A Performance Comparison of Various Bootstrap Methods for Diffusion Processes

In this paper, we compare the finite sample performances of various bootstrap methods for diffusion processes. Though diffusion processes are widely used to analyze stocks, bonds, and many other financial derivatives, they are known to heavily suffer from size distortions of hypothesis tests. While there are many bootstrap methods applicable to diffusion models to reduce such size distortions, their finite sample performances are yet to be investigated. We perform a Monte Carlo simulation comparing the finite sample properties, and our results show that the strong Taylor approximation method produces the best performance, followed by the Hermite expansion method.

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QUASI-INDIRECT INFERENCE FOR DIFFUSION PROCESSES

Econometric Theory ◽

10.1017/s0266466698142019 ◽

1998 ◽

Vol 14 (2) ◽

pp. 161-186 ◽

Cited By ~ 29

Author(s):

Laurence Broze ◽

Olivier Scaillet ◽

Jean-Michel Zakoïan

Keyword(s):

Diffusion Processes ◽

Asymptotic Properties ◽

Estimation Procedure ◽

Indirect Inference ◽

Sampled Data ◽

Finite Sample ◽

Inference Procedure ◽

Monte Carlo Experiments ◽

Simulation Step ◽

Finite Sample Properties

We discuss an estimation procedure for continuous-time models based on discrete sampled data with a fixed unit of time between two consecutive observations. Because in general the conditional likelihood of the model cannot be derived, an indirect inference procedure following Gouriéroux, Monfort, and Renault (1993, Journal of Applied Econometrics 8, 85–118) is developed. It is based on simulations of a discretized model. We study the asymptotic properties of this “quasi”-indirect estimator and examine some particular cases. Because this method critically depends on simulations, we pay particular attention to the appropriate choice of the simulation step. Finally, finite-sample properties are studied through Monte Carlo experiments.

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Pitfalls of Two-Step Testing for Changes in the Error Variance and Coefficients of a Linear Regression Model

Econometrics ◽

10.3390/econometrics7020022 ◽

2019 ◽

Vol 7 (2) ◽

pp. 22 ◽

Cited By ~ 5

Author(s):

Pierre Perron ◽

Yohei Yamamoto

Keyword(s):

Linear Regression ◽

Regression Models ◽

Structural Changes ◽

Error Variance ◽

Regression Coefficients ◽

Linear Regression Models ◽

Finite Sample ◽

Finite Sample Properties ◽

Joint Approach ◽

Size Distortions

In empirical applications based on linear regression models, structural changes often occur in both the error variance and regression coefficients, possibly at different dates. A commonly applied method is to first test for changes in the coefficients (or in the error variance) and, conditional on the break dates found, test for changes in the variance (or in the coefficients). In this note, we provide evidence that such procedures have poor finite sample properties when the changes in the first step are not correctly accounted for. In doing so, we show that testing for changes in the coefficients (or in the variance) ignoring changes in the variance (or in the coefficients) induces size distortions and loss of power. Our results illustrate a need for a joint approach to test for structural changes in both the coefficients and the variance of the errors. We provide some evidence that the procedures suggested by Perron et al. (2019) provide tests with good size and power.

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A Test for Functional Form Against Nonparametric Alternatives

Econometric Theory ◽

10.1017/s0266466600013165 ◽

1992 ◽

Vol 8 (4) ◽

pp. 452-475 ◽

Cited By ~ 72

Author(s):

Jeffrey M. Wooldridge

Keyword(s):

Alternative Model ◽

Regression Models ◽

Functional Form ◽

Parametric Model ◽

Finite Sample ◽

Test Statistic ◽

Sieve Estimation ◽

Finite Sample Properties ◽

Standard Normal ◽

Nonparametric Alternatives

A test for neglected nonlinearities in regression models is proposed. The test is of the Davidson-MacKinnon type against an increasingly rich set of non-nested alternatives, and is based on sieve estimation of the alternative model. For the case of a linear parametric model, the test statistic is shown to be asymptotically standard normal under the null, while rejecting with probability going to one if the linear model is misspecified. A small simulation study suggests that the test has adequate finite sample properties, but one must guard against over fitting the nonparametric alternative.

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Kernel Based Estimation for a Non-Homogeneous Poisson Processes

Advanced Materials Research ◽

10.4028/www.scientific.net/amr.805-806.1948 ◽

2013 ◽

Vol 805-806 ◽

pp. 1948-1951

Author(s):

Tian Jin

Keyword(s):

Air Pollution ◽

Nonparametric Estimation ◽

Simulation Study ◽

Poisson Model ◽

Poisson Processes ◽

Finite Sample ◽

Process Data ◽

Homogeneous Poisson Process ◽

Finite Sample Properties ◽

Non Homogeneous Poisson Process

The non-homogeneous Poisson model has been applied to various situations, including air pollution data. In this paper, we propose a kernel based nonparametric estimation for fitting the non-homogeneous Poisson process data. We show that our proposed estimator is-consistent and asymptotically normally distributed. We also study the finite-sample properties with a simulation study.

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Finite sample properties of system identification of ARX models under mixing conditions

IFAC Proceedings Volumes ◽

10.1016/s1474-6670(17)56717-8 ◽

1999 ◽

Vol 32 (2) ◽

pp. 4207-4212

Author(s):

Erik Weyer

Keyword(s):

System Identification ◽

Finite Sample ◽

Mixing Conditions ◽

Finite Sample Properties

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Finite-sample properties of the bootstrap estimator in a Markov-switching model

Journal of Applied Statistics ◽

10.1080/02664760120074924 ◽

2001 ◽

Vol 28 (7) ◽

pp. 835-842 ◽

Cited By ~ 1

Author(s):

Tsung-Wu Ho

Keyword(s):

Markov Switching ◽

Finite Sample ◽

Markov Switching Model ◽

Switching Model ◽

Finite Sample Properties

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Cause-specific quantile residual life regression

Statistical Methods in Medical Research ◽

10.1177/0962280215592426 ◽

2015 ◽

Vol 26 (4) ◽

pp. 1912-1924 ◽

Cited By ~ 2

Author(s):

Jeong Youn Lim ◽

Jong-Hyeon Jeong

Keyword(s):

Residual Life ◽

Fixed Time ◽

Estimating Equation ◽

Simulation Studies ◽

Finite Sample ◽

Test Statistic ◽

Life Distribution ◽

Finite Sample Properties ◽

Quantile Residual Life ◽

Log Linear

We propose a cause-specific quantile residual life regression where the cause-specific quantile residual life, defined as the inverse of the cumulative incidence function of the residual life distribution of a specific type of events of interest conditional on a fixed time point, is log-linear in observable covariates. The proposed test statistic for the effects of prognostic factors does not involve estimation of the improper probability density function of the cause-specific residual life distribution under competing risks. The asymptotic distribution of the test statistic is derived. Simulation studies are performed to assess the finite sample properties of the proposed estimating equation and the test statistic. The proposed method is illustrated with a real dataset from a clinical trial on breast cancer.

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