中文摘要：

自从1991Jacoby使用简单的再认任务分离出意识性提取与无意识熟悉性以来，虽然PDP的计算范式也受到一些修正，但均没有在计算范式的内核思想上改进过，只是PDP延伸出的应用研究非常多。其实，Jacoby在构建PDP范式时，从描述PDP的心理现象、构建数学模型到PDP在实践中的应用上均出现了重大失误。本研究从上述三个方面对PDP提出了质疑，使用集合模型重新构建了PDP计算模型，用实验验证了PDP新模型，纠正了Jacoby理论与应用的三大错误。

英文摘要：

Since Jacoby（1991） proposed a process-dissociation framework（PDP） designed to tease out and measure the effects of conscious and unconscious process. Jacoby’s process dissociation framework has been welcomed as a tool for differentiating controlled and automatic cognitive processes. Although original PDP was successively modified into several extension models, it is always considered as an ingenious methodology to obtain separate estimates of familiarity and intentional recollection with a single paradigm. PDP is based on the difference of mental phenomena in inclusion and exclusion conditions. The model that posits two independent retrieval processes： a familiarity process, and a recollection process, are dissociated in facilitation task and an interference task. Therefore, mental phenomena of PDP is the foundation on which mathematic model is conceived of. But present mathematic model of PDP do not reflect its mental phenomena, and its result is divorcing mathematic model from real mental phenomena. Jacoby made three blunders in describing PDP mental process, construction of mathematic model, applying PDP into practice. The article questioned Jacoby’s blunders in three aspects mentioned above. Firstly, PDP do not fully describe memory-recollection mental phenomena in inclusion and exclusion conditions. For example, Jacoby’ math model can not explain some phenomena in exclusion condition such as reversing between old and new, interference in two kind of memory, decision which sheet the old word belongs to, etc. these mistakes directly led to Jacoby’ equations incorrect. A simple example was employed to verify incorrectness of Jacoby’s mathematic equation in the article. Secondly, Jacoby neglected situationism of memory and complication of recollection, these resulting in Jacoby’s simple train of thought in construction of PDP math model, and improperly explanation of R and F. In PDP model, R represents the unconditional probability of recollection, FR＋ and FR- represent the conditional pr