Abstract
A mathematical model of transient equilibrium inhomogeneous two-phase two-component water-steam-air flow has been developed. The idea of a quasicontant slip is used. The set of four differential equations is transformed into non-conservative form, so that it can be used directly to build the numerical solution in the time space domain with highly effective numerical methods. From the steady-state system an expression is found defining the critical mass flow rate. There is a good agreement with the existing theories for the limiting cases of a missing phase of component.
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