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Variational Method in Deriving K0
By Farid A. Chouery,1
2006 Farid Chouery all rights reserved
Abstract
In this paper it is shown thatK0 , the at rest earth pressure coefficient, can be related
theoretically to failure parameters of soil (c and ). The approach is to use failure
mechanism that causes the soil to fail while keeping the at rest lateral pressure.
Variational method is used to derive the realK0. An approximate and a closed form
derivation are obtained in sand. The approximate solution gives an equation forK0
identical to the traditional equation by Jky. The closed form equation shows a slightly
higherK0 value and gives a better comparison with experiments. The resulting failure
surface is successfully compared to rigidly reinforced soil walls. Further analysis was
done to obtain a reasonable approximation ofK0 for clay and overconsolidated sand and
clay. The result showsK0 is not constant with depth due to the cohesion. The tension
zone for the at rest condition is also obtained.
Introduction and Review
The ratio of horizontal to vertical stress is expressed by a factor called the coefficient of
lateral stress or lateral stress ratio and is denoted by the symbol K: K=h/v , where h
is the horizontal stress and v is the vertical stress. This definition ofKis used whether or
1Structural and Foundation Engineer, FAC Systems Inc., 6738 19th Ave. NW, Seattle, WA 98117
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not the stresses are geostatic. Even when the stresses are static, the value ofKcan vary
over a rather wide range depending on whether the ground has been stretched or
compressed in the horizontal direction by either the forces of nature or the work of man.
Often the interest is in the magnitude of the horizontal static stress in the special case
where there has been no lateral strain within the ground. In the special case, the interest is
the coefficient of lateral stress at rest and uses the symbolK0.
Sedimentary soil is built up by an accumulation of sediments from above. As this build-
up of overburden continues, there is vertical compression of the soil at any given
elevation because of the increase in vertical gravity stress. As the sedimentation takes
place, generally over a large lateral area, significant horizontal compression takes place.
Since soil is capable of sustaining internal shear stresses, the horizontal stress will be less
than the vertical stress. For a sand deposit formed in this way,K0 will typically have a
value between 0.4 and 0.5.
On the other hand, there is evidence that the horizontal stress can exceed the vertical stress
if a soil deposit has been heavily preloaded in the past. In effect, the horizontal stresses
were "locked-in" when the soil was previously loaded by additional overburden, and did
not fully disappear when this loading was removed. For this,K0 may reach a value of 3.
When the accumulation of sediments from above causes consolidation without locked-in
stresses, it is referred to as "normal consolidation". The problem of normally consolidated
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sand under a widely loaded area has been theoretically investigated by Jky, (1944, 1948)
[10,11], and Handy, (1985) [8], yielding
K0 1= sin .............................................................................................................. (1)
where is the angle of internal friction of the soil. The original derivation of Jky gives a
more complicated expression that he approximated by K0 0 9= . sin [10], and later
simplified it to equation 1[11]. Handy shows that if instead of using a flat arch, he had
used a catenary, the examination indicates K0 106 1= . ( sin ) [8]. He mentioned that
neither of these derivations is consistent with the common use ofK0 to define the stress
ratio in normally consolidated soil under a widely loaded area, as mentioned above, the
agreement with experimented data, well investigated by Mayne and Kulhawy, (1982)
[17], being defined as coincidence[9]. Similarly, Tschebotarioff, (1953) [28], commented
that Jky's assumptions in the derivation[9] are unacceptable. Handy [8] gave also a
mathematical proof, (Eq. 11 of his paper), in which Jky's equation can be derived using
the approximate vertical stress. His final recommendation is to use K0 11 1= . ( sin ) as a
safer approximation, since the equation forK0 originally derived from a consideration of
arching, and for an immobile, rough wall. Practicing engineers can be unaware of these
finer distinctions in theoretical and experimental considerations, and useK0 of Eq. 1
routinely.
In this paper variational method, reference [29], is used first to deriveK0 for normal and
overconsolidated sand. The method is applied over a soil failure mechanism the keeps the
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at rest lateral forces unchanged. Second: a reasonable approximation is derived for
normal and overconsolidated clay. Also, rigid reinforced soil is examined for comparing
the derived slip surfaces. The derivation can be readily extended for a slanted wall with a
sloped soil on surface. This in turn prepares the way for dynamic analysis.
