- Email: [email protected]
On stress concentrations in thick plates
ON STRESS CONCENTRATIONSIN THICK PLATES (0 KONTSENTRATSII PMM
NAPRIAZHENII
V TOLSTYKH
PLITAKH)
Vol. 30, No. 5, 1966 pp. 963-970 O.K. AKSENTIAN (Rostov on the Don) (ReceivedOctaber30,
Investigation
is continued
the Kirchhoff
hypothesis,
method developed
1. Consider
of applied
of stress
plate bending
concentration
theory,
problems
based
by means
on of the
in [ 1 and 21. the problem of axisymmetric
2h with an opening Introduce
on the applicability to the solution
1965)
which is bounded
dimensionless
plate are traction-free and is free of shear.
coordinates
bending
by the circular s, n and [(Fig.
while the cylindrical
surface
Here, m is an odd integer,
of an infinite cylindrical 1). Assume
is subjected
k is a constant
plate of a thickness
surface
r with radius
that the flat faces
to a normal load N=k of proportionality
a.
of the gm,
and
h= h/a. Applying
the method described
the boundary r,
in [l
and 21, we obtain
expressions
for the stresses
on
which are of the form
(1.1)
On stress
+ (v -
+ ; [(v- 1) sp(5)
concentrations
1147
in thick plates
$q,,=,
1)
1 $4
-
r,n,, (s;)cpa-
I+... cp2 J I
:!npK)
p=1
ZnzIr=-2tlLh
-g
rprp(5) cp2 +
t'tlh+
aA$o 5') 7
(1 -
I7I=O
p=1
; rp (5) p=1
-
(Tp%3 ++ cpPj} + *. .
p=1
p=1
z,, = 0,
0,
7,, =
(1.3)
1
v=m
(1.5)
Here ~1 is the shear ratio rp (0,
in [ 1 and 31, 2y
The
while
In (1.1) circle,
the even-numbered
to (1.4),
with $0 (n) being
opening
as given
the constants
quadrant.
system
are obtained
Pi of equations.
The boundary
It is readily bending
theory
From (1.6).
conditions
seen based
for I/Y, (n) are given
that the above
we have
The boundary
from the boundary
on the Kirchhoff
Table
in the fourth
of the above.
The roots
in the order of increasing roots
being
1 con-
are located
those
magnitude,
in the first
are in the fourth quadrant.
for the bending
theory.
part.
which
The roots
are conjugates
tii (n) are biharmonic
the solution
by the applied
c
roots
the quantities
roots
computer.
of forty roots
the odd-numbered quadrant
out over
were obtained
are numbered
1
is carried
first 80 of these
in the first FIG.
of 4 of function
real
the values
quadrant
‘i, (&J,
which have a positive
with aid of an electronic tains
(T is Poisson’s
are the roots
P 1. Summation
sin (2) -
the roots
modulus,
d = l/s); n,, (Q,
are known functions
and rp (5)
given z-t
calculations
(in
coincide
functions
of an infinite values
conditions
for the exterior plate
of a
with a circular
of the functions on r by means
$ri (n) and of an infinite
by
with the conditions
of the applied
plate
hypothesis.
k +o=Bo-~qv+l)(nz_r_)
:j
ln(~~?-l)
(1.7)
1148
0. K. Aksentian
P
5
7
Rerp
3.7488381
6.9499798
IO. 119259
K3.271274
Imrp
1.3843390
1.6761046
1.8583834
1.9915705
P
11
1
3
Re yp 19.579408 Imrp P
13
15
22.727036
25.873384
2.2573196
2.1833970 21
38.451800
Im 7,
2.476&020
2.5188989
P
31
Re rP 51.02’1838 fm rP P
2.6599693 41 2.7939639
P
51
Im r, P
2.8995’tZl 61 98.159562
49 2.8801345
57
59
91.875516
2.9182217
2.9362345
2.9536?82
65
67
104.44351
107.58546
3.0744514
79.307064
2.8599 Ii33
55
117.01119
2.7CQ8KW
76.164856
88.733453
3.0176753
73
39 sn. 595487
2.7445856
85.591359
3.0024137
2.6282535
37 60 .L,j2Q7:;
63
71 3.0~~0~
2*5W3901
101.30155
2.9866716
Re y, 113.86930 Imrp
2.8389026
53
29 47.881869
47
73.0226~
2.8169378
2.4299576
44.738731
45
69.880291
Re rp 82.449231
P
2.7179394
43
Im r,
Re 7,
57.310371
2.6897936
Re yp 66.737923
Imrp
2.5580671) 35
54.167664
32.163617
2.3’787569 27
41.595390
33
19
29.018831
25
35.307902
2.0966252
17
2.3217134
23
Re y,
9 16.429870
2.9704179 69 110.72739
3.0324849
75
77
120.15307
123.29494
3 -0876925
95.017552
3.0468686 79 t26.43680
3 *f~59~
3.1131672
In order to exclude rigid body motion of the plate, we set B0 = 0. To determine cpz , we have an infinite set of linear algebraic equations &ST? (c=a 7t W-7
P “)“(r
toss rp) t
--r
P)
Iv (rt i r,P -
(r, -
1,Fl cpI -
+
(&se
yt -1)
ct*=Ft*
P+t
(La) (t = 1, 2, 3, . . .) --I
which may be written in the form IIM II- Iha II = II Ff, II Here llMl[ is the complex matrix of the left-hand side of (1.8) and llc&
(1.9) and llF,,[[
On stress
are, respectively,
concentrations
in thick
the column matrix of the unknowns
1149
plates
and that of the right-hand
side of
(1.8). To transform
(1.8)
into real form, set Cur =
Noting that yzn_t
is the conjugate
%-1.2
=
corresponding
order of the system
f 211-1,~--
-
is halved.
to first twenty roots
(1.10)
1, 2, 3,.
