建立了一类仓库容量有限条件下存贮管理决策模型,给出最优存贮策略。
The Storage Model under the Condition of Limited-space Storehouse was established, given the option storage strategy.
库存费的变化率为存贮量的函数,讨论模型解的存在性和唯一性,找到了最优存贮策略。
The existence and uniqueness of the models are discussed, and optimal inventory policies are found.
存贮问题的模型多数是在仓库容量有限的假设下讨论最优解,这一假设往往与实际情况不符。
Optimum solutions of most models of storage are discussed under hypothesis that the capacity of storehouse is limited and that is not always conformed with the real case.
给出一般需求下有保质期的变质性物品的存贮模型,求得线性需求时的最优解。
Inventory model of deteriorating items with deterministic time of effect under general demand is proposed to find the optimal solution under linear demand.
仓库容量有限条件下的随机存贮管理讨论的就是使总损失费用达到最低“最优订货点”的数学模型。
The random storage management discusses the mathematic model of optimum order point on the minimum total cost.
对确定型存贮,建立了允许缺货和缺货不需要补充两种模型。并对模型进行了分析,得出了最优决策。
Two types of inventory models are created which permit a shortage inventory allowance without need for compensation. The models are analyzed and an optimal policy is obtained.
建立了具有随机生产费用和随机需求的连续生产存贮系统的期望值规划模型,运用动态规划方法给出了最优控制策略。
In this paper, an expected value programming model is introduced for a continuous production-inventory system with stochastic production cost and stochastic demand.
建立了具有随机生产费用和随机需求的连续生产存贮系统的期望值规划模型,运用动态规划方法给出了最优控制策略。
In this paper, an expected value programming model is introduced for a continuous production-inventory system with stochastic production cost and stochastic demand.
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