TY  - BOOK
AU  - Muhammad El- Metwally Muhammad Seliem,
AU  - Sayed Mesheal El-Sayed
AU  - Mohamed Reda Abonaze.
TI  - A proposed estimatoro f generalized semiparametric regression model
U1  - 519.5 
PY  - 2025///
KW  - Applied Statistics and Econometrics
KW  - Ø§ÙØ¥Ø­ØµØ§Ø¡ Ø§ÙØªØ·Ø¨ÙÙÙ ÙØ§ÙØ§ÙØªØµØ§Ø¯ Ø§ÙÙÙØ§Ø³Ù
KW  - Semiparametric Regression Models
KW  - Parametric Models
KW  - Generalized Linear Models
KW  - Count Data
KW  - Proportion Data
KW  -  P-Splines
KW  - Smoothing Splines
KW  - Excess Zeros Problem
KW  - ÙÙØ§Ø°Ø¬ Ø§ÙØ¹Ø¯
KW  - ÙÙØ§Ø°Ø¬ Ø´Ø¨Ù ÙØ¹ÙÙÙØ©
N1  - Thesis (Ph.D)-Cairo University, 2025; Bibliography: pages 119-133.; Issues also as CD
N2  - This dissertation develops three generalized semiparametric regression models (GSPRMs)
as an extension of parametric generalized linear models (GLMs) to address the dual chal-
lenges of excess zeros and nonlinear covariate effects in count data and proportion data. Two
estimators are developed for these models: penalized smoothing splines (Ps) and P-splines
(Pb). Within the GSPRMs framework, three specific models are developed, each estimated
using both developed estimators. First, the semiparametric partially Poisson (SPPO) regres-
sion model captures nonparametric covariate effects in standard count data. Second, the
semiparametric partially zero-inflated Poisson (SPZIP) regression model incorporates logis-
tic regression components to address excess zeros in count data. Third, the semiparametric
partially zero-inflated Beta (SPZIBE) regression model handles proportion data with zero-
inflation.

To evaluate the performance and applicability of these developed models, extensive sim-
ulation studies and real-world applications were conducted, demonstrating their robustness
and practical utility. The Pb estimator of the extended models (SPPO-Pb, SPZIP-Pb, SPZIBE-
Pb) show superior performance across evaluation metrics, including Akaike Information Cri-
terion (AIC), Bayesian Information Criterion (BIC), and root mean square error (RMSE),
achieving RMSE reductions of 40â58 % compared to standard Poisson, zero-inflated Poisson
(ZIP) and zero-inflated Beta (ZIBE) regression models estimated via maximum likelihood
(ML). Real-world applications to the Biochemists dataset (count data) and the Varieties of
Democracy (V-Dem) dataset, a global socio-political dataset (proportion data), validate their
utility across scientific and socio-political contexts. These models provide researchers in
economics, political science, and social sciences with robust, interpretable tools for analyz-
ing zero-inflated (ZI) data with enhanced predictive accuracy; ïºï»ïºï»ïº ï»«ïº¬ï»© ïºï»·ï»ïº®ï»­ïº£ïºØ ïºï»ïºïº¤ïºªï»³ïºïº ïºï»ï»¤ï»¨ï»¬ïº ï»´ïº ï»ï»² ï»§ï»¤ïº¬ïºïº ïºï»´ïºï»§ïºïº ïºï»ï»ïºª ï»­ïºï»´ïºï»§ïºïº ïºï»ï»¨ïº´ïº ïºï»ïºï»² ïºï»ïºï»§ï»² ï»£ï»¦ ï»£ïº¸ï»ï» ïº ïºï»ïºï»ïº¨ï»¢ ïºï»ïº¼ï»ïº®ï»±Ø
ï»­ï»«ï»² ï»£ïº¸ï»ï» ïº ïº·ïºïºï»ïº ï»ï»² ïºï»ïºï»´ïºï»§ïºïº ïºï»ï»®ïºï»ï»ï»´ïº ïºï»ïºï»² ïºïºï»¤ïºï» ï»ï»² ï»£ïº ïºï»»ïº ï»£ïºï» ïºï»»ï»ïºïº¼ïºïº©Ø ïºï»ï»ï» ï»®ï»¡ ïºï»ïº´ï»´ïºïº³ï»´ïºØ ï»ï» ï»¢ ïºï»·ï»­ïºïºïºØ ï»­ïºï»ï»ï» ï»®ï»¡ ïºï»»ïºïºï»¤ïºï»ï»´ïº.