(n =
van,2
shown that
If we limit ourselves
Introducing
P --V x2nk
27+1,2'
where \lW,ll is th e matrix of the transformed
20, 18, . . .
(1.12)
by truncation.
of the loading
or geometry
of the first fourteen
mation being insufficient m = 5. The results
1
i
real system. With the aid of a computer,
i
11
x j=
-
i
0.89.10-6
i m=5
xj=
6 -
i
0.318.10-4 11
xj=-o.12.10-5
To illustrate
of rank
so that the results
problem.
The inverted
Calculations
matrices
we’re carried
i.e.
it is
of the matrix inpermit the deof the approxi-
out for m = 3 and
2.
2 -0.12745.10-3
2 3 0.1993.10-4
7 -0.400~10-5 12 0.30.10-8
1
xj=0.18609.10-2
matrices
the matrix is universal,
of the plate,
for the remainder.
6
xj=-On.9967.10-5
(1.14)
out of the twenty unknown x., the accuracy
are shown in Table
xf=0.180170.10-2
m=3
(1.13)
II“j II = IIf jz II
TABLE i
. .)
inverted.
may be used for any plate bending
termination
2, 3,.
2n-1,2
I‘t was shown that, for a given material,
In [ll, version
is solved
, 4 were successively
independent
the
the notation
in the form IIMl II.
System (1.14)
boundary
side semi-plane,
(IIX1,
we can write (1.9)
(1.11)
fm, 2 = -$ Im F2,_l,2
Re F2,+1,2,
IL --U xm-lk
. .)
to twenty
yp lying in the right-hand
will be equal to twenty.
CLk
ivn,
of yzn, it can be easily
van-1,2 =
u2n,29
so that the order of the real system layers
uPa -
2 -0.689.10-4 7 -0.18.10-5 12 -0.7.10-a
the rate of convergence
8 -0.119.10-5 13 -0.42.10-6
4
9
8 -0.842.10-b 13 -0.7.10-0
of the process
-0.797.10-5 10
-0.177.10-5
0.15.10-6
14 0.23.10+
3 0.1785.10-3
5
-0.7332.10”
4 -0.1152.10-a 9 -0.20.10-5
5 0.119.10-4 10 -0.24.10-S
14 -0.2.10”
used in the determination
of xi,
1150
O.K. Aksentian
we list various superscript
approximations
indicates
x2, zll and x1, as the most typical (Table
of zI,
the order the system
from which the particular
3). The
determination
was
made. TABLE
W
m-5
(n) “13
-ri
n
m=3
G 8 10 12 14 lG 18 20
0.1803134.10-” 0.1801734. IO-2 0.1801719~10-2 0.1801708.10-2 0.1801705~10-2 0.1801703.10-3 0.1801702. IO-2 0.1801702~10-*
G 8 10 12 1’1 IG 18 20
0.187135.10-” 0.186330.20-’ 0.186181. IO-” 0.186139.10-2 0.186119.10-” 0.18G109.10-2 (~.18GlO1.10-” 0.186098.10-2
-0.128097.10-3
-0.127338.
IO-3 _ 0.127381.10-3
-0.127$10.10-3 -0.127429.10-3 --0.1274339.10-3 --0.127143.10-3
-0.458.10-6 -0.436.10-G -mO. 4.28. IO-6
0.28.10-6 O.25.1O-6 0.24.10-e
-0:69875. -0 731 $5. IO--’ lo-‘& -0. ti8719. IO-4 -o.m7;2.10-1 -0.fi8802. IO--0.128.10-5 -0.74.10-” -0.70.2OP
4. KS’,‘, .1OW ---0 . G&l . II I- 1 -0.G8919.10~~
-0.83.10-7 -0.13. IO-” --0.16.10-”
with which the xi were obtained
is sufficient
for
purposes.
Utilizing
(1.1)
to (1.4),
of the state
of stress
formulation.
Let us examine
points.
‘i . IO-3
-0.127J0
We will see later that the accuracy practical
3
Here and hereinafter
for the stresses
(1.7),
we obtain, %I,
These
a first approximation
contain
the infinite
the rate of convergence we denote
series
of these series
the coefficients
of all components of the boundary
layer
at the moat typical
of hz in the series
expressions
os and Tnz on r by ani, uSi and Tnzi, respectively.
us,
Substituting and (1.3),
we may now obtain
in the plate.
(l.lO),
(1.13)
and the values
previously
obtained
for xi into (1.1)
for m = 3,
I r.c=*1 = +- k{O.GOOO + 149.3082 -
- I.102 - 0.69 - 0.45 -...].lO-2} Tnzllr,t=O = -k[7.4879-10.885+4.919
z
1.924 -
+ k (0.6000
-2.179+
Z-
2.792 +
0.405)
-
1.806 =
+ k-l.005
0.919-0.31+0.06-.
