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Procedia Engineering 51 (2013) 84 – 91 1877-7058 © 2013 The Authors. Published by Elsevier Ltd. Open access under CC BY-NC-ND license. Selection and peer-review under responsibility of Institute of Technology, Nirma University, Ahmedabad. doi:10.1016/j.proeng.2013.01.014 N on- Circuit Branches of the 3 rd Nirma University International Conference on Engineering (NUiCONE 2012) F lui d- Structur e- Soil Interaction Effects on Seismic Behaviour of E levated Water Tanks Uma Chaduvula a , Deepam Patel a , N Gopalakrishnan b a Post a - Graduate Student, Applied Mechanics Department, S. V. National Institute of Technology, Surat - 395007, India b Senior Principal Scientist, CSIR -SERC, Taramani, Chennai - 600113, India Abstract The multiple base motion effect on hydrodynamic pressure, acceleration of tank and fluid surface elevation problem in Elevated water tank is understood as a Fluid - Str ucture r - Soil Interaction problem. Where, So il -Structure interaction causes rocking motion a nd Fluid Structure interaction caus es the hydrodynamic behaviour of water tank. According to the available literature, substantial amount of study has been done on behaviour of elevated steel water tank under pure rocking, but no study is done on water tan ks with horizontal and vertical earthquake excitation, along with rocking motion. A n experiment al investigation for a 1:4 scale model of cylindrical steel elevated water tank has been carried out on shake table facility at CSIR - SERC, Chennai. Test program on elevated steel water tank consisted of combined horizontal, vertical and rocking motions, for a synthetic earthquake excitation for 0.1g and 0.2g accelerations, wit h increa sing angle of rocking motion. The impulsive base shear and impulsive base moment values increase with in c rease in earthquake acceleration. Whereas, the convective base shear and base moment values increase for increase in earthquake acceleration, but decrease with increasing angular motion. Hence, there is no considerable effect of roc king motion on sloshing of water. The non -linearity in structure is observed, when the impulsive pressure of tank decreases with increase in tank acceleration. The pressure variation along tank height due to vertical excitation increased with increasing ac celeration, and increased furthermore with added rocking . Using various codes available on water tanks , t he recorded experimental results were used to calculate an d compare the base shear, base moment, pressure variation in the tank. Keywords : Water tanks, Fluid -Structur e- Soil Interaction, Seismic behaviour 1. Introductio n The forces due to earthquake - induced sloshing in fluid - filled water tanks are important considerations in the design of civil engineering structures. Seismic safety of elevated liquid-filled containers is of great concern because of the potential adverse economic and environmental impacts ass ociated with failure of the container and liquid spillage on the surrounding area. As a result, a considerable amount of research effort has been devoted to a better determination of the seismic behaviour of liquid tanks and reservoirs and the improvement of associated design codes. In spite of this, there have been relatively few studies on the influence of simultaneous vertical, horizontal and rocking excitations with respect to the h ydrodynamic problem of liquid sloshing. The traditional approach to est imating earthquake -induced hydrodynamic loads as outlined for example, by Housner (1957) i nvolves the use of an impulsive, or high frequency, effective fluid mass which accelerates with the container, together with an additional effective fluid mass which undergoes resonant motions at the lowest natural frequency of sloshing. The t raditional approach is based on a number of assumptions which may not be applicable to the general case. Hence, the present study aims at understanding the basic mechanism of liquid sloshing in elevated water tanks according to traditional approach, studying the available standard methods of analysis and their comparison. Hydrodynamic behaviour of water tanks is observed by performing an experiment on water filled elevated cylind rical steel water tank model (1:4 scale) with multi - degree of freedom earthquake excitation (horizontal, vertical and rocking) given to it. Available online at www.sciencedirect.com © 2013 The Authors. Published by Elsevier Ltd. Open access under CC BY-NC-ND license. Selection and peer-review under responsibility of Institute of Technology, Nirma University, Ahmedabad.

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Procedia Engineering 51 ( 2013 ) 84 – 91

1877-7058 © 2013 The Authors. Published by Elsevier Ltd. Open access under CC BY-NC-ND license.

