International audienceIn this paper, we investigate kernel regression estimation when the data are contaminated by measurement errors in the context of random fields. We establish sharp rate of weak and strong convergence of the kernel regression estimator under both the ordinary smooth and super-smooth assumptions. Numerical studies were carried out in order to illustrate the performance of the estimator with simulated data
We explore the aims of, and relationships between, various kernel-type regression estimators. To do ...
: We analyze the asymptotic behaviour of kernel estimators provided the underlying regression funct...
The paper studies convex stochastic optimization problems in a reproducing kernel Hilbert space (RKH...
International audienceIn this paper, we investigate kernel regression estimation when the data are c...
We establish the asymptotic normality of the regression estimator in a fixed-design setting when the...
International audienceWe investigate the nonparametric estimation for regression in a fixed-design s...
The effect of errors in variables in nonparametric regression estimation is examined. To account for...
Abstract This paper examines the limiting properties of the estimated parameters in the random field...
This article considers estimation of regression function ff in the fixed design model Y(xi)=f(xi)...
In many regression applications both the independent and dependent variables are measured with error...
International audienceThis work studies the estimation of spectral density for random field (two-dim...
AbstractLet (X, Y), (X1, Y1), …, (Xn, Yn) be i.d.d. Rr × R-valued random vectors with E|Y| < ∞, and ...
Mean squared error properties of kernel estimates of regression quantiles, for both fixed and random...
Abstract. We consider pointwise consistency properties of kernel regression function type estimators...
Abstract—Reconstruction of a function from noisy data is often formulated as a regularized optimizat...
We explore the aims of, and relationships between, various kernel-type regression estimators. To do ...
: We analyze the asymptotic behaviour of kernel estimators provided the underlying regression funct...
The paper studies convex stochastic optimization problems in a reproducing kernel Hilbert space (RKH...
International audienceIn this paper, we investigate kernel regression estimation when the data are c...
We establish the asymptotic normality of the regression estimator in a fixed-design setting when the...
International audienceWe investigate the nonparametric estimation for regression in a fixed-design s...
The effect of errors in variables in nonparametric regression estimation is examined. To account for...
Abstract This paper examines the limiting properties of the estimated parameters in the random field...
This article considers estimation of regression function ff in the fixed design model Y(xi)=f(xi)...
In many regression applications both the independent and dependent variables are measured with error...
International audienceThis work studies the estimation of spectral density for random field (two-dim...
AbstractLet (X, Y), (X1, Y1), …, (Xn, Yn) be i.d.d. Rr × R-valued random vectors with E|Y| < ∞, and ...
Mean squared error properties of kernel estimates of regression quantiles, for both fixed and random...
Abstract. We consider pointwise consistency properties of kernel regression function type estimators...
Abstract—Reconstruction of a function from noisy data is often formulated as a regularized optimizat...
We explore the aims of, and relationships between, various kernel-type regression estimators. To do ...
: We analyze the asymptotic behaviour of kernel estimators provided the underlying regression funct...
The paper studies convex stochastic optimization problems in a reproducing kernel Hilbert space (RKH...