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Line 1: {{Short description\|Physical scale model tested in a large geotechnical centrifuge}} <!--{{more footnotes\|date=January 2012}}--> [[File:Geotechnical centrifuge at the University of California, Davis..png\|thumb\|{{convert\|9\|m\|ft\|adj=mid\|-radius\|0}} geotechnical [[centrifuge]] at the University of California, Davis]] '''Geotechnical centrifuge modeling''' is a technique for testing physical scale models of [[geotechnical\|geotechnical engineering]] systems such as natural and man-made slopes and earth retaining structures and building or bridge foundations.<ref name=craig2001>{{cite book ~~[[File:Geotechnical centrifuge at the University of California, Davis..png\|thumb\|9 m radius geotechnical centrifuge at the University of California, Davis]]~~ \| last1=Craig \| first1=W.H. \| year=2001 'Geotechnical centrifuge modeling' is a technique for testing physical scale models of [[geotechnical\|Geotechnical Engineering]] systems such as natural and man-made slopes and earth retaining structures and building or bridge foundations. The scale [[Physical model\|model]] is typically constructed in the laboratory and then loaded onto the end of the centrifuge, which is typically between 0.2 and 10 m in radius. The purpose of spinning the models on the centrifuge is to increase the g-forces on the model so that stresses in the model are equal to stresses in the prototype. For example, the stress beneath a 0.1 m deep layer of model [[Soil mechanics\|soil]] spun at a centrifugal acceleration of 50 g produces stresses equivalent to those beneath 5 m deep prototype layer of soil in earth's gravity. \| chapter=The seven ages of centrifuge modelling \| title=Proc. Workshop on constitutive and centrifuge modeling: two extremes \| pages=165-174 }}</ref> The scale [[Physical model\|model]] is typically constructed in the laboratory and then loaded onto the end of the [[centrifuge]], which is typically between {{convert\|0.2\|and\|10\|m\|ft\|1}} in radius. The purpose of spinning the models on the centrifuge is to increase the [[g-force]]s on the model so that stresses in the model are equal to stresses in the prototype. For example, the stress beneath a {{convert\|0.1\|m\|ft\|adj=mid\|-deep\|1}} layer of model [[Soil mechanics\|soil]] spun at a centrifugal acceleration of 50 g produces stresses equivalent to those beneath a {{convert\|5\|m\|ft\|adj=mid\|-deep\|0}} prototype layer of soil in earth's [[gravity]]. The idea to use centrifugal acceleration to simulate increased gravitational acceleration was first proposed by Phillips (1869). Pokrovsky and Fedorov (1936) in the Soviet Union and Bucky (1931) in the United States were the first to implement the idea. [[Andrew N. Schofield]] (e.g. Schofield 1980) played a key role in modern development of centrifuge modeling. The idea to use centrifugal acceleration to simulate increased gravitational acceleration was first proposed by Phillips (1869).<ref name=phillips1869>{{Citation ~~==Principles of Centrifuge Modeling==~~ \| last1=Phillips \| first1=Edouard \| year=1869 ~~===Typical Applications===~~ \| title=De l’equilibre des solides elastiques semblables A geotechnical centrifuge is used to test models of geotechnical problems such as the strength, stiffness and capacity of foundations for bridges and buildings, settlement of embankments, stability of slopes, earth retaining structures, tunnel stability and seawalls. Other applications include explosive cratering, contaminant migration in ground water, frost heave and sea ice. The centrifuge may be useful for scale modeling of any large-scale nonlinear problem for which gravity is a primary driving force. \| publisher=C. R. Acad. Sci., Paris \| volume=68 \| pages=75–79 }}</ref> Pokrovsky and Fedorov (1936)<ref>{{Citation \| last1=Pokrovsky \| first1=G. Y. \| last2=Fedorov \| first2=I. S. \| year=1936 \| title=Studies of soil pressures and soil deformations by means of a centrifuge \| publisher=Proc. 1st Int. Conf. On Soil Mechanics & Foundation Engineering \| volume=1 }}</ref> in the Soviet Union and Bucky (1931) <ref>{{Citation \| last1=Bucky \| first1=P.B. \| year=1931 \| title=The use of models for the study of mining problems \| publisher=New York: Am. Inst. Of Min. & Met. Engng. \| volume= Technical Publication 425 }}</ref> in the United States were the first to implement the idea. [[Andrew N. Schofield]] (e.g. Schofield 1980)<ref>{{Citation \| last1=Schofield \| first1=A. N. \| year=1980 \| title=Cambridge geotechnical centrifuge operations \| publisher=Géotechnique \| volume=30 \| issue=3 \| pages=227–268 }}</ref> played a key role in modern development of centrifuge modeling. ==Principles of centrifuge modeling== ~~===Reason for Model Testing on the Centrifuge===~~ Geotechnical materials such as soil and rock have nonlinear mechanical properties that depend on the effective confining stress and stress history. The centrifuge applies an increased "gravitational" acceleration to physical models in order to produce identical self-weight stresses in the model and prototype. The one to one scaling of stress enhances the similarity of geotechnical models and makes it possible to obtain accurate data to help solve complex problems such as earthquake-induced liquefaction, soil-structure interaction and underground transport of pollutants such as dense non-aqueous phase liquids. Centrifuge model testing provides data to improve our understanding of basic mechanisms of deformation and failure and provides benchmarks useful for verification of numerical models. ===~~Scaling~~Typical ~~Laws~~applications=== [[File:Centrifuge Model of a Port Structure.png\|thumb\|Model of a port structure loaded on the UC Davis centrifuge]] Note that in this article, the asterisk on any quantity represents the scale factor for that quantity. For example, in <math>x^* = \frac{x_{m}} {x_{p}}</math>, the subscript m represents "model" and the subscript p represents "prototype" and <math>x^* \,</math> represents the scale factor for the quantity <math>x \,</math>. (Garnier et al. 2007). A geotechnical centrifuge is used to test models of geotechnical problems such as the strength, stiffness and capacity of foundations for bridges and buildings, settlement of embankments,<ref> {{Citation \| last1=Malushitsky \| year=1975 \| title=The centrifugal modelling of waste-heap embankments \| publisher=Russian edition, Kiev, English translation edited by A. N. Schofield, Cambridge University Press (1981) }}</ref> stability of slopes, earth retaining structures,<ref>{{cite book \| last1=Mikasa \| first1=M. \| last2=Takada \| first2=N. \| last3=Yamada \| first3=K.\| year=1969 \| chapter=Centrifugal model test of a rockfill dam. \| title=Proc. 7th Int. Conf. Soil Mechanics & Foundation Engineering 2: \| pages=325–333 \| publisher=México: Sociedad Mexicana de Mecánica de Suelos. }}</ref> tunnel stability and seawalls. Other applications include explosive cratering,<ref name=schmidt1988>{{cite book \| last1=Schmidt \| first1=Robert M. \| year=1988 \| chapter=Centrifuge contributions to cratering technology \| title=Centrifuges in Soil Mechanics \| veditors=Craig et al. \| pages=199-202 \| publisher=Balkema }}</ref> contaminant migration in ground water, frost heave and sea ice. The centrifuge may be useful for scale modeling of any large-scale nonlinear problem for which gravity is a primary driving force. ===Reason for model testing on the centrifuge=== Geotechnical materials such as soil and rock have non-linear mechanical properties that depend on the effective confining stress and stress history. The centrifuge applies an increased "gravitational" [[acceleration]] to physical models in order to produce identical self-weight stresses in the model and prototype. The one to one scaling of stress enhances the similarity of geotechnical models and makes it possible to obtain accurate data to help solve complex problems such as [[earthquake]]-induced liquefaction, soil-structure interaction and underground transport of pollutants such as dense non-aqueous phase liquids. Centrifuge model testing provides data to improve our understanding of basic mechanisms of deformation and failure and provides benchmarks useful for verification of [[numerical model]]s. ===Scaling laws=== Note that in this article, the asterisk on any quantity represents the scale factor for that quantity. For example, in <math>x^* = \frac{x_{m}} {x_{p}}</math>, the subscript m represents "model" and the subscript p represents "prototype" and <math>x^* \,</math> represents the scale factor for the quantity <math>x \,</math>.