Incipient Shear and K0 Failure Mechanism
Consider taking a horizontal slice from the ground with a heighty, and introducing an
imbalance loading as seen in Fig. 1(a). Assume that the soil was at the at rest condition
before introducing the imbalance surcharge loads. It is desirable to show the effect of this
imbalance loading on the horizontal force on line A-B. Thus, we need to investigate the
loads before and after the imbalance loading. (1) Before: By taking an arbitrary angle to
create two immobilized wedges, as seen in Fig. 1(a), the sum of the forces yields:
E N F h = sin cos , and W N F= +cos sin , where Wis the weight of the wedge,
Ehis the horizontal force on line A-B,Nis the normal force, andFis the immobilized
friction. (2)After: By using the same arbitrary angles, the change inNandF, due to the
imbalance surcharge loading q and - q, is Nand Frespectively. When considering axi-
symmetry, the net change Nand Fon one wedge is equal and opposite to the net
change on the other wedge. From Fig. 1(b) the new equations yields: (1) the right wedge
(ABD): = N F qy T cos sin cot , and E N F h = +sin cos . (2) the
left wedge (ABC): N F qy T cos sin cot + = + , and E N F h = sin cos .
Equating Eh from the left wedge to the right wedge yields F N= tan. When
substituting back to find Eh , it gives Eh = 0. Thus the imbalance loading does not
change the at rest force on line A-B where the maximum shear occurs. If the surcharge
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pressure q and - q is continually increased the result is a failure surface, where F F+ in
the left wedge (ABC) reaches the failure criterion of a fully mobilized friction. For the
right wedge (ABD), the friction will not quite be fully mobilized. To show this, it is
sufficient to show that ( ) / ( ) ( ) / ( )F F N N F F N N + + > . This lead to
F N F N / /> , or tan tan / ( cos ) > E Nh , which is true.
N + N
F + F
F - F
N - N
W W
y
E Ehh+
T T
q
- q
A
B
C DA A
B B
C D
q - q
P P1 2
A A
B B
C D
(a) (b)
(c)
FIG. 1 - Incipient Shear Definitions (a) Horizontal Slice (b) Force Diagram
(c) Incipient shear on two sliding walls.
A reasonable question: if the failure surface is not a line, will it change Eh? If the above
analysis was to assume a curve instead of a line for the immobile friction, the hypothesis
(Eh = 0) would still hold for the right and left vertical slices adjacent to line A-B. This
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can be seen by treating the bottom of each slice as a wedge with some slope and a
surcharge on top of it. Repeating the analysis on each slice with its corresponding mirror
image slice, will give the same results, when summing all the forces. Thus, the hypothesis
is valid for any arbitrary curve, and not just a line. Furthermore, if the imbalance loading
q and - q were any axi-symmetric loading, the hypothesis that Eh = 0 remains valid.
From this observation it is necessary to introduce a name for the type of shear, T, which
was introduced on line A-B to be the incipient shear. The full definition of the incipient
shear is:A shear introduced to a boundary or a line is an incipient shear when the
normal forces to the boundary or the line do not change. It is important to note that the
horizontal force of Fig. 1(a) does not need to be the at rest force. Thus, the incipient shear
hypothesis is applicable for other conditions.
It is noteworthy that the hypothesis of the incipient shear was arrived at without the use of
elasticity, plasticity, or elastoplastic methods. When comparing with elasticity the result is
the same. For example, integrating Flamant's equation, (1892) [27], for any axi-
symmetric load on a semi-infinite media yields h = v = 0, and the strain is zero at line
A-B of Fig. 1(a).
To simplify the analysis it would be beneficial not to deal with the surcharge q. Consider
the two buried walls in the horizontal slice of Fig. 1(c). Between the walls are rollers to
give a perfectly smooth surface. IfP1 =P2, the wedge analysis is identical to the above for
Fig. 1(a). The result is the same hypothesis Eh = 0. The first failure surface would be
that ofP1, a downward incipient shear. The failure surface is expected to be different than
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that of Fig. 1(a). However, the before and after, at rest lateral forces are kept the same
since Eh = 0.