ï»ïºï»ïºÙïº ï»£ïº ïºï»ïº¸ï» ï»§ï»¤ïºïº«ïº ïºï»ï»¤ï»ï» ï»¤ï»´ïº ïºï»ïºï»ï» ï»´ïºªï»³ïºØ ï»£ïºï» ïºï»§ïº¤ïºªïºïº­ ïºï»®ïºïº³ï»®ï»¥ (PO)Ø ï»­ïºï»§ïº¤ïºªïºïº­ ïºï»®ïºïº³ï»®ï»¥ ï»£ïºï»ïº¨ï»¢ ïºï»·ïº»ï»ïºïº­ (ZIP)Ø ï»­ïºï»§ïº¤ïºªïºïº­ ïºï»´ïºïº
ï»£ïºï»ïº¨ï»¢ ïºï»·ïº»ï»ïºïº­ (ZIBE)Ø ï»ï»² ïºï»ïºï»ïºï» ïºï»ï»ï»¼ï»ïºïº ï»ï»´ïº® ïºï»ïº¨ï»ï»´ïº ïºï»´ï»¦ ïºï»ï»¤ïºï»ï»´ïº®ïºïº ïºï»ïºï»ïº´ï»´ïº®ï»³ïº ï»­ïºï»ï»¤ïºï»ï»´ïº®ïºïº ïºï»ïºïºïºï»ïºØ ï»£ï»¤ïº ï»³ïºïº©ï»± ïºï»ï»° ïºï»§ïº¤ï»´ïºïº¯
ï»ï»² ïºï»ïºï»ïºªï»³ïº®ïºïº ï»­ïºï»§ïº¨ï»ïºïº½ ïºï»ïºªï»ïº ïºï»ïºï»¨ïºïºï»³ïº. ï»ï»¤ïº ïºï»ïºï»ïº® ïºï»ï»¨ï»¤ïºïº«ïº ïº·ïºï»ª ïºï»ï»¤ï»ï» ï»¤ï»´ïº ïºï»ïº¤ïºï»ï»´ïº ïºï»ï»° ïºï»ï»´ïºïº ï»£ïºªï»£ïº ïº ï»ï» ïºï»ïºï»£ï» ï»£ï» ïºï»ïºï»ïº¨ï»¢ ïºï»ïº¼ï»ïº®ï»±Ø
ïº ïºïºªï»³ïºªÙïº ï»ï»¨ï»¤ïºïº«ïº
ïº§ïºïº»ïºÙ ï»ï»¨ïºª ïºï»ïºï»ïºï»£ï» ï»£ï» ïºï»´ïºï»§ïºïº ïºï»ï»ïºª ï»­ïºï»ï»¨ïº´ïº ï»ï»² ïºï»ïºïº­ ï»£ï»®ïº£ïºª. ï»ï»¤ï»ïºï»ïº ïº ï»«ïº¬ï»© ïºï»ï»ïº ï»®ïºïºØ ïºïºïº³ïº² ï»«ïº¬ï»© ïºï»·ï»ïº®ï»­ïº£ïº ïºï»ïºïº­
Penalized Smoothing) ï»³ï»ïºï»¤ïºª ï»ï» ï»° ï»£ï»ïºªïº­ï»³ï»¦: ïºï»ïº¸ïº®ïºïºïº¢ ïºï»ïºï»¤ï»¬ï»´ïºªï»³ïº ïºï»ï»¤ï»ïºï»ïºïº Ø(GSPRMs) ï»ï»¤ï»¤ïº
ïºï»»ï»§ïº¤ïºªïºïº­ ïº·ïºï»ª ïºï»ï»¤ï»ï» ï»¤ï»´ïº ïºï»ï»¤
