The main purpose of this thesis concerns the problem of spatial prediction using some nonparametric conditional models where the covariate variable is a functional one. More precisely, we treat the nonparametric estimation of the conditional mode and that of the conditional quantiles as spatial prediction tools alternative to the classical spatial regression of real response variable given a functional variable.Concerning the first model, that is the conditional mode, it is estimated by maximizing the spatial version of the kernel estimate of the conditional density. Under a general mixing condition and the concentration properties of the probability measure of the functional variable, we establish the almost complete convergence (with rate), the Lp consistency (with rate) and the asymptotic normality of the considered estimator. The usefulness of this estimation is illustrated by an application on real meteorological data.The model of the conditional quantiles is considered in the second part of this thesis and is treated as the inverse function of the conditional cumulative distribution function which is estimated by a double kernel estimator. Under the same general conditions as in the first model, we give the convergence rate in the Lp- norm and we show the asymptotic normality of the constructed estimator. These asymptotic results are closely related to the concentration properties on small balls of the probability measure of the underlying explanatory variable and the regularity of the conditional cumulative distribution function.Our study generalizes to spatial case some existing results in functional times series case. Finally, we highlight what our models brings compared to classical regression, discussing the use of our results as preliminary works to construct predictive regions.