This paper deals with the taking into account a given set of realizations as constraints in the Kullback-Leibler minimum principle, which is used as a probabilistic learning algorithm. This permits the effective integration of data into predictive models. We consider the probabilistic learning of a random vector that is made up of either a quantity of interest (unsupervised case) or the couple of the quantity of interest and a control parameter (supervised case). A training set of independent realizations of this random vector is assumed to be given and to be generated with a prior probability measure that is unknown. A target set of realizations of the QoI is available for the two considered cases. The framework is the one of non-Gaussian problems in high dimension. A functional approach is developed on the basis of a weak formulation of the Fourier transform of probability measures (characteristic functions). The construction makes it possible to take into account the target set of realizations of the QoI in the Kullback-Leibler minimum principle. The proposed approach allows for estimating the posterior probability measure of the QoI (unsupervised case) or of the posterior joint probability measure of the QoI with the control parameter (supervised case). The existence and the uniqueness of the posterior probability measure is analyzed for the two cases. The numerical aspects are detailed in order to facilitate the implementation of the proposed method. The presented application in high dimension demonstrates the efficiency and the robustness of the proposed algorithm.
翻译:本文涉及将特定的一系列实现作为Kullback-Leiber最小值原则的制约因素,该最低值原则被用作一种概率学习算法,用于将数据有效纳入预测模型。我们考虑随机矢量的概率学习,该矢量由一定的利害关系(无人监督的个案)或利益数量和控制参数(监督的个案)的组合组成。假定将提供这一随机矢量独立实现的一套培训,并事先以未知的概率衡量生成一套培训。两种被考虑的案例中都有一套QoI实现QoI的目标。这一框架是非Gaussian问题高层面的一个框架。一种功能性方法的制定,其依据是“四重变概率措施”的微弱表述(直观功能功能功能),其构建可以考虑到在Kullback-Leiter最小值原则中实现QoI的目标。拟议的方法可以估计QoI的事后概率测量值,该结果的精确度是“Oublical ” 和“Oblical Q” 数据分析模型中的拟议精确度测试。