. .].10-2s
k.O.0001
For m = 5, we obtain
qr
cc+1 = J- k (0.4286 + (52.492 -i- 13.056 - 0.044-1.80-1.68-
0.9 -:..]:AO-2) _, + k (0.4286 -t 0.598) = tkl.027 = - k [5.38G - 11.684 -j- 10.42 - 6.63 -+ 4.0 %*, Ir,+l z - k0.004
1.28 -
The boundary
conditions
Comparing [=
the immediately
f 1, where
1.4 -
. . .] 10-2~
yield
c,,i I’,c=:*1 points
2.5 +
one would
=
+ h,h,
preceding expect
(1.15)
q,z /I’,<_ 0 = 0
results
with (1.15),
convergence
to be the
we see that even at the slowest,
the series
results
On stress
concentrations
in thick plates
qr -QJ
-94
-a;
-a,
-a
FIG. 2 using
seven
vergence
terms do not differ significantly
Fig. 2 shows
curves
of successive
Kirchhoff
solution;
solutions
taking into account
the broken line is the exact
Now let us calcnlate is usually
calculated a,lr
c=
dete;ination
ones.
the basis
the first approximation for determining
from formula (1.2).
of c
At other points,
con-
(~,,r[ f(c)
u,I
of
curves
one, two and to the
1, 2 and 3 correspond
at the points
r
shown that’a
[=
factor.
first approximation
solving
the infinite
f 1. This us/ r
may be
of
system
for the
.
1) RP (+I)
and (1.2) +
yr,$)
and taking into account (+I)
=
*
to
layer terms, respectively.
concentration
without
using
in the figure correspond
solution;
the stress
but it is easily
(1.27) into (1.1) (Y -
for
lines
one, two and three boundary
* 1 for arbitrary m may be obtained
Substituting
we obtain
approximations
layer terms with m = 3. The straight
three boundary
stress
from the exact
is even better.
W,,”
=
(1.11)
2*s,
(&I)
as well as
1152
O.K.
%I1
be1
I r,
I r,c=*1= --fk
I;-+1
f k (-
Aksentian
I“-+svp m
+
2
2
p=1, 3,
1
ReVrp2cp2) . ..
&+4(v-l)+pzI,3,
I
Re(THICK,)
Ix
But cn1I
r, c=c1=
f
k
Hence
p-1,
k
2
Re (rp2cp,)
no-1
8pv
3, . . .
m-12
Whereupon, we have
QelJr.&-+l=fk In (1.16),
tion factor is not obtained
asymptotically
theory, in the first approximation,
m-l
+ --
2v
the first term in the braces corresponds
From (1.16) it is clear that in this case,
theory is 22%
v-l
{-&
from the Kirchhoff as m increases.
(1.16)
1
to the solution
form/= 1 of course,
increases
m+2
of applied theory.
the exact stress
concentra-
theory. The error of this For m = 3, the error of applied
; for m = 5 it is 44% ; for m = 7 it is 66%, etc.
At other points on the surface r the error will also not be small. Fig. 2 shows the curves of the function
cSl\ p (5). as calculated
by means of the Kirchhoff
theory (straight
line) as well as those using one, two and three boundary layer terms (1, 2 and 3). 2. As discussed solution
in [l],
the next step in constructing
to the problem is the determination
The boundary conditions
From (2.1).
the asymptotic
expansion
of the
of I+$~(n) and c
P3’
for $r (n) are given by
we have
(2.2) As before,
we set B, = 0. The system of equations II M II
. II~13II = IIF
for cp3 has the form
t3 II
(2.3) P+1
(L==l, Here llfnll is the same matrix asin system (1.8). same manner as system (1.9),
2, :i,.
The system (2.3) is solved
noting that cZn 3 is the conjugate .
of czn_r
.) in the
3 and setting
I
On stress
C2~-l,3-
Thereupon, as
it is clear
yi system
$
it is possible
from (2.3)
concentrations
in thick
(n=i,
(Yzn_1-
iY*)
to obtain
the values
that with fourteen
plates
. .)
2, 3,.
(Table
known values
1153
(2.4)
4) of the first ten
unknown
yi,
of xi the order of the truncated
will also be fourteen. TABLE j=
1
2
~j=-0.36003.10-3 m=3
j=
i -=
1
rn-= 5 j=
6
yj=
TO illustrate approximations
! 10 12 14
m=3
m = 5
4 6 8 10 12 14
-0.37288.10-3 -0.37072.10-3 -0.37037.10-3 -0.37036.10-3 -0.370354.10-3 -0.370352~10-3
We may now determine vergence previously
of the series determined
determining
approximations
of y,. into (1.1)
-0.49.10-7 -0.46.10-’
O.lO8.1O-e 0.1075.10-a
0.23.10-7 0.27.10-7
0.190.10-a 0.191~10-a
of the stress
in this step will now be checked. vafnes
yi, successive
5
-0.61675.10-a -0.62075.10-8 -0.62262.10-3 -0.62258.10-a -0.62255.10-a -0.62253. 1O-3
the second
0.3.10-7
5)
-0.4938. IO-* -0.50775.10-4 -0.56738.10-4 -0.50732.10-4 -0.50726.10-4 -0.50724.10-4
-0.36050.10-3 -0.35991~10-3 -0.35998.iO-3 -0.36000.10-a -0.360014.10-3 -0.360020.10-3
10
0.19.10-a
of the process
TABLE
0.38.10-a
9
0.33.10”
the rate of convergence
5
0.1155.10-4
8
0.48.10-a
of yI , ya, yp and yIO are shown (Table
4
-0.4*10-7 4
-0.1661.10-4
7
0.221.10-5
10
0.11.10-6 3
-0.6225.10-4
0.200*10-6
9
-0.5.10-7
2
5
0.9050.10-5
8
0.21.10-6
0.37035.10-3
4
0.190.10-5
7
0.26.10-G
yj== -
3
-O.5O72.1O-4
6
yj=
4
and (1.3).
components.
