PSI - Issue 6
Irina Stareva et al. / Procedia Structural Integrity 6 (2017) 48–55
53
Author name / Structural Integrity Procedia 00 (2017) 000 – 000
6
200 l m are shown in Fig. 3 for different
(0, ) t and R a a and
(0, ) r r t for the tube with
The dependencies
zz
r R m m .
corrosion kinetics constants r
Fig. 3: (a) the stresses; (b) the inner radii over time.
Let us assess the mechanochemical effect induced by own weight of the tubes with different lengths and find out if the synergetic growth of stress and corrosion rate affects the process of dissolution noticeably. For this purpose, compare the time * t to reach the residual thickness * h = 5 mm calculated by the following ways: (i) by the proposed numerical algorithm, (ii) by the formula
h z h
( ,0) *
t
(5)
,
*
r a m
a m
(0,0)
(0,0)
r
R R
0 0 t are used instead of equation (4) (i.e. ignoring
l g
at the initial moment
where the maximum stresses
(0,0)
the synergetic growth of stresses and corrosion rate), and (iii) by formula (5) with mechanochemical effect at all). These results are presented in Table 2 for 0.0005 r R m m mm/(year·MPa), other parameters being the same as before. The magnitude “er” indicates the relative error with respect to the numerical solution. It can be seen from the table that the mechanochemical effect is noticeable for only long enough tubes. Moreover, despite the fact that the stress grows very slowly with time, using the simple formula (5) ignoring the synergetic growth of stress and corrosion rate is not reasonable when the mechanochemical effect should be taken into account. 0 r R m m (i.e. ignoring 0.1 r R a a mm/year,
Table 2. The time to reach the residual thickness 5 mm (year) solution 12 m
25 m
50 m
100 m
200 m
74.6570775
74.2875571
73.5828767
72.1976029
69.523973
numerical solution formula (5)
t*
t* er t* er
74.8818
74.8079
74.6671
74.3902
73.8543
0.3%
0.7%
1.5%
3%
6.2%
0 r R m m
formula (5) for
75
75
75
75
75
0.5%
0.9%
1.9%
3.7%
7.3%
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