A Mathematical Model of Salivary Gland Duct Cells

Autor: Shan Su, John Rugis, Amanda Wahl, Sam Doak, Yating Li, Vinod Suresh, David Yule, James Sneyd
Rok vydání: 2022
Předmět:
Zdroj: Bulletin of Mathematical Biology. 84
ISSN: 1522-9602
0092-8240
DOI: 10.1007/s11538-022-01041-3
Popis: Saliva is produced in two stages in the salivary glands: the secretion of primary saliva by the acinus and the modification of saliva composition to final saliva by the intercalated and striated ducts. In order to understand the saliva modification process, we develop a mathematical model for the salivary gland duct. The model utilises the realistic 3D structure of the duct reconstructed from an image stack of gland tissue. Immunostaining results show that TMEM16A and aquaporin are expressed in the intercalated duct cells and that ENaC is not. Based on this, the model predicts that the intercalated duct does not absorb Na$$^+$$ + and Cl$$^-$$ - like the striated duct but secretes a small amount of water instead. The input to the duct model is the time-dependent primary saliva generated by an acinar cell model. Our duct model produces final saliva output that agrees with the experimental measurements at various stimulation levels. It also shows realistic biological features such as duct cell volume, cellular concentrations and membrane potentials. Simplification of the model by omission of all detailed 3D structures of the duct makes a negligible difference to the final saliva output. This shows that saliva production is not sensitive to structural variation of the duct.
Databáze: OpenAIRE
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