A method of sand liquefaction probabilistic estimation based on RBF neural network model.
Guoxing, Chen ; Fangming, Li
Based on the 344 liquefaction site data during 25 strong
earthquakes in the world, through training and testing the neural
network model of the Radial Basis Function, the nonlinear relation
between corrected blow count of standard penetration test N1 and cyclic
resistance ratio of saturated sand soils CRR is analyzed, and also the
empirical equation CR[R.sub.cri] of the liquefaction limit state curve
or critical cyclic resistance ratio curve of saturated sand soils is
constructed. By the statistic analysis, the probability density
functions of liquefaction and non-liquefaction as well as empirical
equation between the safety factor and liquefaction probability of
saturated sand soils are given, then the empirical equation of the
cyclic resistance ratio of saturated sand CRR under the different
probability is deduced. The method used in this paper makes the sand
liquefaction probabilistic estimation on engineering sites is as easy as
the traditional deterministic method of sand liquefaction estimation.
INTRODUCTION
Earthquake-induced saturated sand liquefaction is one of important
causes for making ground failure and building damage. Thus, many methods
of soil liquefaction estimation are developed. The SPT method is
comparatively perfect and universally accepted by the engineering domain
in the world. In consistent with the reliability theory of
superstructure design, the evaluation of soil liquefaction should also
adopt the probability method, which gives the soil liquefaction
estimation result under the different probability. Based on the 344
liquefaction site data during 25 strong earthquakes, with Radial Basis
Function (RBF) neural network model, the cyclic resistance ratio CRR
curve of saturated sand under the different probability is presented.
SAND LIQUEFACTION LIMIT STATE FUNCTION BASED ON THE RBF NEURAL
NETWORK MODEL
Design of the Neural Network Model
RBF neural network is a multi-nonlinear dynamic system with good
self-adaptive, self-systematical and finer ability of learning,
association, compatibility and anti-jamming. It can expediently
construct the model for complicated and unknown systems, thereby
realizing the self-estimation of sand liquefaction potential under the
different influencing factors.
RBF network model comprises three layers, and its construction is
shown in Figure 1. A input layer node passing the input signal to a
hidden layer is usually a simple linear function while the hidden layer
node usually consists of the fundamental function. The fundamental
function in hidden layer nodes will be affected in local once the signal
is inputted.
[FIGURE 1 OMITTED]
The hidden layer function usually expressed as Gaussian function is
[u.sub.j] = exp [- [(X - [C.sub.j]).sup.T] (X - [C.sub.j]) / 2
[[sigma].sup.2.sub.j]] j = 1,2, ... , [N.sub.h] (1)
Where [u.sub.j] = the output value of the hidden layer node of No.
j, X = input samples, [C.sub.j] = the central value of the Gaussian
function, [[sigma].sub.j] = the standardization constant, [N.sub.h] =
the quantity of hidden layer nodes.
The output of RFB network model is a linear combination of the
output of hidden layer nodes, and is expressed in the equation (2).
[MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] (2)
Where [W.sub.i] = [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN
ASCII]. The learning of the RBF network model classifies into two
processes. The first one, the central value of the Gaussian function and
standardization constant [[sigma].sub.j] of each hidden layer node are
determined by all the input samples. The second one, after the hidden
layer parameters determined, the weights of the output layer can be
gained by applying with the least square theory.
