摘要
研究了空竭服务、单重休假的MMPP(2)/G/1植物病虫害防治系统模型的效能,并利用排队论及随机运筹学的有关知识,在模型的条件与假设下给出了模型的平稳条件、平均忙期长度,以及在忙期内防治完的害虫数等性能指标.
In this paper, we mainly study the effectiveness of MMPP(2)/G/1 controlling system about plant diseases and pests with exhaustive service and single vacation, using relevant knowledge of queuing theory and stochastic operation research, under the hypothesis of model , we give some indicators including the steady condition,busy period lengths and the average amount of pests being controled in the busy period and etc.
出处
《数学的实践与认识》
CSCD
北大核心
2012年第19期145-151,共7页
Mathematics in Practice and Theory
基金
江苏省属高校自然科学基础研究项目(11KLB110002)
淮安科技项目(SN1136)
关键词
排队论
MMPP(2)
单重休假
母函数
忙期
queuing theory
markov-modulated poisson process with two states
single vocation
generating function
busy period
