3.2. Gas holdup correlationIn the p

3.2. Gas holdup correlation
In the present experiments, the parameters are the superficial gas velocity and the initial liquid height. Hence a dimensionless group for correlating the gas holdup must include JG and H0 as the characteristic velocity and length. The Reynolds ReH, Weber WeH and Froude numbers FrH are possible dimensionless groups including JG and H0, e.g. ReH = qLJGH0/lL, WeH = qLJG2H0/r and
JG
FrH 1⁄4 pffiffiffiffiffiffiffiffi ð3Þ
gH0
where qL is the liquid density, lL the liquid viscosity, r the surface tension, and g the magnitude of the acceleration of gravity.
The measured aG are plotted against FrH in Fig. 9. The aG increases as FrH increases. Regimes 1 and 2 appear at small and large FrH, respectively. All the data collapse onto a single curve. Hence FrH well correlates aG in both regimes for a wide range of H0 and JG. On the other hand, neither ReH nor WeH correlate the aG data.
For FrH [ 0.025, aG almost linearly increases with increasing FrH. The increasing rate of aG in regime 2 decreases as FrH increases. In other words, aG is to be proportional to FrH as FrH goes to zero and aG approaches a certain asymptote as FrH becomes larger and larger. The following functional form satisfying these charac- teristics can be used to express aG:
a1⁄4C1FrH ð4Þ G 1þC2FrH
where C1 and C2 are coefficients.
Applying the least-square fitting to the data without accounting
for the dependency of the coefficients on the flow regime yields (C1, C2) = (9.44, 15.7). Eq. (4) with these coefficients is compared with the data in Fig. 9. The agreements are fairly good. More accu- rate evaluations can be obtained by accounting for the dependency of the coefficients on the flow regime, that is,
h i
a 1⁄4 max a CR1;CR1;Fr ; a CR2;CR2;Fr ð5Þ G G12HG12H