In this paper we consider the inferential aspect of the nonparametric estimation of a conditional function g(x; φ) = E[φ(Xt)|Xt,m], where Xt,m represents the vector containing the m conditioning lagged values of the series. Here φ is an arbitrary measurable function. The local polynomial estimator of order p is used for the estimation of the function g, and of its partial derivatives up to a total order p. We consider α-mixing processes, and we propose the use of a particular resampling method, the local polynomial bootstrap, for the approximation of the sampling distribution of the estimator. After analyzing the consistency of the proposed method, we present a simulation study which gives evidence of its finite sample behaviour.
Bootstrap inference in local polynomial regression of time series
PARRELLA, Maria Lucia;VITALE, Cosimo Damiano
2007-01-01
Abstract
In this paper we consider the inferential aspect of the nonparametric estimation of a conditional function g(x; φ) = E[φ(Xt)|Xt,m], where Xt,m represents the vector containing the m conditioning lagged values of the series. Here φ is an arbitrary measurable function. The local polynomial estimator of order p is used for the estimation of the function g, and of its partial derivatives up to a total order p. We consider α-mixing processes, and we propose the use of a particular resampling method, the local polynomial bootstrap, for the approximation of the sampling distribution of the estimator. After analyzing the consistency of the proposed method, we present a simulation study which gives evidence of its finite sample behaviour.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
