本文通过引进“概率元”,把连续型和离散型两类求概率分布的方法统一起来,建立起“概率元法”的理论及其计算方法。
Introduced is this paper are the probability differential method and the unify way of calculating the probability distribution of the continuous type and that of the discrete type.
概率分布为离散型和连续型两种。
Probability distributions are classified as either discrete or continuous.
本文提出了类条件概率密度随机变量(特征)空间离散化及类条件概率分布估计方法。
A discrete method for stochastic variable (features) space of class-conditional-probability density and estimation method for class-conditional -probability distribution is proposed.
对一种离散风险模型的破产概率进行研究,并在理赔额分布函数已知的情况下推导出了破产概率的更易于计算的表达式。
The paper discusses the ruin probability of discrete risk mode and works out the expressing pattern easier for calculating ruin probability with the claim amount distribution function known.
本文探讨了离散的三项分布风险模型,重点研究了与风险有关的最终破产概率和破产前一刻的盈余的概率律。
The trinomial distribution risk model in discrete setting is explored . The probability of ultimate ruin and the probability laws of the surplus immediately before ruin are discussed with emphasis.
给出确定利用最大熵原理建立的功能函数概率分布密度的待定参数时由高斯积分表达的离散化公式。
Discrete formulas expressed by Gauss-quadrature are presented when determine the parameter of probability density function which is established based on maximum entropy theory.
考虑在可数背景状态下,时间离散的拟生灭过程(QBD过程)平稳分布的尾概率的渐近态。
We consider asymptotic behaviors of stationary tail probabilities in the discrete time quasi-birth-and-death (QBD) process with a countable background state space.
论文分析了基于熵的离散化方法的不足,从估计训练样本的概率分布的角度出发,提出基于样本分布与熵相结合的处理数值型属性的方法。
By the method of estimating the probability distribution of training examples, a new and simple method of dealing with numeric attribute based on example distribution and entropy is turned out.
本文探讨了离散的三项分布风险模型,重点研究了与风险有关的最终破产概率和破产前一刻的盈余的概率律。
Particularly, the probability of ultimate ruin, the probability laws of the surplus immediately before ruin and the deficit at ruin a re discussed with emphasis.
本文探讨了离散的三项分布风险模型,重点研究了与风险有关的最终破产概率和破产前一刻的盈余的概率律。
Particularly, the probability of ultimate ruin, the probability laws of the surplus immediately before ruin and the deficit at ruin a re discussed with emphasis.
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