摘要
本文利用时间价值系数和试剂价值系数,从离散系统和连续系统两个角度对分次稀释问题分别建立了稀释的非线性规划数学模型(2)一(4),研究了它们的最优解的存在性及最优解的求法公式(定理1—理3).最后用BASIC语言编制了求模型(3)最优解的算法程序.
In this paper,from discrete system and continuous system,we estblish nonlinearprogramining mathematics odel(2)、(3)and(4).On fractional dilution problem by using time Value coefficient and reagent value coefficient.In the same time,we study those Model optimal solution existence and formula of finding their optimal solution(theorem1 theorem2 and theorerm3). Finally,for model(3),we give arcthmetic program of finding optimal solution using BASIC Language.
出处
《生物数学学报》
CSCD
1997年第S1期411-417,共7页
Journal of Biomathematics
基金
安徽省教委自然科学资助
关键词
分次稀释
可行域
非线性规划
Fractional dilution,feasible range,nonlinear programming