From these observations, when considering the downward incipient shear of Fig. 1(c), it
is expected that theKvalue will have variation inside the wall. It will start atK = K0 at
the wall and will reoccur internally at some distance inside the wall. This is necessary
since going further inside the wall, the incipient shear has a lesser influence on the
stresses and the at rest forces will reoccur. ThusK0 will reoccur at some point atx = xm
from the wall and the boundary condition on the slip surface can be considered to have K0
at both ends.
Once theK0 failure mechanism is realized,K0 can be derived from finding the maximum
horizontal force for an active slip surface. Additionally, the boundary condition must be
satisfied. Maximizing the horizontal force will lead toK0, and not any other active force
coefficient because the horizontal force will reduce if the boundary moves slightly
outward from zero deformation to an active slip surface. Experiments by Terzaghi (1934,
1941) [25, 26], Sherif et al. (1982,1984) [21, 23], and Fang et al. (1986) [7] indicated that
regardless of the outward movement of a rigid wall, the horizontal force reduces from the
at rest condition. Thus, the at rest force is the upper bound for an active slip surface
failure. These tests were done for translating walls, rotating walls from top and bottom.
The outward movement reduces the horizontal force from the at rest condition because it
induces tension in the soil. Cohesionless soil can hardly take tension. Thus, if the failing
wedge is subdivided into vertical slices, the shear in the slices will reduce. Excessive
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outward movement will result in an active condition where the shear in the slices
becomes zero. Hence, it is sufficient to find the at rest force by maximization with an
active slip surface due to a downward incipient shear with the proper boundary condition.
Thus the necessary criterion in derivingK0 is obtained.
Boundary Conditions for Sand
Subdividing the failure wedge of the downward incipient shear into vertical slices,
following Bishop (1955) [1], yields slices that are each in equilibrium, so that the
overturning moments remain in balance and not of concern. Each slice is added together
to make the wedge in Fig. 2. The resultant of the boundary forces on a slice can be
transformed to a Coulomb, (1776) [3], wedge as shown on Fig. 3(a),(b). From the
Coulomb wedge one can write
( )( )
dEdw
x =
+
tan
tan tan tan
1 ,.............................................................................. (2)
( )dW
y dy y dy dw=
+
=
2 tan tan,.......................................................................... (3)
dE dE y x= tan ,......................................................................................................... (4)
and
dy dx= tan ............................................................................................................. (5)
Extremizing the boundary forces in a slice can be done in three ways: (1) extremizing the
horizontal force dEx , (2) extremizing the vertical force dEy , (3) extremizing the resultant
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force ofdEx and dEy. To extremize dEx it is necessary to hold dy constant and vary dx
because dEx = Kydy, and extremizingKis of interest. Thusydy must be
E E
y
x
y
x
x
y
0
/4+/2
Second Slip Surface
First Slip Surface
FIG. 2- Slip Surfaces Due To Incipient Shea
n
n
m
m
n
n
m
m
/4+/2
E0
0
(0,y )0
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dxdx
y-dy
dy
dQ dQ
dW
dW
dE
dE
E
E
E
E
x
y
i
ii
i
i+1
i+1
i+1
i+1
cos
cos
sin
sin
i+1
i
FIG. 3-a Bishop Slice FIG. 3-b Coulomb Wedg
held constant. To extremize dEy dx must be held constant and dy must be varied. dEy
must be extremized to achieve a constant dW= ydx. Thus,ydx must remain constant. In
many cases, dEy is taken as dEx tan. In these cases dy is to be held constant and dx is to
vary. To extremize the resultant it requires dx tan( ) / cos be held constant. This can
be realized by rotating the axis by from the vertical in order to have the resultant in a
horizontal direction.
In the boundaries in Fig. 2, it is desirable to find the angle that gives the smallest dEy,
which causes the first and last slice to fail, while dEx is at maximum. From the above
consideration on extremizing the forces in a slice, one finds that dx and dy must be held
constant. This gives no unique solution since two different 's can be derived from Eq. 5.
