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The impregnation model is limited to the following assumptions:
_ Chemical impregnation follows Fick’s second law of diffusion.
_ The model considers axial and radial diffusion. Both axial and
radial diffusion coefficients are independent of radial and axial
position in the cylindrical samples. However, radial and tangential
diffusion are not distinguished and are treated equally.
_ The solute concentration (NaOH) in the impregnation solution
remains constant.
_ The temperature is uniform throughout the sample.
_ No chemical reactions occur between the matrix and the diffusing
chemicals at the temperature of impregnation.
_ The diffusion coefficient of NaOH into wood is considered to be
independent of pH (valid for concentrations > 1 mol L–1).
_ Despite swelling, the sample geometry remains invariant with time.
In the present model, D is assumed to be dependent only on pressure, temperature
and the pore structure of the chip sample.
The pressure influence on diffusion can be expressed by extending the Arrhenius-
type equation [Eq. (49)]:
D _ D 0 _ __ T _
_ Pm _ Exp _ _
EA
RT _ _ _66_
where:
_ D = diffusion coefficient, cm2·s–1
_ D0 = diffusivity constant, cm2 s–1·K–0.5
_ p = dimensionless pressure term (i.e., the ratio of absolute pressure
to atmospheric pressure)
_ m= pressure power constant
Considering all of the assumptions made above, the diffusion process can be
described by Fick’s second law of diffusion [35]. Its differential form in cylindrical
coordinates is given by Eq. (67):
∂ C
∂ t _
r _
∂
∂ r
r _ Dr
∂ C
∂ r _ _
∂
∂ z
Dz
∂ C
∂ z _ _ ___ k _ Cn _67_
where C is the concentration of the diffusing species at the position (r, z), k is the
reaction constant between chemical and matrix, n is reaction order, r is radial
direction and z is axial direction.
152 4 Chemical Pulping Processes
If it is assumed that no chemical reaction (of relevance) takes place, the term
k · Cn can be eliminated from Eq. (67).
Radial and axial diffusion are investigated separately. Thus, the radial directional
impregnation is isolated from the axial one by sealing the outer surface in
the radial and axial directions. The surfaces were sealed with an appropriate sealing
material, thereby creating impermeable barriers. The open faces represent
then either the axial or the radial surfaces (Fig. 4.14).
Sealed surfaces
radial
axial
A B
Fig. 4.14 Sketch of the wood sample prepared for unidirectional
impregnation according to Kazi and Chornet [57].
(A) For radial impregnation, the axial surfaces are impermeable;
(B) for axial impregnation, the radial surfaces are
impermeable.
Equation (67) is divided into two separate equations: one for radial concentration
and one for axial concentration only. Thus, it is assumed that there is no interaction
between radial and axial diffusion processes.
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| Comparative Evaluation of Diffusion Coefficients | | | Examples and Results |