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A simplified model of glycoprotein production within cell culture

Published online by Cambridge University Press:  19 October 2016

ANNA B. LAMBERT ,
FRANK T. SMITH  and
AJOY VELAYUDHAN
ANNA B. LAMBERT
Affiliation:
Department of Mathematics, University College London, Gower Street, London, WC1E 6BT email: anna.lambert@ucl.ac.uk, f.smith@ucl.ac.uk
FRANK T. SMITH
Affiliation:
Department of Mathematics, University College London, Gower Street, London, WC1E 6BT email: anna.lambert@ucl.ac.uk, f.smith@ucl.ac.uk
AJOY VELAYUDHAN
Affiliation:
Department of Biochemical Engineering, University College London, Gower Street, London, WC1E 6BT email: a.velayudhan@ucl.ac.uk
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Abstract

Complex biological products, such as those used to treat various forms of cancer, are typically produced by mammalian cells in bioreactors. The most important class of such biological medicines is proteins. These typically bind to sugars (glycans) in a process known as glycosylation, creating glycoproteins, which are more stable and effective medicines. The glycans are large polymers that are formed by a long sequence of enzyme catalysed reactions. This sequence is not always completed, thus leading to a heterogeneous glycoprotein distribution. A better comprehension of this distribution could lead to more efficient production of high quality drugs. To understand how the manufacturing process can affect the extent of glycosylation of protein, a non-linear ODE model of glycoprotein production is developed which describes the bioreactor configuration as well as the protein production and glycosylation reactions within the cell. The entire system evolves eventually to a stable steady state. The earlier evolution is critical however, as the amount of product produced and its quality varies over time. The model is considered as two coupled systems: the bioreactor submodel and the glycosylation submodel. To investigate the early time evolution within the bioreactor submodel, analytical and numerical properties are derived using matched asymptotic expansions and a finite difference scheme for a range of initial conditions. This leads to qualitatively different regimes for aglycosylated protein production, which affect the glycosylation submodel. The discrete glycoprotein distribution is approximated as continuous and written as a first-order PDE, with good agreement between the discrete and continuous models. The PDE is found to admit shocks, but the existence of these shocks is dependent on the early time evolution within the bioreactor submodel and leads to higher levels of glycosylation at early time. This suggests that changing the bioreactor configuration can lead to higher quality product at certain times.

Keywords

Mathematical ModelGlycosylationPost-translational modificationBioreactor
Type
Papers
Information
European Journal of Applied Mathematics , Volume 28 , Issue 4 , August 2017 , pp. 535 - 561
Copyright
Copyright © Cambridge University Press 2016 

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