當母體中有部份對象因被治癒或免疫而不會失敗時,需考慮這群對象所佔的比率,即存活分率。本文主要在探討如何以貝氏方法對含存活分率之治癒率模式進行分析,並特別針對兩種含存活分率的迴歸模式,分別是Weibull迴歸模式以及對數邏輯斯迴歸模式,導出概似函數與各參數之完全條件後驗分配及其性質。由於聯合後驗分配相當複雜,各參數之邊際後驗分配之解析形式很難表達出。所以,我們採用了馬可夫鏈蒙地卡羅方法(MCMC)中的Gibbs抽樣法及Metropolis法,模擬產生參數值,以進行貝氏分析。實證部份,我們分析了黑色素皮膚癌的資料,這是由美國Eastern Cooperative Oncology Group所進行的第三階段臨床試驗研究。有關模式選取的部份,我們先分別求出各對象在每個模式之下的條件預測指標(CPO),再據以算出各模式的對數擬邊際概似函數值(LPML),以比較各模式之適合性。 / When we face the problem that part of subjects have been cured or are immune so they never fail, we need to consider the fraction of this group among the whole population, which is the so called survival fraction. This article discuss that how to analyze cure rate models containing survival fraction based on Bayesian method. Two cure rate models containing survival fraction are focused; one is based on the Weibull regression model and the other is based on the log-logistic regression model. Then, we derive likelihood functions and full conditional posterior distributions under these two models. Since joint posterior distributions are both complicated, and marginal posterior distributions don’t have closed form, we take Gibbs sampling and Metropolis sampling of Markov Monte Carlo chain method to simulate parameter values. We illustrate how to conduct Bayesian analysis by using the data from a melanoma clinical trial in the third stage conducted by Eastern Cooperative Oncology Group. To do model selection, we compute the conditional predictive ordinate (CPO) for every subject under each model, then the goodness is determined by the comparing the value of log of pseudomarginal likelihood (LPML) of each model.
| Identifer | oai:union.ndltd.org:CHENGCHI/G0093354008 |
| Creators | 李涵君 |
| Publisher | 國立政治大學 |
| Source Sets | National Chengchi University Libraries |
| Language | 中文 |
| Detected Language | English |
| Type | text |
| Rights | Copyright © nccu library on behalf of the copyright holders |
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