Sand Liquefaction Limit State Function
Among the 344 liquefaction site data of 25 strong earthquakes in
the world (Xie junfei 1984), there are 206 liquefaction sites and 138
non-liquefaction sites. According to H.B. Seed's (2001) equation,
the cyclic stress ratio of saturated sand layer caused by earthquake
ground motion is
CSR = 0.65 [[sigma].sub.v] / [[sigma]'.sub.v] [a.sub.max] / g
[r.sub.d] MS[F.sup.-1] (3)
Where [[sigma].sub.v] and [[sigma]'.sub.v] are the total and
effective vertical overburden stress, respectively; [a.sub.max] is the
peak value of the horizontal ground motion acceleration; g is the
acceleration of gravity; [r.sub.d] is the stress reduction coefficient;
and is the magnitude scaling factor. NCEER suggests using the equation
(4) to determine the value of MSF:
MSF = [(M / 7.5)/sup.-2.56] (4)
The cyclic resistance ratio (CRR) of saturated sand is mainly
determined by soil density (adopting SPT-N value representation),
vertical overburden stress ([[sigma].sub.v] or [[sigma]'.sub.v]),
the peak value of horizontal ground motion acceleration, seismic scale and so on. So the liquefaction potential function of saturated sand can
be shown as:
L = f(N, [[sigma].sub.v], [[sigma].sub.v], a, M) (5)
In order to calculate conveniently, a reduced acceleration is
adopted which considers the influence of horizontal ground motion
acceleration and seismic scale defined as 7.5:
[A.sub.M] = [a.sub.max] / g MS[F.sup.-1] (6)
The input layer of the neural network model have 4 neurons, namely
[N.sub.1], [[sigma].sub.v], [[sigma]'.sub.v] and [A.sub.M]. The
determined method of the liquefaction limit state equation of saturated
sand proposed by JUANG et al (2000) is that any variable determining
liquefaction potential such as reduced acceleration [A.sub.M], with the
trained artificial neural network method, is used to check their state
whether from one state convert to another state. Then, through the
increase or decrease of the variable, the critical point of converting
state is resulted (Fig.2).For example, the liquefaction point A, if the
variable [A.sub.M] is decreased (equals to reduce the seismic stress),
becomes non-liquefaction, or non-liquefaction point B, and if the
variable [A.sub.M] is increased, it gets into liquefaction. Thus the
critical value of CSR can be found. Then curve fitting of all the
critical values of CSR and [N.sub.1] can make the liquefaction limit
state curve and the critical cyclic resistance ratio obtained:
CR[R.sub.cri] = 0.0002 [N.sub.1.sup.2] + 0.005 [N.sub.1] + 0.03 (7)
[FIGURE 2 OMITTED]
The limit state curve of saturated sand of the 344 site data is
marked in Fig 3.
[FIGURE 3 OMITTED]
When the equivalent cyclic stress ratio of soil layers caused by
earthquake ground motion is great than CR[R.sub.cri], the critical
cyclic resistance ratio determined in the equation (7), the saturated
sand layer will be a liquefaction case, otherwise a non-liquefied case.
PROBABILITY EVALUATION METHOD OF SAND LIQUEFACTION POTENTIAL
Probability Density Function of Sand Liquefaction Potential
The cyclic resistance safety factor of sand liquefaction can be
defined as:
[F.sub.s] = CR[R.sub.cri] / CSR = (8)
Where CSR is a calculated cyclic stress ratio generated by the
earthquake ground motion, calculated by the equation (3); CR[R.sub.cri]
is a critical cyclic resistance ratio of sand liquefaction, calculated
by the equation (7).
With the above 344 site data, the equation (8) is used to calculate
the cyclic resistance safety factor of sand liquefaction for every
sample. Fig.4 is a histogram describing the safety factor of
liquefaction and non-liquefaction cases. By statistic, the probability
density function of liquefaction [f.sub.L] ([F.sub.s]) and
non-liquefaction [f.sub.NL] ([f.sub.s]) is shown as follows:
[f.sub.L] ([F.sub.s] = 1 / [F.sub.s] [square root of 2
[pi][[sigma].sup.2.sub.L] exp[ - (ln ([F.sub.s] - [micro].sub.L]).sup.2]
/ 2 [sigma].sup.2.sub.L]] (9a)
[f.sub.NL] ([F.sub.s] = 1 / [F.sub.s] [square root of
2[pi][[sigma].sup.2.sub.NL] exp[ - (ln ([F.sub.s] -
[micro].sub.NL]).sup.2] / 2 [sigma].sup.2.sub.NL]] (9b)
where [[micro].sub.L] = -0.4627, [[sigma].sub.L] = 0.443,
[[micro].sub.NL] = 0.4507, [[micro].sub.NL] = 0.4753.