However, at the boundaries the forces are already at maximum and dEx =K0ydy
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y0
2
21( sin ) .............................................................................. (8)
where the identity tan( / / ) tan / cos 4 2 1 = + were used. Eq. 8 gives a
K0 1 sinas in Eq. 1, where Jky's equation is derived from unacceptable
assumptions and is considered a coincidence. There are considerations that need to be
investigated for this approximation: (1) The integration of Eq. 4 yields 0 = . However,
another slip surface can occur before this one, where the incipient shear is lower and
reaches a directional angle 0
< with a slightly higherK0
value than Eq. 8. This will be
shown later on in the derivation. (2) Eq. 8 is derived by assuming a constantK0 value in
all the slices. This is contrary to common sense since variation in the stresses, thus theK
value, are expected inside the wall. It can be concluded that Eq. 8 or Jky's equation is
only an approximation, and the slip surface and the directional angle 0 are incorrect.
Sand Analysis
K0 for sand will be derived from an extremum condition using variational methods with
the boundary condition of Eq. 7. With the extremum method one selects arbitrary
admissible slip surfaces and determines the forces acting on the boundaries of the earth
mass. The definitive slip surface is one, which furnishes an extremum value for the
horizontal force. Maximizing the horizontal force E0 0cos can start by maximizing each
slice individually. The horizontal force dEx of the slice in Eq. 2 can be treated as a
coulomb wedge with a uniform surcharge; it is required thatdE
d
x
= 0. Thus
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( ) ( )( )
( )( )
( )tan
sin
sin tan
cos sin
sin
cot cot cot
cot cot=
=
=
+
2
21
1 2 1 22
2
2
............................................................................................................. (9)
where tan is expressed three different ways for convenience and it yields
( ) ( )[ ]cot tan cot cot = + + + 1 1 .............................................................. (10)
If plotting Eq. 10 it shows that > for all . Also, Eq.10 is the Coulomb
wedge angle for a vertical wall with wall friction. If= 0 in Eq. 9 or 10 =
/4 + /2, where ( ) + = +tan / cos cot / / 1 4 2 . This checks with an active
Coulomb wedge with = 0 . Now, note for> in Eq. 2 the force dExis maximized
when 0. Thus the boundary points for the slip surface of Fig. 2 can be taken in the
region 0 or at /4 + /2 /2. Thus, 0 = /4 + /2 , and n= /2 as in Eq. 7.
For a giveny0,xnandyn will be determined from these prescribed end points. Substituting
Eq. 9 in Eq. 2 and 4 and rearranging yields
( )dE ydxx = sin cot cot tan2 2
...................................................................... (11)
( )dE ydx ydxy = + 22
sin sin cos cot tan
( )= + + tan tan cos sin tan cot tanydx ydx2
( )= tan cot ydx dE x ................................................................................... (12)
Wheredw
tanis replaced by ydx, is the soil constant, and dEyis expressed in different
ways for convenience. From Fig. 3a one can write
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E E dE i i i i xcos cos =+ +1 1 ..................................................................................... (13)
E E dE i i i i ysin sin =+ +1 1 ...................................................................................... (14)
When starting withE0 and ending withEn Eqs. 13 and 14 yields
E dE E xi
n
n n0 00
1
cos cos = +=
.................................................................................... (15)
E dE E yi
n
n n0 00
1
sin sin = +=
..................................................................................... (16)
By taking tan = y in Eq. 11 and 12 and replacing the summation sign by the integral
sign in Eq. 15 and 16 it yields
Ey
y ydx E x
n n
n
0 0
2
0
21
cos sin cot cos = +
+ ................................................ (17)
E ydx yy
ydx E x
n n
xn n
0 0
2
0 02
1sin sin sin cos sin = +
+
=
+ tan sin cos tan siny ydx
yy ydx E n n
xx nn 12
00
=
+ tan tan sinyy
dx dE E xxx
n n
nn
00........................................... (18)
To use variational method to maximize horizontal force E0 0cos , Eq. 17 needs to be
extremized while Eq. 18 is to be satisfied. Eq. 18 can be satisfied by choosing the proper
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directional angles 0 and n. Similarly, E0 0cos can be maximized by extremizing Eq. 18
while Eq. 17 to be satisfied, and again the proper directional angles can satisfy Eq. 17.
