舰空导弹武器系统转火射击能力研究

讨论了舰空导弹武器系统转火射击的概念,分析了影响转火射击能力的主要因素,提出了舰空导弹武器系统射击周期、最大射击周期、最小射击周期概念,并对其数学模型进行了详细分析。     

新时期加强我国警察射击训练的几点思考

当前,暴力犯罪时有发生,警察执法战斗面临着前所未有的挑战。如何合理有效使用枪支以提高警察战斗力成为亟待解决的问题。针对我国警察使用枪支的现状,提出新时期加强我国警察射击训练的方法:岗前射击训练、岗位专项训练、定期射击技能考核,并就每一阶段的具体内容及训练方法进行分析。最后,就射击训练中应注意的问题提出几点建议。     

先秦兵书军事装备用语例释

军事装备的发展对军事思想、作战方式和手段,以及军队组织结构的变革具有重大影响。先秦时期多部兵法著作中涉及到了大量的军事装备用语。在对先秦兵书军事装备用语的例释研究中,可以使我们从感性上升到理性体会古典军事装备用语的独特魅力。     

加强社会主义核心价值体系建设的理性思考

社会主义核心价值体系是兴国之魂,是社会主义先进文化的精髓,决定着中国特色社会主义发展方向。建设社会主义核心价值体系,必须以马克思主义为指导思想,确立中国特色社会主义共同理想,在实践中坚持价值体系的辩证性,从而巩固全党全国各族人民团结奋斗的思想道德基础。     

几类可靠性增长试验的费用分析

贮连续检测情形、定期检测情形、根除失效源意义下的可靠性增长试验建立了费用分析模型,着重对实际中经常采用的定期检测试验的费用问题进行了细致的分析,从理论上导出了定期检测中系统失效时停止运行和不停止运行的最佳检测周期。     

一类基于m序列的非线性序列生成器

构造了一类非线性序列生成器,其生成的序列周期长,线性复杂度高,且可控制。分析表明在满足一定条件下,它具有很高的安全性,适于做密钥流生成器。     

Properties of the geometric and related processes

Some properties of the geometric process are studied along with those of a related process which we propose to call the α‐series process. It is shown that the expected number of counts at an arbitrary time does not exist for the decreasing geometric process. The decreasing version of the α‐series process does have a finite expected number of counts, under certain conditions. This process also has the same advantages of tractability as the geometric process; it exhibits some properties which may make it a useful complement to the increasing geometric process. In addition, it may be fit to observed data as easily as the geometric process. Applications in reliability and stochastic scheduling are considered in order to demonstrate the versatility of the alternative model. © 2005 Wiley Periodicals, Inc. Naval Research Logistics, 2005     

新时期警营文化工作应着力解决好“四多四少”的问题

警营文化工作是部队精神文明和政治工作的重要内容,也是提高部队凝聚力和战斗力的强大“助推器”。本文分析了当前部队基层文化工作中存在的“四多四少”现象,并就如何着眼问题、解决矛盾,推进警营文化建设健康有序地发展提出了思考。     

遗传算法的预防性维修周期优化方法

考虑到预防维修可以提高系统生产效益的同时,故障率会随着维修次数的增加而上升,引入役龄回退因子对预防维修活动前后系统性能的动态变化进行描述;而且还充分考虑到系统预防维修周期随维修次数的变化情况,建立了系统预防维修周期优化模型,并将改进后的遗传算法运用于模型的优化求解.重点研究了系统总效益随预防维修次数的变化率, 从而有效地帮助决策者判定系统何时进行更新替换.     

A bivariate optimal replacement policy for a cold standby repairable system with repair priority

In this article, an optimal replacement policy for a cold standby repairable system consisting of two dissimilar components with repair priority is studied. Assume that both Components 1 and 2, after repair, are not as good as new, and the main component (Component 1) has repair priority. Both the sequence of working times and that of the components'repair times are generated by geometric processes. We consider a bivariate replacement policy (T,N) in which the system is replaced when either cumulative working time of Component 1 reaches T, or the number of failures of Component 1 reaches N, whichever occurs first. The problem is to determine the optimal replacement policy (T,N)* such that the long run average loss per unit time (or simply the average loss rate) of the system is minimized. An explicit expression of this rate is derived, and then optimal policy (T,N)* can be numerically determined through a two‐dimensional‐search procedure. A numerical example is given to illustrate the model's applicability and procedure, and to illustrate some properties of the optimal solution. We also show that if replacements are made solely on the basis of the number of failures N, or solely on the basis of the cumulative working time T, the former class of policies performs better than the latter, albeit only under some mild conditions. © 2010 Wiley Periodicals, Inc. Naval Research Logistics, 2010