血液中酒精-药物浓度的数学模型

Pub Date : 2023-09-30 DOI:10.47363/jmca/2023(2)119
KW Bunonyo
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引用次数: 1

摘要

这项研究涉及一个模拟人体和血液中酒精浓度的数学模型系统,这些模型受到一些初始条件的影响。配方从图1中理想的隔室图开始,该图清楚地显示了重点的两个隔室,以及酒精从一个隔室向另一个隔室扩散的不同速率,包括排尿和出汗的消除速率,这些在本研究中没有考虑到。本研究的目的是研究不同速率常数对血液中酒精浓度的重要性,以及研究药物剂量和体积对血液中酒精浓度的影响。采用拉普拉斯方法(LM)对模型进行求解,该模型首先表示体内的酒精浓度,并得到精确解;其次,描述血液中酒精浓度的模型也得到了精确解,并明确了所有相关参数。最后,使用Wolfram Mathematica软件12进行数值模拟,对相关参数值进行变化,并以图形化的方式呈现结果。图形结果表明,各种速率常数、剂量增加和体积增加对血流中药物浓度都有影响,并表现出相应的影响。这项研究的新颖之处在于,我们已经能够模拟现实生活中的场景,血液中的酒精浓度,用数学方法,用拉普拉斯方法求解这个系统,并进行数值模拟,以显示相关参数的重要性。该系统可推荐给对药代动力学和药效学研究感兴趣的科学家和工程师。
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Mathematical Modeling of Alcohol-Drug Concentration in the Bloodstream
This research involved the formulation of a system of mathematical models mimicking alcohol concentration in the human body and in the bloodstream, which are subjected to some initial conditions. The formulation starts with the an ideal presentation of the compartment diagram in Figure 1, the figure clearly indicates the two compartment in focus and the diffusion of alcohol from one compartment to the other with different rates including the elimination rate through urination and sweating that were not considered in this research. The aim of the research is to investigate the importance of the various rate constants on the alcohol concentration in the bloodstream, as well as investigating the drug dosage and volume of alcohol concentration impact in the bloodstream. The Laplace method (LM) was adopted to solve the model which represents, firstly, the alcohol concentration in the body where an exact solution was obtained, secondly, the exact solution was also obtained for the model depicting the alcohol concentration in the bloodstream with all pertinent parameters clearly spelt out. Lastly, numerical simulation was carried out using Wolfram Mathematica, version 12, where the pertinent parameters values were varied and the results presented graphically. The graphical results indicate that the various rate constants, dosage increase and the volumetric increase have impact and showed a corresponding effect on the drug concentration in the bloodstream. The novelty of this research is the fact that we’ve been able to mimic a real-life scenario, an alcohol concentration in the bloodstream, mathematically, and solved the system using Laplace methods and performed numerical simulation to show the importance of the pertinent parameters. This system can be recommended for scientists and engineers alike who could be interested in pharmacokinetics and Pharmacodynamics research.
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