Selection and peer-review under responsibility of Institute of Technology, Nirma University, Ahmedabad.doi: 10.1016/j.proeng.2013.01.014

Non-Circuit Branches of the 3rd Nirma University International Conference on Engineering(NUiCONE 2012)

Fluid-Structure-Soil Interaction Effects on Seismic Behaviour of Elevated Water Tanks

Uma Chaduvulaa, Deepam Patela, N GopalakrishnanbaPosta -Graduate Student, Applied Mechanics Department, S. V. National Institute of Technology, Surat -395007, India

bSenior Principal Scientist, CSIR-SERC, Taramani, Chennai -600113, India

Abstract

The multiple base motion effect on hydrodynamic pressure, acceleration of tank and fluid surface elevation problem in Elevated watertank is understood as a Fluid-Structurer -Soil Interaction problem. Where, Soil-Structure interaction causes rocking motion and FluidStructure interaction causes the hydrodynamic behaviour of water tank. According to the available literature, substantial amount of studyhas been done on behaviour of elevated steel water tank under pure rocking, but no study is done on water tanks with horizontal andvertical earthquake excitation, along with rocking motion. An experimental investigation for a 1:4 scale model of cylindrical steel elevated water tank has been carried out on shake table facility at CSIR-SERC, Chennai. Test program on elevated steel water tank consisted of combined horizontal, vertical and rocking motions, for a synthetic earthquake excitation for 0.1g and 0.2g accelerations, withincreasing angle of rocking motion. The impulsive base shear and impulsive base moment values increase with increase in earthquake acceleration. Whereas, the convective base shear and base moment values increase for increase in earthquake acceleration, but decreasewith increasing angular motion. Hence, there is no considerable effect of rocking motion on sloshing of water. The non-linearity instructure is observed, when the impulsive pressure of tank decreases with increase in tank acceleration. The pressure variation along tank height due to vertical excitation increased with increasing acceleration, and increased furthermore with added rocking. Using variouscodes available on water tanks, the recorded experimental results were used to calculate and compare the base shear, base moment,pressure variation in the tank.

© 2012 Published by Elsevier Ltd. Selection and/or peer-review under responsibility of the Institute of Technology NirmaUniversity, Ahmedabad.

Keywords: Water tanks, Fluid-Structure-Soil Interaction, Seismic behaviour

1. IntroductionThe forces due to earthquake-induced sloshing in fluid-filled water tanks are important considerations in the design of civilengineering structures. Seismic safety of elevated liquid-filled containers is of great concern because of the potentialadverse economic and environmental impacts associated with failure of the container and liquid spillage on the surroundingarea. As a result, a considerable amount of research effort has been devoted to a better determination of the seismicbehaviour of liquid tanks and reservoirs and the improvement of associated design codes. In spite of this, there have beenrelatively few studies on the influence of simultaneous vertical, horizontal and rocking excitations with respect to thehydrodynamic problem of liquid sloshing.The traditional approach to estimating earthquake-induced hydrodynamic loads as outlined for example, by Housner (1957)involves the use of an impulsive, or high frequency, effective fluid mass which accelerates with the container, together withan additional effective fluid mass which undergoes resonant motions at the lowest natural frequency of sloshing. Thetraditional approach is based on a number of assumptions which may not be applicable to the general case. Hence, thepresent study aims at understanding the basic mechanism of liquid sloshing in elevated water tanks according to traditionalapproach, studying the available standard methods of analysis and their comparison. Hydrodynamic behaviour of watertanks is observed by performing an experiment on water filled elevated cylindrical steel water tank model (1:4 scale) withmulti-degree of freedom earthquake excitation (horizontal, vertical and rocking) given to it.

Available online at www.sciencedirect.com

© 2013 The Authors. Published by Elsevier Ltd. Open access under CC BY-NC-ND license.

Selection and peer-review under responsibility of Institute of Technology, Nirma University, Ahmedabad.