ØGSPRMs ïºï»ï»¤ï»ïºï»ïºïºØ ïºï»ï» ïº¬ï»³ï»¦ ï»³ï»ïº°ïº¯ïºï»¥ ïºï»ï»ï»ïºØ¡ïº ïºï»ïº¤ïº´ïºïºï»´ïº ï»­ïºï»ï»¤ïº®ï»­ï»§ïº ï»ï»² ïºï»ï»¨ï»¤ïº¬ïºïº. ïº¿ï»¤ï»¦ ï»§ï»¤ïºïº«ïº (B-spline) ï»­ïº·ïº®ïºïºïº¢ (Splines
Ùï»ï»®ïº­ïº ïºï»¼ïºïº ï»§ï»¤ïºïº«ïº ïºïºªï»³ïºªïº ï»ïºï» ïºï»´ïº ïºïº£ïºï»´ïºïºïºïº ïºïº¤ï» ï»´ï» ïºï»ïºï»´ïºï»§ïºïº ïºï»ï»¤ï»ï»ïºªïº:

â¢ ï»§ï»¤ïºïº«ïº ïºï»§ïº¤ïºªïºïº­ ïºï»®ïºïº³ï»®ï»¥ ïº·ïºï»ª ïºï»ï»¤ï»ï» ï»¤ï»² ïºï»ïº ïº°ïºï»² ïºï»ï»¤ï»ï»¤ï»¢ (SPPO): ï»³ïº´ïºïº¨ïºªï»¡ ï»«ïº¬ïº ïºï»ï»¨ï»¤ï»®ïº«ïº ï»ï»¼Ù ï»£ï»¦ ïº·ïº®ïºïºïº¢ Pb ï»­ Ps ï»»ï»ïºï»ïºï»
ïº ï»ï»®ï»³Ùïº ï»­ï»ïºïºï»¼Ù ï»ï» ïºï»ïº´ï»´ïº®

Ù

ïºï»ï»ï»¼ï»ïºïº ï»ï»´ïº® ïºï»ï»¤ï»ï» ï»¤ï»´ïº ïºï»¤ïº®ï»­ï»§ïº ïºï»´ï»¦ ïºï»ï»¤ïºï»ï»´ïº®ïºïº ïºï»ï»¤ïº¸ïºïº®ï»ïº ï»­ïºï»»ïº³ïºïº ïºïºïº ïºï»ï»ïºªïº©ï»³ïº. ï»³ï»®ï»ïº® SPPO ï»§ï»¬ïº 

.
Ùï»ï» ïº¤ïºï»»ïº ïºï»ïºï»² ï»ïºª ï»» ïºïºï»¤ï»ï»¦ ï»ï»´ï»¬ïº ïºï»ï»¨ï»¤ïºïº«ïº ïºï»ïº¨ï»ï»´ïº ïºï»ïºï»ï» ï»´ïºªï»³ïº ï»£ï»¦ ïºï»ïºï»ïºï» ï»ï»¤ï» ï»´ïº ïºï»®ï»ï»´ïºª ïºï»ïºï»´ïºï»§ïºïº ïºï»ï»ïºªïº©ï»³ïº ïºï»·ïº³ïºïº³ï»´ïº ïºïº¸ï»ï» ï»ïºï»
SPPO ï» ï»«ïº¬ïº ïºï»ï»¨ï»¤ï»®ïº«ïº ïºï»ïºïº­
ÙÙâ¢ ï»§ï»¤ï»®ïº«ïº ïºï»§ïº¤ïºªïºïº­ ïºï»®ïºïº³ï»®ï»¥ ïº·ïºï»ª ïºï»ï»¤ï»ï» ï»¤ï»² ïºï»ïº ïº°ïºï»² ïºï»ï»¤ï»ï»¤ï»¢ ï»£ïºï»ïº¨ï»¢ ïºï»·ïº»ï»ïºïº­ (SPZIP): ï»³Ùï»®ïº³
SPZIP ï»³ïºï»ï»¤ï»¦ .Ps ï»­ Pb ï»ï»¤ï»ïºï»ïº ïº ïºï»´ïºï»§ïºïº ïºï»ï»ïºª ïºï»ïºï»² ïºï»ïºï»§ï»² ï»£ï»¦ ï»£ïº¸ï»ï» ïº ïºï»ïºï»ïº¨ï»¢ ïºï»ïº¼ï»ïº®ï»±Ø ïºïºïº³ïºïº¨ïºªïºï»¡ ï»ï» ï»£ï»¦ ïº·ïº®ïºïºïº¢
