A mathematical analysis of cooperativity and fractional saturation of oxygen in hemoglobin

IF 0.7 Q2 MATHEMATICS
Roohi Bhat, M. A. Khanday
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引用次数: 0

Abstract

Hemoglobin $(Hb)$ possesses good properties of cooperative system and it normally executes oxygen and other essential items via erythrocytes in the body. The chemical action of $Hb$ is to combine with oxygen (O2)(O2) in the lungs to form oxyhemoglobin (HbO2)(HbO2). Binding of oxygen with a hemoglobin is one of the important cooperative mechanism and is an emerging mathematical research area with wide range of applications in biomedical engineering and medical physiology. To this end, a mathematical model is proposed to study the fractional saturation of oxygen in hemoglobin to understand the binding effect and its stability at various stages. The mathematical formulation is based on the system of ordinary differential equations together with rate equations under different association and dissociation rate constants. The five states of the cooperative systems $Hb, HbO_2, Hb(O_2)_2, Hb(O_2)_3$ and $Hb(O_2)_4$ are modelled and the Hill’s function has been used to approximate the binding effect and saturation of ligand $(O_2)$ with respect to various rate constants. Also, the Adair equation has been employed to interpret the saturation concentrations of oxygen in hemoglobin.
血红蛋白中氧的协同性和分数饱和度的数学分析
血红蛋白$(Hb)$具有良好的协同系统特性,它通常通过体内的红细胞执行氧气和其他必需品。$Hb$的化学作用是与肺部的氧气(O2)(O2)结合,形成氧合血红蛋白(HbO2)(HbO2。氧与血红蛋白的结合是一种重要的协同机制,是一个新兴的数学研究领域,在生物医学工程和医学生理学中有着广泛的应用。为此,提出了一个数学模型来研究血红蛋白中氧的饱和度,以了解结合效应及其在各个阶段的稳定性。数学公式基于常微分方程组以及不同缔合和离解速率常数下的速率方程。对配合体系$Hb、HbO_2、Hb(O_2)_2、Hb。此外,阿岱尔方程已被用于解释血红蛋白中氧的饱和浓度。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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