ON ESTIMATING REGRESSION FUNCTION WITH CHANGE POINTS
碩士 === 國立臺灣大學 === 數學研究所 === 93 === Local polynomial fitting has been known as a powerful nonparametric regression method when dealing with correlated data and when trying to find implicit connections between variables. This method relaxes assumptions on the form of the regression function under inve...
| Main Authors: | , |
|---|---|
| Other Authors: | |
| Format: | Others |
| Language: | en_US |
| Published: |
2005
|
| Online Access: | http://ndltd.ncl.edu.tw/handle/93209714801005389344 |
| id |
ndltd-TW-093NTU05479006 |
|---|---|
| record_format |
oai_dc |
| spelling |
ndltd-TW-093NTU054790062015-12-21T04:04:54Z http://ndltd.ncl.edu.tw/handle/93209714801005389344 ON ESTIMATING REGRESSION FUNCTION WITH CHANGE POINTS 導函數不連續型態迴歸函數之非參數估計 Kuang-Chen Hsiao 蕭光呈 碩士 國立臺灣大學 數學研究所 93 Local polynomial fitting has been known as a powerful nonparametric regression method when dealing with correlated data and when trying to find implicit connections between variables. This method relaxes assumptions on the form of the regression function under investigation. Nevertheless, when we try fitting a regression curve with precipitous changes using general local polynomial method, the fitted curve is oversmoothed near points where the true regression function has sharp features. Since local polynomial modelling is fitting a "polynomial", a continuous and smooth function, to the regression function at each point of estimation, such drawback is intrinsic. Here, we suggest a modified estimator of the conventional local polynomial method. Asymptotic mean squared error is derived. Several numerical results are also presented. Ming-Yen Cheng 鄭明燕 2005 學位論文 ; thesis 24 en_US |
| collection |
NDLTD |
| language |
en_US |
| format |
Others
|
| sources |
NDLTD |
| description |
碩士 === 國立臺灣大學 === 數學研究所 === 93 === Local polynomial fitting has been known as a powerful
nonparametric regression method when dealing with correlated data and when trying to find implicit connections between variables. This method relaxes
assumptions on the form of the regression function under investigation. Nevertheless, when we try fitting a regression curve with precipitous changes using general local polynomial method, the fitted curve is oversmoothed near points where the true regression function has sharp features. Since local polynomial modelling is fitting a "polynomial", a continuous and smooth function, to the regression function at each point of estimation, such drawback is intrinsic. Here, we suggest a modified estimator of the conventional local polynomial method. Asymptotic mean squared error is derived. Several numerical results are also presented.
|
| author2 |
Ming-Yen Cheng |
| author_facet |
Ming-Yen Cheng Kuang-Chen Hsiao 蕭光呈 |
| author |
Kuang-Chen Hsiao 蕭光呈 |
| spellingShingle |
Kuang-Chen Hsiao 蕭光呈 ON ESTIMATING REGRESSION FUNCTION WITH CHANGE POINTS |
| author_sort |
Kuang-Chen Hsiao |
| title |
ON ESTIMATING REGRESSION FUNCTION WITH CHANGE POINTS |
| title_short |
ON ESTIMATING REGRESSION FUNCTION WITH CHANGE POINTS |
| title_full |
ON ESTIMATING REGRESSION FUNCTION WITH CHANGE POINTS |
| title_fullStr |
ON ESTIMATING REGRESSION FUNCTION WITH CHANGE POINTS |
| title_full_unstemmed |
ON ESTIMATING REGRESSION FUNCTION WITH CHANGE POINTS |
| title_sort |
on estimating regression function with change points |
| publishDate |
2005 |
| url |
http://ndltd.ncl.edu.tw/handle/93209714801005389344 |
| work_keys_str_mv |
AT kuangchenhsiao onestimatingregressionfunctionwithchangepoints AT xiāoguāngchéng onestimatingregressionfunctionwithchangepoints AT kuangchenhsiao dǎohánshùbùliánxùxíngtàihuíguīhánshùzhīfēicānshùgūjì AT xiāoguāngchéng dǎohánshùbùliánxùxíngtàihuíguīhánshùzhīfēicānshùgūjì |
| _version_ |
1718155140006936576 |