Rheological effects of micropolar slime on the gliding motility of bacteria with slip boundary condition

Rheological effects of micropolar slime on the gliding motility of bacteria with slip boundary condition

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Gliding bacteria are virtually everywhere.These organisms are phylogenetically diverse with their hundreds of types, different shapes and several modes of motility.One possible mode of gliding motility in the rod shaped bacteria is that they propel themselves by producing undulating waves in their body.Few bacteria glides near the solid surface over the slime without any aid of flagella so the classical Navier-Stokes equations are incapable of explaining the slime rheology at the microscopic level.Micropolar fluid dynamics however provides a solid framework for mimicking bacterial physical phenomena at both micro and nano-scales, and therefore we use the micropolar fluid to characterize the rheology of a thin layer of slime and here its dominant microrotation effects.

It is also assumed that there is a certain degree of slip between slime and bacterial undulating surface and also between slime and solid substrate.The flow equations are formulated under long wavelength and low Reynolds number assumptions.Exact expressions for stream function and pressure gradient are obtained.The speed of the gliding bacteria is numerically calculated by using a modified Newton-Raphson method.Slip effects and effects of non-Newtonian slime parameters on bacterial speed and power are also quantified.

In addition, when the glider is fixed, the effects of slip and rheological properties of micropolar slime parameters on the velocity, micro-rotation (angular velocity) of spherical slime particles, pressure rise per wavelength, pumping and trapping phenomena are also soderhamn ottoman cover shown graphically and discussed in detail.The study is relevant to emerging biofuel cell technologies and also bacterial biophysics.Keywords: Gliding bacteria, Undulating surface model, Micropolar fluid, Slip effects, Exact solution, Modified Newton-Raphson method.