ï»£ï»ï»®ï»¥ ïºï»ïº¨ï»¢ ïº»ï»ïº®ï»±Ø ï»³ïºï»¢ ï»§ï»¤ïº¬ïºïºï»ª ïºïºïº³ïºïº¨ïºªïºï»¡ ïº©ïºï»ïº ïºï»ïº®ïºï» (logit)Ø ï»ïº¤ïº´ïºïº ï»ï» ï»£ï»¦ ïºï»·ïº»ï»ïºïº­ ïºï»ï»¬ï»´ï»ï» ï»´ïº ï»­ïºï»ï»ïº¸ï»®ïºïºï»´ïº. ï»³ï»®ï»ïº® ï»«ïº¬ïº
ïºï»ïºïº® ïº©ï»ïº ï»­ï»­ïºï»ï»ï»´ïº ï»ï» ïºï»´ïºï»§ïºïº ïº«ïºïº ïºï»·ïº»ï»ïºïº­ ïºï»ïº°ïºïºïºªïº.
Ùïºï»ï»¨ï»¬ïº ïºï»¤ïºï»´ï»¼
ïº ï»ïºïº¤ï» ï»´ï»
Ùâ¢ ï»§ï»¤ï»®ïº«ïº ïºï»§ïº¤ïºªïºïº­ ïºï»´ïºïº ïº·ïºï»ª ïºï»ï»¤ï»ï» ï»¤ï»² ïºï»ïº ïº°ïºï»² ïºï»ï»¤ï»ï»¤ï»¢ ï»£ïºï»ïº¨ï»¢ ïºï»·ïº»ï»ïºïº­ (SPZIBE): Ùïº»ÙÙï»¤ï»¢ ï»«ïº¬ïº ïºï»ï»¨ï»¤ï»®ïº«ïº ïº§ïº¼ï»´ïº¼
SPZIBE ïº·ïºïºï» ï»ï»² ï»£ïº¨ïºï» ï» ïºï»ï»¤ïº ïºï»»ïº. ï»³ïº´ïºïº¨ïºªï»¡
ïºï»ïºï»´ïºï»§ïºïº ïºï»ï»¨ïº´ïºï»´ïº ïºï»ïºï»² ïºï»ïºï»§ï»² ï»£ï»¦ ï»£ïº¸ï»ï» ïº ïºï»ïºï»ïº¨ï»¢ ïºï»ïº¼ï»ïº®ï»±Ø ï»­ï»«ï»® ïºïº¤ïºª
ï»ï»¼Ù ï»£ï»¦ ïº·ïº®ïºïºïº¢ Pb ï»­ Ps ï»»ï»ïºï»ïºï» ïºï»ï»ï»¼ï»ïºïº ïºï»ï»¤ï»ï»ïºªïº ïºï»´ï»¦ ïºï»ï»¤ïºï»ï»´ïº®ïºïº ïºï»ï»¤ïº¸ïºïº®ï»ïº ï»­ïºï»ï»¤ïºï»ï»´ïº® ïºï»ïºïºïºï». ï»³ïºï»¢ ïºï»ï»®ï»³ïº® ï»§ïº´ïº¨ïºï»´ï»¦:
SPZIBE-Pb ï»­ SPZIBE-PsØ ï»£ï»¤ïº ï»³ïº´ï»¤ïº¢ ïºïºï»ï»´ï»´ï»¢ ï»£ï»ïºïº­ï»¥ ï»·ïº©ïºØ¡ ï»£ï»¨ïºï»«ïº ïºï»ïº¸ïº®ïºïºïº¢ ïºï»ï»¤ïº¨ïºï» ï»ïº
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