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85 Uma Chaduvula et. al / Procedia Engineering 51 ( 2013 ) 84 – 91

2. Literature Review The study of hydrodynamic pressure on civil engineering structures dates back to 1930s, when Westergaard (1933) developed solution for impulsive pressure on harmonically excited, rigid vertical dams. Jacobsen and Ayre (1951) subsequently reported on analytical and experimental observations of rigid rectangular and cylindrical tanks under a simulated horizontal earthquake excitation. Housner (1957, 1959) described an approximate solution for rigid rectangular, circular, elliptical, composite tanks and rectangular, cylindrical, segmental, stepped dams based on the assumption that the forces are made up of an impulsive component, corresponding to high frequency oscillations of the container, and a convective component corresponding to the lowest mode of liquid sloshing. Isaacson and Subbiah (1991) outlined the complete solution for rigid circular and rectangular tanks under harmonic and irregular base motion. Isaacson and Ryu (1998 a) described the hydrodynamic loads and fluid surface elevations for a rectangular reservoir for base motions in an oblique direction, based on an appropriate superposition of solutions for a uni-directional motion parallel to a pair of sides. They found that earthquake-induced motions in a direction of motion parallel to the shorter pair of sides always give the highest loads and surface elevations. Earthquake-induced motions are three-dimensional and recent observations of recorded ground motions have shown that the maximum amplitude of the vertical component of ground acceleration can exceed the peak horizontal amplitude, especially near the epicenter. The fluid surface elevations and hydrodynamic pressures are affected during vertical excitation. Significant horizontal force is also observed in tanks with flexible walls. The rocking motion of tanks can be idealized with the soil structure interaction effect. Furthermore, soil structure interaction on rigid tanks gives relatively very small displacement magnitudes, when compared to flexible tanks, R Livaouglu (2009). The literature supports that there is no much effect on sloshing behaviour of water tanks due to additional rocking excitation. 3. Need of Study The present investigation aims at study of hydrodynamic behaviour of elevated water tanks during multiple degree earthquake excitations experimentally. The values for studied parameters i.e. sloshing frequency, hydrodynamic pressure, base shear, tank acceleration and sloshing height are calculated for the same tank analytically following the standard codes and same are compared with the work of G W Housner(1954). 4. Fluid-structure-soil interaction It is the combination of fluid structure interaction and Soil structure interaction. Fluid structure interaction (FSI) is the interaction of some movable or deformable structure with an internal or surrounding fluid flow, which in our case is an elevated steel water tank. The deformations of a structure during earthquake shaking are affected by interactions between three linked systems: the structure, the foundation, and the geologic media underlying and surrounding the foundation. A seismic Soil-Structure Interaction (SSI) analysis evaluates the collective response of these systems to a specified free-field ground motion. 5. Available standard codes on seismic analysis of water tanks Seismic analysis of liquid storage tanks account for the hydrodynamic forces exerted by the fluid on tank wall. Knowledge of these hydrodynamic forces is essential in the seismic design of tanks. Evaluation of hydrodynamic forces requires suitable modelling and dynamic analysis of tank- liquid system. These mechanical models, convert the tank-liquid system into an equivalent spring- mass system. Design codes use these mechanical models to evaluate seismic response of tanks. While using such an approach, various other parameters also get associated with the analysis. Some of these parameters are: Pressure distribution on tank wall due to lateral and vertical base excitation, time period of tank in lateral and vertical mode, effect of soil-structure interaction and maximum sloshing wave height. Design Codes have provisions with varying degree of details to suitably evaluate these parameters. In this study, codes considered are: ACI 350.3, NZSEE guidelines and IITK-GSDMA Guidelines for seismic design of liquid storage tanks. These codes use the mechanical model developed by G W Housner, which is discussed in theory part. Eurocode 8 mentions mechanical model of Veletsos and Yang (1977) as an acceptable procedure for rigid circular tanks. For flexible circular tanks, models of Veletsos (1984) and Haroun and Housner (1981) are described along with the procedure of Malhotra et. al. (2000). An important point while using a mechanical model pertains to combination rule used for adding the impulsive and convective forces. Except Eurocode 8, all the codes suggest SRSS (square root of sum of square) rule to combine impulsive and convective forces. Eurocode 8 suggests use of absolute summation rule. For evaluating the impulsive force, mass of tank wall and roof is also considered along with impulsive fluid mass. ACI 350.3 and Eurocode 8 suggest a reduction factor to suitably reduce the mass of tank wall. Such a reduction factor was suggested by Veletsos (1984) to compensate the conservativeness in the evaluation of impulsive force.

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6. Experimental investigationThe aim of the experiment was to study the behaviour of elevated steel water tank model during horizontal and verticalalong with rocking earthquake motions.

