博碩士論文 952201013 完整後設資料紀錄

DC 欄位	值	語言
DC.contributor	數學系	zh_TW
DC.creator	蕭愛齡	zh_TW
DC.creator	Ai-ling Hsiao	en_US
dc.date.accessioned	2008-6-22T07:39:07Z
dc.date.available	2008-6-22T07:39:07Z
dc.date.issued	2008
dc.identifier.uri	http://ir.lib.ncu.edu.tw:88/thesis/view_etd.asp?URN=952201013
dc.contributor.department	數學系	zh_TW
DC.description	國立中央大學	zh_TW
DC.description	National Central University	en_US
dc.description.abstract	傳統上，針對二元資料之分析多採用 logistic 迴歸模型。但此模型在事件發生之條件機率上有單調函數之限制，因此我們利用Bernstein 多項式來表達事件發生之條件機率，因而於本文中提出一個藉由Bernstein 多項式所建構的貝氏迴歸模型。在貝氏方法中，我們將先驗分佈建立在Bernstein 多項式的次數和係數所組成的參數空間上，並對統計推論所需的後驗分佈用MCMC 的方法做 抽樣。最後，在相同的模型與方法下，比較在不同樣本數及先驗分佈下的模擬結果；其次，對於logistic 迴歸模型的限制，經由模擬顯示本文所提出的貝氏迴歸有較小的均方誤差。	zh_TW
dc.description.abstract	Data analysis of binary response variables are often conducted by logistic regression model. Logistic regression model assumes that the conditional probability function of success is a monotonic function. In order to eliminate this sometimes unnecessary monotone restriction, we propose to use Bernstein polynomials to model the conditional probability of success. As a Bayesian approach, we put a prior on the space of Bernstein polynomials having values in [0,1] through their coe cients. The sample from the posterior distribution for inference purpose is obtained by MCMC methods. We conduct simulation studies to examine the e ects of sample size and priors, to indicate that the numerical performance of this method is generally good and to show that our model performs better than the logistic regression model when the regression function is not monotone.	en_US
DC.subject	馬可夫鏈蒙地卡羅法	zh_TW
DC.subject	logistic 迴歸模型	zh_TW
DC.subject	Bernstein 多項式	zh_TW
DC.subject	MCMC	en_US
DC.subject	Bernstein polynomial	en_US
DC.subject	logistic regression model	en_US
DC.title	利用Bernstein多項式來研究二元迴歸	zh_TW
dc.language.iso	zh-TW	zh-TW
DC.title	Binary regression with Bernstein polynomials	en_US
DC.type	博碩士論文	zh_TW
DC.type	thesis	en_US
DC.publisher	National Central University	en_US