Note: E0 0sin is taken as ( cos ) tanE0 0 0 . These conditions leads to a deduction that
there are two slip surfaces that can maximize E0 0cos , and both surfaces can occur.
Since it is desirable to look for the horizontal pressure in Fig. 2, the resulting slip surface
from maximizing Eq. 17 will be the first slip surface and the slip surface resulting from
maximizing Eq. 18 will be the next one. This situation will become more evident when
the slip surfaces are obtained and the boundary conditions are imposed. Thus, Eq. 17 or
18 can be extremized alone while the other can be satisfied with a suitable 0 and n.
When starting with Eq. 17 the boundary conditions are prescribed: atx = 0y =y0, atx = 0
andy =y0 ( ) = = x tan / / tan / cos 4 2 1 , and atx =xnandy =yn = 0. Note
also that En ncos in Eq. 17 is prescribed from a second slip surface such that
( cos )En n = 0. Thus, the Euler equation [29] from variational method can be applied:
=
y
d
dx y0 ..................................................................................................... (19)
where = +
sin cot2
21
yy y ......................................................................... (20)
Since does not involvex explicitly then
=y
yh
............................................................................................................ (21)
where h is a constant. Applying Eq. 21 on Eq. 20 yields
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11
=
y
h
ycot
' .................................................................................................... (22)
where h' is a new constant. By using the boundary condition =x 0 at y yn= , h' can be
found and Eq. 22 can be written as
11
= =
yx
y
y
ncot ........................................................................................... (23)
By using the end condition at y y x= = = +0 01 4 2fortan / cos / / on Eq.
23 yields
( )y yn0 1= + sin ....................................................................................................... (24)
When integrating Eq. 23 and using the end condition at x y y= =0 0 , it yields the first
slip surface Eq.:
x y y yy
yn=
cot ln 0
0
.................................................................................... (25)
By using Eq. 24, Eq. 25 can be written as
( )( )[ ] =+
+ +cot
sinsin ln
11 1 ...................................................................... (26)
Where = =y
y
y0 0and . Fig. 4 shows different slip surfaces for various values of
for the region1
11
+< Eq. 23 has noy
values. In fact the curve circles toward the first boundary, as seen in Fig. 2, indicating
another slip surface must occur in order to reach the top of the ground. So, it remains to
find the second slip surface and the forceEn . Consider the second slip surface shown in
Fig. 2.
For maximum condition in the slice using Eq. 2 and for matching the end of the first slip
surface, the boundary condition can be taken as n m= = +/ / /2 4 2and .
Rewriting Eq. 17 and 18 in terms of the forces of the second slip surface in Fig. 2, yields
Ey
y ydx E n n m mx
x
n
m
cos sin cot cos = +
+2
21
.............................................. (32)
E y ydxy
y ydx E n n x
x
x
x
m mn
m
n
m
sin tan sin cos tan sin =
+ 1
2
................. (33)
Using variational method on Eq. 33 to extremize En ncos yields
=
x
h
ytan
'1 ........................................................................................................ (34)
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where h' is a constant. By using the boundary condition at y y yn= = =1 0/ for
n = / 2 on Eq. 34, h' is found and the equation can be rewritten as
=
x
y
y
n
tan1 ...................................................................................................... (35)
Using the other end condition at y y xm= = tan / cos 1 for m = +/ /4 2 , Eq.
35 yields
y ym n= sin ............................................................................................................. (36)
When integrating Eq. 35 and using the end condition at x y yn n= = , the second slip
surface is obtained:
x y y yy
yxn n
n
n=
+tan ln ................................................................................ (37)
From Eq. 24, 27 and 36, Eq. 37 can be rewritten as
[ ][ ] [ ]{ } =+
+ + + +1
11 1 1 1
sintan ( sin ) ln ( sin ) cot sin ln( sin )
........ (38)
Where = =
x
y
y
y0 0, , and
sin
1+sin
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