Kernel-type estimators of jump points and values of a regression function

Estimation of regression functions with a discontinuity in a derivative with local polynomial fits, Adaptive quantile regression with precise risk bounds, Testing for Breaks in Regression Models with Dependent Data, Testing for change points in partially linear models, Adaptive estimation of autoregressive models with time-varying variances, TESTING FOR STRUCTURAL CHANGE IN TIME-VARYING NONPARAMETRIC REGRESSION MODELS, Change points in nonparametric regresion functions, Two Non-Parametric Tests For Change-Point Problems. IDOPT Project: It is a joint project of CNRS, INRIA, UJF and INPG, Nonparametric inference on jump regression surface, Two-stage change-point estimators in smooth regression models, Tests for continuity of regression functions, Bootstrap test for change-points in nonparametric regression, Estimation of change-points in a nonparametric regression function through kernel density estimation, On the functional estimation of jump-diffusion models., Curve fitting and jump detection on nonparametric regression with missing data, Estimation of a jump point in random design regression, ON MULTIPLE STRUCTURAL BREAKS IN DISTRIBUTION: AN EMPIRICAL CHARACTERISTIC FUNCTION APPROACH, Nonparametric estimation of the regression function having a change point in generalized linear models, Change point detection for nonparametric regression under strongly mixing process, Change point estimation by local linear smoothing under a weak dependence condition, Variance estimation in nonparametric regression with jump discontinuities, A nonlinear gaussian filter applied to images with discontinuities, Asymptotic bias and variance of a kernel-based estimator for the location of a discontinuity, A maximal inequality for continuous martingales and \(M\)-estimation in a Gaussian white noise model, Nonparametric inference on structural breaks, A robust and efficient estimation method for nonparametric models with jump points, Regression discontinuity designs with unknown discontinuity points: testing and estimation, Local linear kernel estimation of the discontinuous regression function, Sequential Data-Adaptive Bandwidth Selection by Cross-Validation for Nonparametric Prediction, A surveillance procedure for random walks based on local linear estimation, A jump-detecting procedure based on spline estimation, Data-driven boundary estimation in deconvolution problems, Multiple Testing of Composite Null Hypotheses in Heteroscedastic Models, Estimating the locations and number of change points by the sample-splitting method, Detection of a change point based on local-likelihood, Blind deconvolution for jump-preserving curve estimation, Asymptotic confidence sets for the jump curve in bivariate regression problems, Detection of jumps by wavelets in a heteroscedastic autoregressive model, The wavelet identification for jump points of derivative in regression model, Jump-preserving regression and smoothing using local linear fitting: a compromise, Change-Point Estimation in Long Memory Nonparametric Models with Applications, Detection of linear and circular shapes in image analysis, Jump detection in time series nonparametric regression models: a polynomial spline approach, Estimation of a function with discontinuities via local polynomial fit with an adaptive window choice, Discontinuous versus smooth regression, Jump detection in generalized error-in-variables regression with an application to Australian health tax policies, Estimation of a change point in the variance function based on the χ²-distribution, Bayesian Estimation of the Number of Change Points in Simple Linear Regression Models, A jump-preserving curve fitting procedure based on local piecewise-linear kernel estimation, Are deviations in a gradually varying mean relevant? A testing approach based on sup-norm estimators, Change-point problems: bibliography and review, Limit theorems for kernel-type estimators for the time of change, The wavelet detection of the jump and cusp points of a regression function, Asymptotics of M-estimators in two-phase linear regression models., Nonparametric monitoring of financial time series by jump-preserving control charts, Discontinuous regression surfaces fitting, Detection of the jump points of a heteroscedastic regression model by wavelets, Asymptotics of maximum likelihood estimator in a two-phase linear regression model, Change point estimation by local linear smoothing, Testing for jumps in the presence of smooth changes in trends of nonstationary time series