Substituting we obtain,
(2.2),
(2.4)
The conand the
for m = 3,
u,~I~,~=~~= +k{[~1.7504+0.714+0.498+0.080+ 0.062+. . .]+ [10.71918- 0.1446 - 0.1832 - 0.1518 - 0.0456 - 0.0242 - 0.0138 - . . .]}1O-~z z + k (- 0.1040 + 0.1016) = T kO.0024 + 1.504 - 0.38: %rza Ir,c=o = - k (if.3572 + [- 2.03747 - 0.6441 + 0.2492 - 0.9939
= -k
(0.0249
-
-j- 0.03 - 0.02 + + 0.0359 - 0.013 0.0251) =
k 0.0002
. . .] + -
0.004
+
. . .]} 10-g =
1154
while
0. K. Aksentian
for m = 5, we shall have
@Ttz Ir, L-3 1 =: -4; k {[+ (11.3542 + 1.4340 +
12.3362 0.0244 z
%z2
=
I'. c-0
1.i650 0.0850
+ k (-0.1285
+
0.290 +
-
0.0664
+
0.1259)
0.242 +
-
9.0432 = T
0.126 -
-;-
0.0254
. . .] + -
. . .])
10-a z
kO.0026
k{(1.774+ 1.221--0.894+0.40-0.15+. . .]+ - 0.261 + 0.419 - 0.236 + 0.125 - 0.06 + 0.03 + . . .]} 10-Y z - k (0.0235 - 0.0237) = k0.0002
-
+ [-2.384 Comparing
-
the remits
thus obtained
on and ~na on the boundary
f,
with the values
we find that convergence
given in (1.15) of the second
for the stresses approximation
is
also satisfactory. Now consider
the stress l=
ing the infinite
system
Gs2
i
of equations
utilizing =
r,c=+1
In a manner similar to that of section
* t may also be obtained
ahown *ataalr,
Calculations
aair.
to determine
(2.5) yield,
k $
f
for the second c pJ.
1, it is readily
approximation
withont solv-
Thus we obtain
for m = 3, 0.0723
j5.35959 --a0228
-
-
0.0916
0.0121
-
0.0069
-
0.0759
-
-...].2O_ZzJt
k-0.135
For m = 5, we obtain OS2
I
r, Z=ctl = $ k $
[5.6771 -
+
0.0332
0.7170
3. The third step of the construction determination
0.0226
-
+ -
0.0122 0.0127
of the asymptotic
of r+!~a (n) and cp4. The boundary
conditions
-
0.0425
--...].fO-a expansion
-u’F: deals
k-O.168 with the
for $a (s) ara given by (3.1)
From (3.1),
we have
(3.2) To determine given matrix, tion Of aa\r
c
, we P4
have the infinite
but, as previously
discussed,
system
of equations
it is easily
* <= f 1 may be obtained without the determination
Calculations
utilizing
(3.3) yield
for m = 3,
with the previonsly
shown that the third approximaof c
P-
Thns, we obtain (3.3)
On stress
c&,
+ ‘/,[1.64360
1.2423+
k”/s{[-
=i
<=,l
+
0.00538
concentrations
-
0.0335+
0.0178
-
1155
in thick plates
0.0170+
0.0034
-
0.0021
0.0014
-
+
0.0013+.
0.00065
-
. .]+
. . .]} 1O-2 zz
=: _+ k.O.O1OO Form 5s31
r,
= 5, we obtain
+*1
=
1.3005
ks,h{[-
T
+ l/z 11.7137 -to.1335
$0.00629
-
0.06460
-
0.0022
+ -
0.0090 0.0018
+ -
0.0061
+
0.0010 -
0.0026 0.0006
+ -
. . .] + . . .], 10-2~
=: + k 0.0113 We now present q?,
c=
approximation
of the asymptotic
+,k [- 0.4667 f k [-. 0.2381
=
cI II’, ++-1
From (3.4)
h -
0.135 112+
0.0100h3 +
h -
0.168 k2 +
0.0113
and (3.5) it is clear
the diameter
of the opening
of
determination
of. the stress
in powers
It is readily
h3 +
that even for x = 2 (i.e.
concentration
when the plate thickness represents
we can recommend
factor be baaed
m = 5
for
. . .]
(3.4)
m = 3
for
. . .I
the third term in the expansion
8% of the sum of the first two terms. As a result, expansion
expansions
f 1
(J, I r,i=_+1 =
twice
a three-term
t3 . 5) is
only 5% to
for x < 2 that the
on the first two terms of the
of h.
seen
from (3.4)
and (3.5)
that, for x = 0.1, the sum of the next two terms
is equal to 3% to 7% of the first term. Thus, for cS may be obtained
from the following
for x < 0.1,
v-l
I r,I;=,1- -fkh[-_++T-
6,
the stress
concentration
factor
expression, m-l
(3.6)
m+2
3
BIBLIOGRAPHY 1.
Aksentian,
O.K. and Vorovich,
(The state of stress 2.
Aksentisn, osnove theory).
3.
Lnr’e,
O.K. and Vorovich,
prikladnoi
PMhf, Vol.
K teorii
sostoianie
plity maloi
tolshchiny
27, No. 6, 1963.
I.I., Ob opredelenii
teorii (On the determination
PMM, Vol. AI.,
I.I., Napriazhennoe
in a thin plate).
kontsentratsii
of stress
napriazhenii
concentrations
using
na applied
28, No. 3, 1964. tolstykh
plit (On a theory of thick plates).
