TY - JOUR
T1 - Consistency and Asymptotic Normality of Estimator for Parameters in Multiresponse Multipredictor Semiparametric Regression Model
AU - Chamidah, Nur
AU - Lestari, Budi
AU - Budiantara, I. Nyoman
AU - Saifudin, Toha
AU - Rulaningtyas, Riries
AU - Aryati, Aryati
AU - Wardani, Puspa
AU - Aydin, Dursun
N1 - Publisher Copyright:
© 2022 by the authors. Licensee MDPI, Basel, Switzerland.
PY - 2022/2
Y1 - 2022/2
N2 - A multiresponse multipredictor semiparametric regression (MMSR) model is a combi-nation of parametric and nonparametric regressions models with more than one predictor and response variables where there is correlation between responses. Due to this correlation we need to construct a symmetric weight matrix. This is one of the things that distinguishes it from the clas-sical method, which uses a parametric regression approach. In this study, we theoretically developed a method of determining a confidence interval for parameters in a MMSR model based on a truncated spline, and investigating asymptotic properties of estimator for parameters in a MMSR model, especially consistency and asymptotic normality. The weighted least squares method was used to estimate the MMSR model. Next, we applied a pivotal quantity method, a Cramer–Wold theorem, and a Slutsky theorem to determine the confidence interval, investigate consistency, and asymptotic normality properties of estimator for parameters in a MMSR model. The obtained results were that the estimated regression function is linear to observation. We also obtained a 100(1 − α)% confidence interval for parameters in the MMSR model, and the estimator for parameters in MMSR model was consistent and asymptotically normally distributed. In the future, these obtained results can be used as a theoretical basis in designing a standard toddlers growth chart to assess nutritional status.
AB - A multiresponse multipredictor semiparametric regression (MMSR) model is a combi-nation of parametric and nonparametric regressions models with more than one predictor and response variables where there is correlation between responses. Due to this correlation we need to construct a symmetric weight matrix. This is one of the things that distinguishes it from the clas-sical method, which uses a parametric regression approach. In this study, we theoretically developed a method of determining a confidence interval for parameters in a MMSR model based on a truncated spline, and investigating asymptotic properties of estimator for parameters in a MMSR model, especially consistency and asymptotic normality. The weighted least squares method was used to estimate the MMSR model. Next, we applied a pivotal quantity method, a Cramer–Wold theorem, and a Slutsky theorem to determine the confidence interval, investigate consistency, and asymptotic normality properties of estimator for parameters in a MMSR model. The obtained results were that the estimated regression function is linear to observation. We also obtained a 100(1 − α)% confidence interval for parameters in the MMSR model, and the estimator for parameters in MMSR model was consistent and asymptotically normally distributed. In the future, these obtained results can be used as a theoretical basis in designing a standard toddlers growth chart to assess nutritional status.
KW - Asymptotic normality
KW - Confidence interval
KW - Consistency
KW - MMSR model
KW - Nutritional status
KW - Symmetric weight matrix
KW - Truncated spline
UR - http://www.scopus.com/inward/record.url?scp=85124373202&partnerID=8YFLogxK
U2 - 10.3390/sym14020336
DO - 10.3390/sym14020336
M3 - Article
AN - SCOPUS:85124373202
SN - 2073-8994
VL - 14
JO - Symmetry
JF - Symmetry
IS - 2
M1 - 336
ER -