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The mean, variance, and bias of the OLS based estimator of the extremum of a quadratic regression model for small samples

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  • Andreas Karlsson Rosenblad

Abstract

Many economic theories suggest that the relation between two variables y and x follow a function forming a convex or concave curve. In the classical linear model (CLM) framework, this function is usually modeled using a quadratic regression model, with the interest being to find the extremum value or turning point of this function. In the CLM framework, this point is estimated from the ratio of ordinary least squares (OLS) estimators of coefficients in the quadratic regression model. We derive an analytical formula for the expected value of this estimator, from which formulas for its variance and bias follow easily. It is shown that the estimator is biased without the assumption of normality of the error term, and if the normality assumption is strictly applied, the bias does not exist. A simulation study of the performance of this estimator for small samples show that the bias decreases as the sample size increases.

Suggested Citation

  • Andreas Karlsson Rosenblad, 2022. "The mean, variance, and bias of the OLS based estimator of the extremum of a quadratic regression model for small samples," Communications in Statistics - Theory and Methods, Taylor & Francis Journals, vol. 51(9), pages 2870-2886, March.
    • Handle: RePEc:taf:lstaxx:v:51:y:2022:i:9:p:2870-2886
    DOI: 10.1080/03610926.2020.1782936
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