PMM, Vol. 6, Nos.
and 3, 1942.
Translated
by H.H.
2
NAPRIAZHENII
V TOLSTYKH
PLITAKH)
Vol. 30, No. 5, 1966 pp. 963-970 O.K. AKSENTIAN (Rostov on the Don) (ReceivedOctaber30,
Investigation
is continued
the Kirchhoff
hypothesis,
method developed
1. Consider
of applied
of stress
plate bending
concentration
theory,
problems
based
by means
on of the
in [ 1 and 21. the problem of axisymmetric
2h with an opening Introduce
on the applicability to the solution
1965)
which is bounded
dimensionless
plate are traction-free and is free of shear.
coordinates
bending
by the circular s, n and [(Fig.
while the cylindrical
surface
Here, m is an odd integer,
of an infinite cylindrical 1). Assume
is subjected
k is a constant
plate of a thickness
surface
r with radius
that the flat faces
to a normal load N=k of proportionality
a.
of the gm,
and
h= h/a. Applying
the method described
the boundary r,
in [l
and 21, we obtain
expressions
for the stresses
on
which are of the form
(1.1)
On stress
+ (v -
+ ; [(v- 1) sp(5)
concentrations
1147
in thick plates
$q,,=,
1)
1 $4
-
r,n,, (s;)cpa-
I+... cp2 J I
:!npK)
p=1
ZnzIr=-2tlLh
-g
rprp(5) cp2 +
t'tlh+
aA$o 5') 7
(1 -
I7I=O
p=1
; rp (5) p=1
-
(Tp%3 ++ cpPj} + *. .
p=1
p=1
z,, = 0,
0,
7,, =
(1.3)
1
v=m
(1.5)
Here ~1 is the shear ratio rp (0,
in [ 1 and 31, 2y
The
while
In (1.1) circle,
the even-numbered
to (1.4),
with $0 (n) being
opening
as given
the constants
quadrant.
system
are obtained
Pi of equations.
The boundary
It is readily bending
theory
From (1.6).
conditions
seen based
for I/Y, (n) are given
that the above
we have
The boundary
from the boundary
on the Kirchhoff
Table
in the fourth
of the above.
The roots
in the order of increasing roots
being
1 con-
are located
those
magnitude,
in the first
are in the fourth quadrant.
for the bending
theory.
part.
which
The roots
are conjugates
tii (n) are biharmonic
the solution
by the applied
c
roots
the quantities
roots
computer.
of forty roots
the odd-numbered quadrant
out over
were obtained
are numbered
1
is carried
first 80 of these
in the first FIG.
of 4 of function
real
the values
quadrant
‘i, (&J,
which have a positive
with aid of an electronic tains
(T is Poisson’s
are the roots
P 1. Summation
sin (2) -
the roots
modulus,
d = l/s); n,, (Q,
are known functions
and rp (5)
given z-t
calculations
(in
coincide
functions
of an infinite values
conditions
for the exterior plate
of a
with a circular
of the functions on r by means
$ri (n) and of an infinite
by
with the conditions
of the applied
plate
hypothesis.
k +o=Bo-~qv+l)(nz_r_)
:j
ln(~~?-l)
(1.7)
1148
0. K. Aksentian
P
5
7
Rerp
3.7488381
6.9499798
IO. 119259
K3.271274
Imrp
1.3843390
1.6761046
1.8583834
1.9915705
P
11
1
3
Re yp 19.579408 Imrp P
13
15
22.727036
25.873384
2.2573196
2.1833970 21
38.451800
Im 7,
2.476&020
2.5188989
P
31
Re rP 51.02’1838 fm rP P
2.6599693 41 2.7939639
P
51
Im r, P
2.8995’tZl 61 98.159562
49 2.8801345
57
59
91.875516
2.9182217
2.9362345
2.9536?82
65
67
104.44351
107.58546
3.0744514
79.307064
2.8599 Ii33
55
117.01119
2.7CQ8KW
76.164856
88.733453
3.0176753
73
39 sn. 595487
2.7445856
85.591359
3.0024137
2.6282535
37 60 .L,j2Q7:;
63
71 3.0~~0~
2*5W3901
101.30155
2.9866716
Re y, 113.86930 Imrp
2.8389026
53
29 47.881869
47
73.0226~
2.8169378
2.4299576
44.738731
45
69.880291
Re rp 82.449231
P
2.7179394
43
Im r,
Re 7,
57.310371
2.6897936
Re yp 66.737923
Imrp
2.5580671) 35
54.167664
32.163617
2.3’787569 27
41.595390
33
19
29.018831
25
35.307902
2.0966252
17
2.3217134
23
Re y,
9 16.429870
2.9704179 69 110.72739
3.0324849
75
77
120.15307
123.29494
3 -0876925
95.017552
3.0468686 79 t26.43680
3 *f~59~
3.1131672
In order to exclude rigid body motion of the plate, we set B0 = 0. To determine cpz , we have an infinite set of linear algebraic equations &ST? (c=a 7t W-7
P “)“(r
toss rp) t
--r
P)
Iv (rt i r,P -
(r, -
1,Fl cpI -
+
(&se
yt -1)
ct*=Ft*
P+t
(La) (t = 1, 2, 3, . . .) --I
which may be written in the form IIM II- Iha II = II Ff, II Here llMl[ is the complex matrix of the left-hand side of (1.8) and llc&
(1.9) and llF,,[[
On stress
are, respectively,
concentrations
in thick
the column matrix of the unknowns
1149
plates
and that of the right-hand
side of
(1.8). To transform
(1.8)
into real form, set Cur =
Noting that yzn_t
is the conjugate
%-1.2
=
corresponding
order of the system
f 211-1,~--
-
is halved.
to first twenty roots
(1.10)
1, 2, 3,.
