A low-degree polynomial model for a response curve is used commonly in
practice. It generally incorporates a linear or quadratic function of the
covariate. In this paper we suggest methods for testing the goodness of fit of
a general polynomial model when there are errors in the covariates. There, the
true covariates are not directly observed, and conventional bootstrap methods
for testing are not applicable. We develop a new approach, in which
deconvolution methods are used to estimate the distribution of the covariates
under the null hypothesis, and a ``wild'' or moment-matching bootstrap argument
is employed to estimate the distribution of the experimental errors (distinct
from the distribution of the errors in covariates). Most of our attention is
directed at the case where the distribution of the errors in covariates is
known, although we also discuss methods for estimation and testing when the
covariate error distribution is estimated. No assumptions are made about the
distribution of experimental error, and, in particular, we depart substantially
from conventional parametric models for errors-in-variables problems.Comment: Published in at http://dx.doi.org/10.1214/009053607000000361 the
Annals of Statistics (http://www.imstat.org/aos/) by the Institute of
Mathematical Statistics (http://www.imstat.org