence bounds for the function t both in the case where t has specified parametric forms and in the case where t is not parameterized.

Key Words: Additivity • Distribution-free confidence procedure • Two-sample problem


Add to CiteULike CiteULike   Add to Connotea Connotea   Add to Del.icio.us Del.icio.us    What's this?


This article has been cited by other articles:


Home page
 REVIEW OF EDUCATIONAL RESEARCHHome page
R. R. Wilcox
ANOVA: A Paradigm for Low Power and Misleading Measures of Effect Size?
Review of Educational Research, January 1, 1995; 65(1): 51 - 77.
[Abstract] [PDF]


Disclaimer: Please note that abstracts for content published before 1996 were created through digital scanning and may therefore not exactly replicate the text of the original print issues. All efforts have been made to ensure accuracy, but the Publisher will not be held responsible for any remaining inaccuracies. If you require any further clarification, please contact our Customer Services Department.