(n =
van,2
shown that
If we limit ourselves
Introducing
P --V x2nk
27+1,2'
where \lW,ll is th e matrix of the transformed
20, 18, . . .
(1.12)
by truncation.
of the loading
or geometry
of the first fourteen
mation being insufficient m = 5. The results
1
i
real system. With the aid of a computer,
i
11
x j=
-
i
0.89.10-6
i m=5
xj=
6 -
i
0.318.10-4 11
xj=-o.12.10-5
To illustrate
of rank
so that the results
problem.
The inverted
Calculations
matrices
we’re carried
i.e.
it is
of the matrix inpermit the deof the approxi-
out for m = 3 and
2.
2 -0.12745.10-3
2 3 0.1993.10-4
7 -0.400~10-5 12 0.30.10-8
1
xj=0.18609.10-2
matrices
the matrix is universal,
of the plate,
for the remainder.
6
xj=-On.9967.10-5
(1.14)
out of the twenty unknown x., the accuracy
are shown in Table
xf=0.180170.10-2
m=3
(1.13)
II“j II = IIf jz II
TABLE i
. .)
inverted.
may be used for any plate bending
termination
2, 3,.
2n-1,2
I‘t was shown that, for a given material,
In [ll, version
is solved
, 4 were successively
independent
the
the notation
in the form IIMl II.
System (1.14)
boundary
side semi-plane,
(IIX1,
we can write (1.9)
(1.11)
fm, 2 = -$ Im F2,_l,2
Re F2,+1,2,
IL --U xm-lk
. .)
to twenty
yp lying in the right-hand
will be equal to twenty.
CLk
ivn,
of yzn, it can be easily
van-1,2 =
u2n,29
so that the order of the real system layers
uPa -
2 -0.689.10-4 7 -0.18.10-5 12 -0.7.10-a
the rate of convergence
8 -0.119.10-5 13 -0.42.10-6
4
9
8 -0.842.10-b 13 -0.7.10-0
of the process
-0.797.10-5 10
-0.177.10-5
0.15.10-6
14 0.23.10+
3 0.1785.10-3
5
-0.7332.10”
4 -0.1152.10-a 9 -0.20.10-5
5 0.119.10-4 10 -0.24.10-S
14 -0.2.10”
used in the determination
of xi,
1150
O.K. Aksentian
we list various superscript
approximations
indicates
x2, zll and x1, as the most typical (Table
of zI,
the order the system
from which the particular
3). The
determination
was
made. TABLE
W
m-5
(n) “13
-ri
n
m=3
G 8 10 12 14 lG 18 20
0.1803134.10-” 0.1801734. IO-2 0.1801719~10-2 0.1801708.10-2 0.1801705~10-2 0.1801703.10-3 0.1801702. IO-2 0.1801702~10-*
G 8 10 12 1’1 IG 18 20
0.187135.10-” 0.186330.20-’ 0.186181. IO-” 0.186139.10-2 0.186119.10-” 0.18G109.10-2 (~.18GlO1.10-” 0.186098.10-2
-0.128097.10-3
-0.127338.
IO-3 _ 0.127381.10-3
-0.127$10.10-3 -0.127429.10-3 --0.1274339.10-3 --0.127143.10-3
-0.458.10-6 -0.436.10-G -mO. 4.28. IO-6
0.28.10-6 O.25.1O-6 0.24.10-e
-0:69875. -0 731 $5. IO--’ lo-‘& -0. ti8719. IO-4 -o.m7;2.10-1 -0.fi8802. IO--0.128.10-5 -0.74.10-” -0.70.2OP
4. KS’,‘, .1OW ---0 . G&l . II I- 1 -0.G8919.10~~
-0.83.10-7 -0.13. IO-” --0.16.10-”
with which the xi were obtained
is sufficient
for
purposes.
Utilizing
(1.1)
to (1.4),
of the state
of stress
formulation.
Let us examine
points.
‘i . IO-3
-0.127J0
We will see later that the accuracy practical
3
Here and hereinafter
for the stresses
(1.7),
we obtain, %I,
These
a first approximation
contain
the infinite
the rate of convergence we denote
series
of these series
the coefficients
of all components of the boundary
layer
at the moat typical
of hz in the series
expressions
os and Tnz on r by ani, uSi and Tnzi, respectively.
us,
Substituting and (1.3),
we may now obtain
in the plate.
(l.lO),
(1.13)
and the values
previously
obtained
for xi into (1.1)
for m = 3,
I r.c=*1 = +- k{O.GOOO + 149.3082 -
- I.102 - 0.69 - 0.45 -...].lO-2} Tnzllr,t=O = -k[7.4879-10.885+4.919
z
1.924 -
+ k (0.6000
-2.179+
Z-
2.792 +
0.405)
-
1.806 =
+ k-l.005
0.919-0.31+0.06-.
