Kinetics of suicide substrates steady-state treatments and computer-aided exact solutions

Shinobu Tatsunami , Nagasumi Yago , Masanao Hosoe
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引用次数: 66

Abstract

A steady-state differential equation that describes the kinetics of suicide substrate was derived for a scheme presented by Walsh et al. (Walsh, C., Cromartie, T., Marcotte, P. and Spencer, R. (1978) Methods Enzymol. 53, 437–448). Using its analytical solutions, the progress curves of substrate disappearance, product formation and enzyme inactivation were calculated for a hypothetical model system, and were compared with the exact solutions which were obtained by the numerical computation on a set of rate equations. The results obtained with the present analytical solutions were much more consistent with the exact solutions than those obtained using Waley's solutions (Waley, S.G. (1980) Biochem. J. 185, 771–773). The most important factor for a system of suicide substrates was found to be the term (1 + r)μ instead of as proposed by Waley, where r is the ratio of the rate constant of product formation to that of enzyme inactivation and μ is the ratio of initial concentration of enzyme to that of suicide substrate. In cases where this term has a value greater than unity, all the molecules of suicide substrate are used up leaving some enzyme molecules still active. To the contrary, in cases where the term has a value smaller than unity, all the enzyme molecules are inactivated with some molecules of suicide substrate being left unreacted. When the term is equal to unity, then all the enzyme molecules are inactivated and all the molecules of the suicide substrate are converted. Practical methods for estimating kinetic parameters are described.

自杀底物的动力学、稳态处理和计算机辅助精确解
Walsh等人提出了一个描述自杀底物动力学的稳态微分方程(Walsh, C., Cromartie, T., Marcotte, P. and Spencer, R. (1978) Methods enzymatic . 53,437 - 448)。利用其解析解,计算了一个假设模型体系的底物消失、产物生成和酶失活过程曲线,并与一组速率方程数值计算得到的精确解进行了比较。与使用Waley的溶液(Waley, S.G. (1980) Biochem)获得的结果相比,使用目前的解析解获得的结果与精确解更加一致。J. 185,771 - 773)。对于自杀底物体系来说,最重要的因子是项(1 + r)μ,而不是Waley提出的rμ,其中r是产物形成速率常数与酶失活速率常数之比,μ是酶的初始浓度与自杀底物的初始浓度之比。在这一项的值大于1的情况下,所有的自杀底物分子都被用完,留下一些酶分子仍然活跃。相反,当该项的值小于1时,所有的酶分子都失活,一些自杀底物分子没有反应。当这一项等于1时,所有的酶分子都灭活了所有自杀底物的分子都转化了。描述了估算动力学参数的实用方法。
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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