The two-way analysis of variance with interactions is a well
established and integral part of statistics. In spite of its long standing, it
is shown that the standard definition of interactions is counterintuitive and
obfuscates rather than clarifies. A different definition of interaction is
given which among other advantages allows the detection of interactions even in
the case of one observation per cell. A characterization of unconditionally
identifiable interaction patterns is given and it is proved that such patterns
can be identified by the $L^1$ functional. The unconditionally identifiable
interaction patterns describe the optimal breakdown behavior of any equivariant
location functional from which it follows that the $L^1$ functional has optimal
breakdown behavior. Possible lack of uniqueness of the $L^1$ functional can be
overcome using an $M$ functional with an external scale derived
independently from the observations. The resulting procedures are applied to
some data sets including one describing the results of an interlaboratory
test.
Publié le : 1998-08-14
Classification:
Analysis of variance,
interactions,
outliers,
breakdown patterns,
robust statistics,,
$L^1$ functional,
$M$ functional.,
62J10,
62F35
@article{1024691243,
author = {Terbeck, Wolfgang and Davies, P. Laurie},
title = {Interactions and outliers in the two-way analysis of
variance},
journal = {Ann. Statist.},
volume = {26},
number = {3},
year = {1998},
pages = { 1279-1305},
language = {en},
url = {http://dml.mathdoc.fr/item/1024691243}
}
Terbeck, Wolfgang; Davies, P. Laurie. Interactions and outliers in the two-way analysis of
variance. Ann. Statist., Tome 26 (1998) no. 3, pp. 1279-1305. http://gdmltest.u-ga.fr/item/1024691243/