. .].10-2s
k.O.0001
For m = 5, we obtain
qr
cc+1 = J- k (0.4286 + (52.492 -i- 13.056 - 0.044-1.80-1.68-
0.9 -:..]:AO-2) _, + k (0.4286 -t 0.598) = tkl.027 = - k [5.38G - 11.684 -j- 10.42 - 6.63 -+ 4.0 %*, Ir,+l z - k0.004
1.28 -
The boundary
conditions
Comparing [=
the immediately
f 1, where
1.4 -
. . .] 10-2~
yield
c,,i I’,c=:*1 points
2.5 +
one would
=
+ h,h,
preceding expect
(1.15)
q,z /I’,<_ 0 = 0
results
with (1.15),
convergence
to be the
we see that even at the slowest,
the series
results
On stress
concentrations
in thick plates
qr -QJ
-94
-a;
-a,
-a
FIG. 2 using
seven
vergence
terms do not differ significantly
Fig. 2 shows
curves
of successive
Kirchhoff
solution;
solutions
taking into account
the broken line is the exact
Now let us calcnlate is usually
calculated a,lr
c=
dete;ination
ones.
the basis
the first approximation for determining
from formula (1.2).
of c
At other points,
con-
(~,,r[ f(c)
u,I
of
curves
one, two and to the
1, 2 and 3 correspond
at the points
r
shown that’a
[=
factor.
first approximation
solving
the infinite
f 1. This us/ r
may be
of
system
for the
.
1) RP (+I)
and (1.2) +
yr,$)
and taking into account (+I)
=
*
to
layer terms, respectively.
concentration
without
using
in the figure correspond
solution;
the stress
but it is easily
(1.27) into (1.1) (Y -
for
lines
one, two and three boundary
* 1 for arbitrary m may be obtained
Substituting
we obtain
approximations
layer terms with m = 3. The straight
three boundary
stress
from the exact
is even better.
W,,”
=
(1.11)
2*s,
(&I)
as well as
1152
O.K.
%I1
be1
I r,
I r,c=*1= --fk
I;-+1
f k (-
Aksentian
I“-+svp m
+
2
2
p=1, 3,
1
ReVrp2cp2) . ..
&+4(v-l)+pzI,3,
I
Re(THICK,)
Ix
But cn1I
r, c=c1=
f
k
Hence
p-1,
k
2
Re (rp2cp,)
no-1
8pv
3, . . .
m-12
Whereupon, we have
QelJr.&-+l=fk In (1.16),
tion factor is not obtained
asymptotically
theory, in the first approximation,
m-l
+ --
2v
the first term in the braces corresponds
From (1.16) it is clear that in this case,
theory is 22%
v-l
{-&
from the Kirchhoff as m increases.
(1.16)
1
to the solution
form/= 1 of course,
increases
m+2
of applied theory.
the exact stress
concentra-
theory. The error of this For m = 3, the error of applied
; for m = 5 it is 44% ; for m = 7 it is 66%, etc.
At other points on the surface r the error will also not be small. Fig. 2 shows the curves of the function
cSl\ p (5). as calculated
by means of the Kirchhoff
theory (straight
line) as well as those using one, two and three boundary layer terms (1, 2 and 3). 2. As discussed solution
in [l],
the next step in constructing
to the problem is the determination
The boundary conditions
From (2.1).
the asymptotic
expansion
of the
of I+$~(n) and c
P3’
for $r (n) are given by
we have
(2.2) As before,
we set B, = 0. The system of equations II M II
. II~13II = IIF
for cp3 has the form
t3 II
(2.3) P+1
(L==l, Here llfnll is the same matrix asin system (1.8). same manner as system (1.9),
2, :i,.
The system (2.3) is solved
noting that cZn 3 is the conjugate .
of czn_r
.) in the
3 and setting
I
On stress
C2~-l,3-
Thereupon, as
it is clear
yi system
$
it is possible
from (2.3)
concentrations
in thick
(n=i,
(Yzn_1-
iY*)
to obtain
the values
that with fourteen
plates
. .)
2, 3,.
(Table
known values
1153
(2.4)
4) of the first ten
unknown
yi,
of xi the order of the truncated
will also be fourteen. TABLE j=
1
2
~j=-0.36003.10-3 m=3
j=
i -=
1
rn-= 5 j=
6
yj=
TO illustrate approximations
! 10 12 14
m=3
m = 5
4 6 8 10 12 14
-0.37288.10-3 -0.37072.10-3 -0.37037.10-3 -0.37036.10-3 -0.370354.10-3 -0.370352~10-3
We may now determine vergence previously
of the series determined
determining
approximations
of y,. into (1.1)
-0.49.10-7 -0.46.10-’
O.lO8.1O-e 0.1075.10-a
0.23.10-7 0.27.10-7
0.190.10-a 0.191~10-a
of the stress
in this step will now be checked. vafnes
yi, successive
5
-0.61675.10-a -0.62075.10-8 -0.62262.10-3 -0.62258.10-a -0.62255.10-a -0.62253. 1O-3
the second
0.3.10-7
5)
-0.4938. IO-* -0.50775.10-4 -0.56738.10-4 -0.50732.10-4 -0.50726.10-4 -0.50724.10-4
-0.36050.10-3 -0.35991~10-3 -0.35998.iO-3 -0.36000.10-a -0.360014.10-3 -0.360020.10-3
10
0.19.10-a
of the process
TABLE
0.38.10-a
9
0.33.10”
the rate of convergence
5
0.1155.10-4
8
0.48.10-a
of yI , ya, yp and yIO are shown (Table
4
-0.4*10-7 4
-0.1661.10-4
7
0.221.10-5
10
0.11.10-6 3
-0.6225.10-4
0.200*10-6
9
-0.5.10-7
2
5
0.9050.10-5
8
0.21.10-6
0.37035.10-3
4
0.190.10-5
7
0.26.10-G
yj== -
3
-O.5O72.1O-4
6
yj=
4
and (1.3).
components.