Table 1. Details of Steel water tank

Diameter of tank= 1mHeight of Tank(total)= 3.6 mHeight of staging= 3mHeight of cylindrical tank=0.6mTotal weight of Structure= 846 kgWeight of Staging= 250 kgWeight of Cylindrical tank= 182 kgWeight of water= 314 kgThe stiffness of structure= 1400 kN/m (Etabs9)Fundamental Natural frequency of structure= 8.24Hz**The frequency of the model steel tank falls in the range of 4-10Hz, which is the range of frequency for elevated water tanks.

6.1 Dimensional AnalysisIn planning model tests and the presentation of results, it is useful to carry out a dimensional analysis of the problem in order to identify the governing parameters so that controlled variables in the model can be suitably varied.

6.2 Earthquake modelling of structureThe steel tank model being an elastic model, the earthquake modelling of structure is done based on the scale factors given in the table below.

Table. 2. Test FacilitiesShake-Table Accelerometers ( 8 Numbers) Pressure Transducers (2 Numbers)

Size=4m×4mMax. displacement X,Y : ±150mm, Z :±100mmMax. velocity X,Y,Z: ±80cm/sMax. acceleration X,Y,Z: ±10m/s2 at 30tonMass

Frequency range 0.1 to 50Hz

Measuring range:peak (Case material: Titanium ASTMgrade 2Sensing element: PiezoelectricConstruction: Theta ShearSealing: HermeticWeight: 4.6 gm

Type: ChargeCapacitance: 129pFSensitivity: 9.290 pC/PSI

6.3 Test ProgramThe purpose of the experimental study was to measure the hydrodynamic characteristics of the tank due to the sloshing motion. The hydrodynamiccharacteristics of interest are the fluid surface elevation, the horizontal force on thetank, the overturning moment at the base of the tank and the hydrodynamic damping. It was expected that the parameters that would have the greatest influence on theperformance of the tank would be the fluid depth d, the tank size characterized by the diameter, the exciting frequency for horizontal, vertical and rocking motion.

To record to behaviour of tank to excitation, 8 numbers of accelerometers were strategically placed on the tank, staging and shake table as shown in fig.2. Threepressure transducers were also placed on the tank wall at equal heights to measurehydrodynamic pressure of water due to sloshing. Fig.1. Shake Table Actuators Location

A pulse signal is initially given to the water filled structure to experimentally calculate the natural frequency.

The following series of tests were carried out:

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1. Horizontal excitation at 0.1g with no rocking. 2. Horizontal excitation at 0.2g with no rocking. 3. Horizontal excitation at 0.1g with rocking (75ms delay) 4. Horizontal excitation at 0.1g with rocking (150ms delay) 5. Horizontal excitation at 0.2g with rocking (150ms delay)

Fig.2. Line diagram of experimental setup 6.4 Earthquake Excitation For the laboratory tests, the synthetic earthquake record has been used as the basis for simulating the earthquake excitation. In the present study, the maximum acceleration is scaled to 0.1g and 0.2g without time scale change, so that the velocity and displacement maxima differ from the full-scale condition. The frequency is 0.5 - 12 Hz and overall duration is about 30s. The time history applied is squeezed to 30 seconds from 60 seconds following the scale factors given by Harris and Sabnis. 6.5 Rocking motion Effect of soil structure interaction can be brought by producing rocking motion in earthquake excitation. This is done by introducing lag between the two vertical actuators of shake table facility, in their vertical excitation signal. The lag between two actuators is calculated based on the shear wave velocity of soil (considered 100m/s) and frequency input as 3Hz. The rocking motion is introduced by considering one-half and one-fourth of the time period of frequency input considered, i.e. 150ms and 75ms. It can be understood that maximum rocking motion will be observed in 150ms lag between two actuators motion. The signal is given such that the signal at Z1=Z4 and Z2=Z3, with corresponding lags of 0ms, 75ms and 150ms. 7. Results and discussions Impulsive mass is a rigid mass of high frequency, assumed being attached to the tank. Whereas convective mass is a low frequency fluid mass that is vibrating in the structure. The response of impulsive and convective mass of water in the structure is separated by filtering the high frequency and low frequency values respectively from the response recorded. 7.1 Base Shear Calculations Impulsive base shear for experiment is calculated using the recorded tank acceleration at the bottom of tank and calculated

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theoretical impulsive mass from the standard guidelines. The convective base shear for experiment is calculated by workingout the acceleration from recorded pressure values and calculated theoretical impulsive mass from the standard guidelines.The variation of impulsive and convective base shear values (kN) for all the five applied earthquake excitations are shown in the Fig.3(a) and (b).