[FIGURE 4 OMITTED]
According to the basic concept of probability, if the stylebook is
large enough, then
P(L / [F.sub/s]) = [f.sub.L] ([F.sub.s]) / [[f.sub.L]([F.sub.s]) +
[f.sub.NL] ([F.sub.s])] (10)
Where P(L / [F.sub/s]) = the liquefaction probability of saturated
sand for a given safety factor. With the equation (9) and (10), the
liquefaction probability of the 344 site data can be calculated and a
Scatters diagram can be drawn accordingly which is shown in Fig.5, and
the fitting curve can be presented as:
[P.sub.L] = 1/(1 + [F.sup.4.297.sub.s]) (11)
[FIGURE 5 OMITTED]
If the safety factor equals to 1, the probability of liquefaction
or non-liquefaction is both 50%. Juang (2000) pointed out that if the
safety factor [F.sub.s] = 1, 30% of the liquefaction probability by H.
B. Seed's empirical formula. So it is shown that the cyclic
resistance stress curve proposed by H. B. Seed's empirical formula
is not the same as the limit state curve of sand liquefaction. By
shifting equation (7) and (11), the sand liquefaction resistance stress
curve under the different probability can be shown as:
CRR = [[[P.sub.L] / (1 - [P.sub.L])].sup.0.233]. CR[R.sub.cri]
(12a)
CRR = [[[P.sub.L] / (1 - [P.sub.L])].sup.0.233]. (0.0002
[N.sup.2.sub.1] + 0.005[N.sub.1] + 0.03) (12b)
The Evaluation Criteria of Sand Liquefaction Potential
In order to be practical and convenient in engineering projects, it
suggests that the liquefaction potential of saturated sand is classified
into 3 grades under the different liquefaction probability level, and
the criteria suggested is shown in table1. According to the importance
of engineering projects, an acceptable liquefaction probability level is
defined and the estimation criteria of sand liquefaction with different
probability can be given by the equation (12). The probability
evaluation of sand liquefaction is different to the estimation of sand
liquefaction probability. the former is to estimate whether the sand
liquefaction will happen under the given probability level. while The
latter is given the liquefaction probability of the engineering site so
as to make relative decisions,
CONCLUSION
Based on the RBF neural network model, this paper constructs the
empirical equations of the limit state curve and critical cyclic
resistance ratio curve of saturated sand as well as the empirical
equation between the safety factor and liquefaction probability of
saturated sand, then deduces the empirical equation of the cyclic
resistance ratio of saturated sand under the different probability. The
equation is simple and practical, which makes the sand liquefaction
probabilistic estimation on engineering sites as easy and convenient as
the traditional deterministic method of sand liquefaction estimation. So
it is possible that the method of sand liquefaction probability
estimation is applied in the engineering practice and adopted in codes
for seismic design.
REFERENCES
Juang, C.H., Chen J., Tao J., and Andrus, R.D. (2000).
"Risk-based liquefaction potential evaluation using standard
penetration tests". J. Can. Geotech. 37:6, 1195-1208.
Xie Junfei. (1984). "Some Comments on the Formula for
Estimation the Liquefaction of Sand in Revised Seismic Design
Code". Earthquake Engineering and Engineering Vibration 4(2),
95-126.
Youd T.L, and Idriss I. M. et al. (2001). "Liquefaction
resistance of soils: summary report from the 1996 NCEER and 1998
NCEER/NSF workshops on evaluation of liquefaction resistance of
soils". Geotechnical and Geoenvironmental Engineering. ASCE,
127:10, 297-313.
CHEN GUOXING
Institute of Geotechnical Engineering, Nanjing University of
Technology, Nanjing, China
LI FANGMING
Institute of Geotechnical Engineering, Nanjing University of
Technology, Nanjing, China
Table 1. Standard for probability evaluation of saturated sand
liquefaction
Liquefaction Sand liquefaction Liquefaction action
probability level safety factor potential evaluation
0.0 [less than or [F.sub.s][greater non-liquefaction
equal to] [P.sub.L] than or equal to]1.2
<0.30
0.30 [less than or 0.81 <[F.sub.s]<1.2 possible liquefaction
equal to] [P.sub.L]
<0.70
0.70 [less than or [F.sub.s][greater liquefaction
equal to] [P.sub.L] than or equal to]0.81
<1.0
