Consider a $\mathscr{Y}$-valued response variable having a density function $f(\cdot\mid x)$ that depends on an $\mathscr{X}$-valued input variable $x.$ It is assumed that $\mathscr{X}$ and $\mathscr{Y}$ are compact intervals and that $f(\cdot\mid\cdot)$ is continuous and positive on $\mathscr{X} \times \mathscr{Y}.$ Let $F(\cdot\mid x)$ denote the distribution function of $f(\cdot\mid x)$ and let $Q(\cdot\mid x)$ denote its quantile function. A finite-parameter exponential family model based on tensor-product $B$-splines is constructed. Maximum likelihood estimation of the parameters of the model based on independent observations of the response variable at fixed settings of the input variable yields estimates of $f(\cdot \mid \cdot), F(\cdot \mid \cdot)$ and $Q(\cdot \mid \cdot).$ Under mild conditions, if the number of parameters suitably tends to infinity as $n \rightarrow \infty,$ these estimates have optimal rates of convergence. The asymptotic behavior of the corresponding confidence bounds is also investigated.
Publié le : 1991-12-14
Classification:
Input-response model,
exponential families,
B-splines,
maximum likelihood,
rates of convergence,
62G05,
62F12
@article{1176348373,
author = {Stone, Charles J.},
title = {Asymptotics for Doubly Flexible Logspline Response Models},
journal = {Ann. Statist.},
volume = {19},
number = {1},
year = {1991},
pages = { 1832-1854},
language = {en},
url = {http://dml.mathdoc.fr/item/1176348373}
}
Stone, Charles J. Asymptotics for Doubly Flexible Logspline Response Models. Ann. Statist., Tome 19 (1991) no. 1, pp. 1832-1854. http://gdmltest.u-ga.fr/item/1176348373/