Fig.3. Base Shear (a) Convective (b) Impulsive7.2 Base moment calculationBase moment is moment acting at the base of structure by the force exerted by impulsive and convective mass, and is calculated using the base shear values. The variation of base moments for all the five types of earthquake excitations isshown in the Fig. 3(a) & (b).

Fig.3. Base Moment (a) Convective (b) Impulsive

7.3 Pressure variation along height:

Fig. 4. Convective Pressure due to horizontal excitation

(a) (b)

(a) (b)

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Fig. 5. Impulsive Pressure due to horizontal excitation

Fig. 6. Pressure variation due to vertical excitation

Pressure due to vertical excitation is calculated using the observed tank vertical acceleration values and its variation alongtank height is computed using simple mechanics equation of mass and gravity.

7.5 Acceleration variation along tank height

Fig. 7. Acceleration variation along structure height

7.6 Comparison of results by various standard codesThe type of earthquake excitation applied during the experiment was a synthetic spectrum, so the computation of valuesfrom codes was done in accordance with the recorded acceleration values.

Table 2. Comparison of various standard codesParameter G. W.

Housner (1963)

IITK-GSDMA

Guidelines

ACI350.01

New ZealandCode (NZS3106, 2009)

Eurocode 8- Part 4

ConvectiveFrequency (Hz)

0.9 0.89 0.9 0.843 0.909

ImpulsiveFrequency (Hz)

- 0.264 0.335 0.357 0.196

ConvectiveTime Period (s)

1.103 1.117 1.1 1.18 1.11

Impulsive Time Period (s)

- 3.78 2.98 4.67 5.08

Impulsive BaseShear (kN)

- 1.382 2.84 1.62 6.35

Convective BaseShear (kN)

- 0.00263 0.0159 0.008 0.0259

ImpulsivePressure on wall(kPa)

3.06 0.921 0.843 - -

ConvectivePressure on wall(kPa)

0.000265 0.002501 0.001588 - -

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8. Observations

1. There is no much effect of rocking on sloshing of water in the tank by visual observation. 2. Effect of rocking is observed maximum as amplification of acceleration, base shear and base moment values. 3. Because of the tank geometry, i.e. circular shape, a big sloshing wave that develops during the excitation divides

itself into very small waves, which are developed as a result of interference of waves produced due to collision of produced wave with the walls of the tank.

4. Pressure on tank wall due to vertical excitation increases with increase in rocking and amplitude of excitation. 5. Sloshing wave height is observed maximum as 0.18m in case of 0.1g acceleration excitations and for 0.2g

acceleration excitations, water splashes out of the tank.

Fig. 8. Interference of waves 9. Conclusion The available literature supports behaviour of elevated steel water tank under pure rocking, but no study is done on water tanks with horizontal and vertical earthquake excitation, along with rocking motion. The problem is understood as a Fluid-Structure-Soil Interaction problem, with Soil-Structure interaction causing rocking motion and Fluid Structure interaction causing the hydrodynamic behaviour of water tank. A synthetic spectrum was applied and following observations were made. The high frequency impulsive mass behaviour and low frequency convective modes behaviour under earthquake excitation was studied after filtering high and low frequencies. The base shear and base moment values for impulsive modes were found to be higher (increased) in rocking excitation. Whereas, the convective base shear and base moment values were found to be lower (decreased) during increasing angular motion. This happens due to cancelling out of convective waves already produced due to pure horizontal excitation with waves produced by increased rocking motion of the tank under consideration. Impulsive pressure decreased with increasing base acceleration, whereas the convective pressure increased with increased base acceleration. Impulsive pressure decreases due to the non-linearity in the structure. The pressure variation along tank height due to vertical excitation increased with increasing acceleration, and increased furthermore with added rocking. Moreover, the stiffness of staging plays an important role in tank acceleration in magnifying the acceleration at the tank level. All the codes discussed in this paper suggest higher design seismic force for tanks by specifying lower values of the response modification factor or its equivalent factor in comparison to the building system. There are substantial differences, however, in the manner and extent to which design seismic forces are increased in various codes. American codes and standards provide a detailed classification of tanks and are assigned a different value of the response modification factor. In contrast, Eurocode 8 and NZSEE do not have such detailed classification, although NZSEE has given classification for ground supported steel tanks. Provisions on soil-structure interaction are provided in NZSEE and Eurocode 8 only. 11. Acknowledgement We would like to express sincere appreciation and gratitude to Dr. N Gopalakrishnan, for his advice, constant support and guidance throughout this study. We are also grateful to Dr. Palani and Dr. J Rajasankar for their advice, support and guidance. The experimental section of this thesis would not have been possible without the assistance of Instrumentation Section and technicians of the Advance Seismic Testing and Research Laboratory (ASTaR), SERC, particularly Mr. Vasudevan and Mr. Harish for their invaluable support for the testing. Sincere thanks also to Mr Sarma, M/s Arya Engineering, for fabrication of model.

