Implementation of non-linear mixed effects models defined by fractional differential equations.

IF 2.2 4区 医学 Q3 PHARMACOLOGY & PHARMACY Journal of Pharmacokinetics and Pharmacodynamics Pub Date : 2023-08-01 DOI:10.1007/s10928-023-09851-1
Christos Kaikousidis, Aristides Dokoumetzidis
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Abstract

Fractional differential equations (FDEs), i.e. differential equations with derivatives of non-integer order, can describe certain experimental datasets more accurately than classic models and have found application in pharmacokinetics (PKs), but wider applicability has been hindered by the lack of appropriate software. In the present work an extension of NONMEM software is introduced, as a FORTRAN subroutine, that allows the definition of nonlinear mixed effects (NLME) models with FDEs. The new subroutine can handle arbitrary user defined linear and nonlinear models with multiple equations, and multiple doses and can be integrated in NONMEM workflows seamlessly, working well with third party packages. The performance of the subroutine in parameter estimation exercises, with simple linear and nonlinear (Michaelis-Menten) fractional PK models has been evaluated by simulations and an application to a real clinical dataset of diazepam is presented. In the simulation study, model parameters were estimated for each of 100 simulated datasets for the two models. The relative mean bias (RMB) and relative root mean square error (RRMSE) were calculated in order to assess the bias and precision of the methodology. In all cases both RMB and RRMSE were below 20% showing high accuracy and precision for the estimates. For the diazepam application the fractional model that best described the drug kinetics was a one-compartment linear model which had similar performance, according to diagnostic plots and Visual Predictive Check, to a three-compartment classic model, but including four less parameters than the latter. To the best of our knowledge, it is the first attempt to use FDE systems in an NLME framework, so the approach could be of interest to other disciplines apart from PKs.

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由分数阶微分方程定义的非线性混合效应模型的实现。
分数阶微分方程(FDEs),即导数为非整数阶的微分方程,可以比经典模型更准确地描述某些实验数据集,并已在药代动力学(PKs)中得到应用,但由于缺乏适当的软件,其更广泛的适用性受到阻碍。在本工作中,介绍了NONMEM软件的扩展,作为FORTRAN子程序,允许使用fde定义非线性混合效应(NLME)模型。新的子程序可以处理任意用户定义的具有多个方程和多个剂量的线性和非线性模型,并且可以无缝集成到NONMEM工作流程中,与第三方软件包配合良好。子程序在参数估计练习中的性能,用简单的线性和非线性(Michaelis-Menten)分数PK模型进行了模拟评估,并将其应用于安定的实际临床数据集。在模拟研究中,对两种模型的100个模拟数据集分别进行了模型参数估计。计算相对平均偏倚(RMB)和相对均方根误差(RRMSE),以评估方法的偏倚和精度。在所有情况下,人民币和RRMSE都低于20%,显示出较高的准确性和精度。对于地西泮的应用,最能描述药物动力学的分数模型是一个单室线性模型,根据诊断图和视觉预测检查,它与三室经典模型具有相似的性能,但比后者包含的参数少4个。据我们所知,这是第一次尝试在NLME框架中使用FDE系统,因此该方法可能对PKs以外的其他学科感兴趣。
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来源期刊
CiteScore
4.90
自引率
4.00%
发文量
39
审稿时长
6-12 weeks
期刊介绍: Broadly speaking, the Journal of Pharmacokinetics and Pharmacodynamics covers the area of pharmacometrics. The journal is devoted to illustrating the importance of pharmacokinetics, pharmacodynamics, and pharmacometrics in drug development, clinical care, and the understanding of drug action. The journal publishes on a variety of topics related to pharmacometrics, including, but not limited to, clinical, experimental, and theoretical papers examining the kinetics of drug disposition and effects of drug action in humans, animals, in vitro, or in silico; modeling and simulation methodology, including optimal design; precision medicine; systems pharmacology; and mathematical pharmacology (including computational biology, bioengineering, and biophysics related to pharmacology, pharmacokinetics, orpharmacodynamics). Clinical papers that include population pharmacokinetic-pharmacodynamic relationships are welcome. The journal actively invites and promotes up-and-coming areas of pharmacometric research, such as real-world evidence, quality of life analyses, and artificial intelligence. The Journal of Pharmacokinetics and Pharmacodynamics is an official journal of the International Society of Pharmacometrics.
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