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Main Authors: Wang, Yinzhi, Zhu, Yingqiu, Shia, Ben-Chang, Qin, Lei
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2507.16150
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author Wang, Yinzhi
Zhu, Yingqiu
Shia, Ben-Chang
Qin, Lei
author_facet Wang, Yinzhi
Zhu, Yingqiu
Shia, Ben-Chang
Qin, Lei
contents Modeling large dependent datasets in modern time series analysis is a crucial research area. One effective approach to handle such datasets is to transform the observations into density functions and apply statistical methods for further analysis. Income distribution forecasting, a common application scenario, benefits from predicting density functions as it accounts for uncertainty around point estimates, leading to more informed policy formulation. However, predictive modeling becomes challenging when dealing with mixed-frequency data. To address this challenge, this paper introduces a mixed data sampling regression model for probability density functions (PDF-MIDAS). To mitigate variance inflation caused by high-frequency prediction variables, we utilize exponential Almon polynomials with fewer parameters to regularize the coefficient structure. Additionally, we propose an iterative estimation method based on quadratic programming and the BFGS algorithm. Simulation analyses demonstrate that as the sample size for estimating density functions and observation length increase, the estimator approaches the true value. Real data analysis reveals that compared to single-sequence prediction models, PDF-MIDAS incorporating high-frequency exogenous variables offers a wider range of application scenarios with superior fitting and prediction performance.
format Preprint
id arxiv_https___arxiv_org_abs_2507_16150
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Density Prediction of Income Distribution Based on Mixed Frequency Data
Wang, Yinzhi
Zhu, Yingqiu
Shia, Ben-Chang
Qin, Lei
Methodology
Applications
Modeling large dependent datasets in modern time series analysis is a crucial research area. One effective approach to handle such datasets is to transform the observations into density functions and apply statistical methods for further analysis. Income distribution forecasting, a common application scenario, benefits from predicting density functions as it accounts for uncertainty around point estimates, leading to more informed policy formulation. However, predictive modeling becomes challenging when dealing with mixed-frequency data. To address this challenge, this paper introduces a mixed data sampling regression model for probability density functions (PDF-MIDAS). To mitigate variance inflation caused by high-frequency prediction variables, we utilize exponential Almon polynomials with fewer parameters to regularize the coefficient structure. Additionally, we propose an iterative estimation method based on quadratic programming and the BFGS algorithm. Simulation analyses demonstrate that as the sample size for estimating density functions and observation length increase, the estimator approaches the true value. Real data analysis reveals that compared to single-sequence prediction models, PDF-MIDAS incorporating high-frequency exogenous variables offers a wider range of application scenarios with superior fitting and prediction performance.
title Density Prediction of Income Distribution Based on Mixed Frequency Data
topic Methodology
Applications
url https://arxiv.org/abs/2507.16150