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10. References

[1] Advances in Civil Engineering through Engineering Mechanics, ASCE, pp. 1-24. [2] A., and Tayel, M. A.,

Structural Dynamics, 13, pp. 583-595 [3]

Momentum method." Journal of Fluid Mechanics, 87(2), pp. 335-341. [4] Housner, G. W., (1957) "Dynamic pressures on accelerated fluid containers." Bulletin of the Seismological

Society of America, 47, pp. 15-35 [5] n of the Seismological Society of America,

53, pp. 381-387 [6] Housner G.W.(1963). "Dynamic analysis of fluids in containers subjected to acceleration. Nuclear Reactors and

Earthquakes", Report No. TID 7024, U. S. Atomic Energy Commission, Washington D.C. [7] IITK-GSDMA, "Guidelines for seismic design of liquid storage tank (2005) ", Indian Institute of Technology,

Kanpur. [8] Isaacson, M., and Ryu, S., (1998 a) "Earthquake-induced sloshing in a vertical tank of arbitrary section." Journal of

Engineering Mechanics, ASCE, 124(2), pp. 158-166. [9] Isaacson, M., and Ryu, S., (1998 b) "Directional effects on earthquake-induced sloshing in a rectangular tank."

Canadian Journal of Civil Engineering, 25(2), pp. 376-382. [10] Isaacson, M., and Premasiri, S., (1999) "Water surface elevation due to earthquake induced sloshing."

Proceedings of the 8th Canadian Conference on Earthquake Engineering, CSCE, Vancouver, Canada, pp. 727-742. [11] Isaacson, M.,(1998) "Earthquake-induced hydrodynamic loads on reservoirs." Proceedings of the Structural

Engineers World Congress, San Francisco, USA, paper T214-4. [12] Isaacson, M., and Subbiah, K., (1991) "Earthquake-induced sloshing in circular tanks." Canadian Journal of Civil

Engineering, 18(6), pp. 904-915. [13] Jacobsen, L. S., (1949) "Impulsive hydrodynamics of fluid inside a cylindrical tank and of fluid surrounding a

cylindrical pier." Bulletin of the Seismological Society of America, 39, pp. 189-203. [14] NZSEE (1986). "Code of practice for concrete structures for the storage of liquids". Standards Association of New

Zealand, Wellington. [15]

Oil and Gas Pipeline Systems, Chapter 7, ASCE Technical Council on Lifeline Earthquake Engineering, ASCE, pp. 255-370.

[16] -base liquid-storage tanks." Proceedings of U.S - Japan Seminar for Earthquake Engineering Research with Emphasis on Lifeline Systems, Tokyo.

[17] Veletsos, A. S., a [18]

Association for Earthquake Engineering Fifth World Conference, Rome, Italy, 1, pp. 630-639. [19] Veletsos, A. S., and Tang, Y., (1987) "Rocking response of liquid storage tanks", Journal of Engineering

Mechanics, 113(11), pp. 1774-1792. [20] Journal of

Structural Engineering, 112(6), pp. 1228-1246. [21]

Civil Engineers, 98, pp. 418-433