Abstract
Let $(X_1, Y_1), \cdots, (X_n, Y_n)$ be a sample, denote the conditional density of $Y_i\mid X_i = x_i$ as $f(y\mid x_i, \theta(x_i))$ and $\theta$ an element of a metric space $(\Theta, d)$. A lower bound is provided for the $d$-error in estimating $\theta$. The order of the bound depends on the local behavior of the Kullback information of the conditional density. As an application, we consider the case where $\Theta$ is the space of $q$-smooth functions on $\lbrack 0, 1 \rbrack^d$ metrized with the $L_r$ distance, $1 \leq r < \infty$.
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