Substituting we obtain,
(2.2),
(2.4)
The conand the
for m = 3,
u,~I~,~=~~= +k{[~1.7504+0.714+0.498+0.080+ 0.062+. . .]+ [10.71918- 0.1446 - 0.1832 - 0.1518 - 0.0456 - 0.0242 - 0.0138 - . . .]}1O-~z z + k (- 0.1040 + 0.1016) = T kO.0024 + 1.504 - 0.38: %rza Ir,c=o = - k (if.3572 + [- 2.03747 - 0.6441 + 0.2492 - 0.9939
= -k
(0.0249
-
-j- 0.03 - 0.02 + + 0.0359 - 0.013 0.0251) =
k 0.0002
. . .] + -
0.004
+
. . .]} 10-g =
1154
while
0. K. Aksentian
for m = 5, we shall have
@Ttz Ir, L-3 1 =: -4; k {[+ (11.3542 + 1.4340 +
12.3362 0.0244 z
%z2
=
I'. c-0
1.i650 0.0850
+ k (-0.1285
+
0.290 +
-
0.0664
+
0.1259)
0.242 +
-
9.0432 = T
0.126 -
-;-
0.0254
. . .] + -
. . .])
10-a z
kO.0026
k{(1.774+ 1.221--0.894+0.40-0.15+. . .]+ - 0.261 + 0.419 - 0.236 + 0.125 - 0.06 + 0.03 + . . .]} 10-Y z - k (0.0235 - 0.0237) = k0.0002
-
+ [-2.384 Comparing
-
the remits
thus obtained
on and ~na on the boundary
f,
with the values
we find that convergence
given in (1.15) of the second
for the stresses approximation
is
also satisfactory. Now consider
the stress l=
ing the infinite
system
Gs2
i
of equations
utilizing =
r,c=+1
In a manner similar to that of section
* t may also be obtained
ahown *ataalr,
Calculations
aair.
to determine
(2.5) yield,
k $
f
for the second c pJ.
1, it is readily
approximation
withont solv-
Thus we obtain
for m = 3, 0.0723
j5.35959 --a0228
-
-
0.0916
0.0121
-
0.0069
-
0.0759
-
-...].2O_ZzJt
k-0.135
For m = 5, we obtain OS2
I
r, Z=ctl = $ k $
[5.6771 -
+
0.0332
0.7170
3. The third step of the construction determination
0.0226
-
+ -
0.0122 0.0127
of the asymptotic
of r+!~a (n) and cp4. The boundary
conditions
-
0.0425
--...].fO-a expansion
-u’F: deals
k-O.168 with the
for $a (s) ara given by (3.1)
From (3.1),
we have
(3.2) To determine given matrix, tion Of aa\r
c
, we P4
have the infinite
but, as previously
discussed,
system
of equations
it is easily
* <= f 1 may be obtained without the determination
Calculations
utilizing
(3.3) yield
for m = 3,
with the previonsly
shown that the third approximaof c
P-
Thns, we obtain (3.3)
On stress
c&,
+ ‘/,[1.64360
1.2423+
k”/s{[-
=i
<=,l
+
0.00538
concentrations
-
0.0335+
0.0178
-
1155
in thick plates
0.0170+
0.0034
-
0.0021
0.0014
-
+
0.0013+.
0.00065
-
. .]+
. . .]} 1O-2 zz
=: _+ k.O.O1OO Form 5s31
r,
= 5, we obtain
+*1
=
1.3005
ks,h{[-
T
+ l/z 11.7137 -to.1335
$0.00629
-
0.06460
-
0.0022
+ -
0.0090 0.0018
+ -
0.0061
+
0.0010 -
0.0026 0.0006
+ -
. . .] + . . .], 10-2~
=: + k 0.0113 We now present q?,
c=
approximation
of the asymptotic
+,k [- 0.4667 f k [-. 0.2381
=
cI II’, ++-1
From (3.4)
h -
0.135 112+
0.0100h3 +
h -
0.168 k2 +
0.0113
and (3.5) it is clear
the diameter
of the opening
of
determination
of. the stress
in powers
It is readily
h3 +
that even for x = 2 (i.e.
concentration
when the plate thickness represents
we can recommend
factor be baaed
m = 5
for
. . .]
(3.4)
m = 3
for
. . .I
the third term in the expansion
8% of the sum of the first two terms. As a result, expansion
expansions
f 1
(J, I r,i=_+1 =
twice
a three-term
t3 . 5) is
only 5% to
for x < 2 that the
on the first two terms of the
of h.
seen
from (3.4)
and (3.5)
that, for x = 0.1, the sum of the next two terms
is equal to 3% to 7% of the first term. Thus, for cS may be obtained
from the following
for x < 0.1,
v-l
I r,I;=,1- -fkh[-_++T-
6,
the stress
concentration
factor
expression, m-l
(3.6)
m+2
3
BIBLIOGRAPHY 1.
Aksentian,
O.K. and Vorovich,
(The state of stress 2.
Aksentisn, osnove theory).
3.
Lnr’e,
O.K. and Vorovich,
prikladnoi
PMhf, Vol.
K teorii
sostoianie
plity maloi
tolshchiny
27, No. 6, 1963.
I.I., Ob opredelenii
teorii (On the determination
PMM, Vol. AI.,
I.I., Napriazhennoe
in a thin plate).
kontsentratsii
of stress
napriazhenii
concentrations
using
na applied
28, No. 3, 1964. tolstykh
plit (On a theory of thick plates).
PMM, Vol. 6, Nos.
and 3, 1942.
Translated
by H.H.
2