Bayesian estimation and uncertainty quantification in models of urea hydrolysis by E. coli biofilms

IF 1.1 4区 工程技术 Q3 ENGINEERING, MULTIDISCIPLINARY Inverse Problems in Science and Engineering Pub Date : 2021-02-24 DOI:10.1080/17415977.2021.1887172
B. Jackson, J. Connolly, R. Gerlach, I. Klapper, A. Parker
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引用次数: 3

Abstract

ABSTRACT Urea-hydrolysing biofilms are crucial to applications in medicine, engineering, and science. Quantitative information about ureolysis rates in biofilms is required to model these applications. We formulate a novel model of urea consumption in a biofilm that allows different kinetics, for example either first order or Michaelis–Menten. The model is fit to synthetic data to validate and compare two approaches, Bayesian and nonlinear least squares (NLS), commonly used by biofilm practitioners. The shortcomings of NLS motivate the Bayesian approach where a simple Markov Chain Monte Carlo (MCMC) sampler is applied. The model is then fit to real data of influent and effluent urea concentrations from experiments with biofilms of Escherichia coli. Results from synthetic data aid in interpreting results from real data, where first-order and Michaelis–Menten kinetic models are compared. The method shows potential for general applications requiring biofilm kinetic information.
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大肠杆菌生物膜水解尿素模型的贝叶斯估计和不确定度量化
尿素水解生物膜在医学、工程和科学领域的应用至关重要。需要关于生物膜中尿素分解速率的定量信息来对这些应用进行建模。我们建立了一个新的生物膜中尿素消耗模型,该模型允许不同的动力学,例如一阶或Michaelis–Menten。该模型适用于合成数据,以验证和比较生物膜从业者常用的贝叶斯和非线性最小二乘(NLS)两种方法。NLS的缺点激发了贝叶斯方法,其中应用了简单的马尔可夫链蒙特卡罗(MCMC)采样器。然后将该模型与大肠杆菌生物膜实验的进水和出水尿素浓度的真实数据进行拟合。合成数据的结果有助于解释真实数据的结果,其中对一阶和Michaelis–Menten动力学模型进行了比较。该方法显示出在需要生物膜动力学信息的一般应用中的潜力。
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来源期刊
Inverse Problems in Science and Engineering
Inverse Problems in Science and Engineering 工程技术-工程:综合
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审稿时长
6 months
期刊介绍: Inverse Problems in Science and Engineering provides an international forum for the discussion of conceptual ideas and methods for the practical solution of applied inverse problems. The Journal aims to address the needs of practising engineers, mathematicians and researchers and to serve as a focal point for the quick communication of ideas. Papers must provide several non-trivial examples of practical applications. Multidisciplinary applied papers are particularly welcome. Topics include: -Shape design: determination of shape, size and location of domains (shape identification or optimization in acoustics, aerodynamics, electromagnets, etc; detection of voids and cracks). -Material properties: determination of physical properties of media. -Boundary values/initial values: identification of the proper boundary conditions and/or initial conditions (tomographic problems involving X-rays, ultrasonics, optics, thermal sources etc; determination of thermal, stress/strain, electromagnetic, fluid flow etc. boundary conditions on inaccessible boundaries; determination of initial chemical composition, etc.). -Forces and sources: determination of the unknown external forces or inputs acting on a domain (structural dynamic modification and reconstruction) and internal concentrated and distributed sources/sinks (sources of heat, noise, electromagnetic radiation, etc.). -Governing equations: inference of analytic forms of partial and/or integral equations governing the variation of measured field quantities.
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