Wall shear stress and void fraction in Poiseuille bubbly flows: Part I: simple analytic predictions

Abstract

Upward, co-current bubbly flows in a vertical rectangular duct are investigated at low liquid Reynolds numbers. The conditions considered are such that the pseudo-turbulent stresses remain negligible compared to the viscous stresses. The void fraction transverse distribution is idealised as step-functions and is then inserted in the conservation equations supplemented by appropriate closure laws. Analytical expressions are then obtained for the axial velocity profiles, for the lineic gas fraction and for the wall friction. The sensitivity of these quantities to the void distribution, characterised by the void fraction and the width of the three layers introduced, is discussed. It is shown that differential buoyancy effects govern the modification of the liquid velocity profiles. Notably, void peaking near walls is able to induce a wall shear stress many times higher than its single-phase flow counterpart at the same liquid flow rate. Also, the presence of a near wall region free of gas favours the onset of downward directed secondary flows. All these features correspond to experimental observations, and a few quantitative comparisons are also presented which support the validity of the model even in case of void coring. A companion paper (part II) will be devoted to systematic comparisons between predictions and experiments in the case of axisymmetric Poiseuille bubbly flows.