<ref name=garnier2007/> The reason for spinning a model on a centrifuge is to enable small scale models to feel the same effective stresses as a full -scale prototype. This goal can be stated mathematically as :<math>\sigma'^* = \frac{\sigma'_{m}} {\sigma'_{p}} = 1</math> where the asterisk represents the scaling factor for the quantity, <math>\sigma'_{m}</math> is the effective stress in the model and <math>\sigma'_{p}</math> is the effective stress in the prototype. In [[soil mechanics]] the vertical effective stress, <math>\sigma'</math> for example, is typically calculated by :<math>\sigma' = \sigma^t - u\,</math> where <math>\sigma^t </math> is the total stress and <big><math> u </math></big> is the pore pressure. For a uniform layer with no pore pressure, the total vertical stress at a depth <math>H </math> may be calculated by: :<math>\sigma^t = \rho g H \,</math> where <math> \rho </math> represents the density of the layer and <math> g</math> represents gravity. In the conventional form of centrifuge modeling,<ref ~~(Garnier et al. 2007),~~name=garnier2007/> it is typical that the same materials are used in the model and prototype; therefore the densities are the same in model and prototype, i.e., :<math> \rho^* = 1 \,</math> Line 37 ⟶ 84: :<math>g^* = \frac{1} {L^}</math> The above scaling law states that if lengths in the model are reduced by some factor, n, then gravitational accelerations must be increased by the same factor, n in order to preserve equal stresses in model and prototype. ====Dynamic ~~Problems~~problems==== For dynamic problems where gravity and accelerations are important, all accelerations must scale as gravity is scaled, i.e. :<math>a^ = g^* = \frac{1} {L^}</math> Line 50 ⟶ 97: :<math>T^ = L^* \,</math> Frequency has units of inverse of time, velocity has units of length per time, so for dynamic problems we also obtain :<math>f^* = \frac{1} {L{}}</math> Line 56 ⟶ 103: :<math>v^ = \frac{L^} {T{}} = 1</math> ====Diffusion ~~Problems~~problems==== :<math>T^* = L^{2} \,</math> For model tests involving both dynamics and diffusion, the conflict in time scale factors may be resolved by scaling the permeability of the soil <ref name=garnier2007>{{Citation ~~cv, k, etc.~~ \| last1=Garnier \| first1=J. \| last2=Gaudin \| first2=C. \| last3=Springman \| first3=S.M. \| last4=Culligan \| first4=P.J. \| last5=Goodings \| first5=D.J. \| last6=Konig \| first6=D. \| last7=Kutter \| first7=B.L. \| last8=Phillips \| first8=R. \| last9=Randolph \| first9=M.F. \| last10=Thorel \| first10=L. \| year=2007 \| title=Catalogue of scaling laws and similitude questions in geotechnical centrifuge modelling \| journal=International Journal of Physical Modelling in Geotechnics \| volume=7 \| issue=3 \| pages=1–23 }}</ref> ====Scaling of other quantitites==== (this section obviously needs work!) scale factors for energy, force, pressure, acceleration, velocity, etc. Note that stress has units of pressure, or force per unit area. Thus we can show that Substituting F = m∙a (Newton's law, [[force]] = mass ∙ acceleration) and r = m/L3 (from the definition of mass density). If a 1 m deep model container is filled with soil, placed on the end of a centrifuge and subject to a centrifugal acceleration of 50 g, the pressures and stresses are increased by a factor of 50. So, the vertical stress at the base of the model container is equivalent to the vertical stress at a depth of 50 m below the ground surface on earth -- the 1 m deep model represents 50 m of prototype soil. ~~===geotechnical scaling laws===~~ Note the asterisk on a quantity denotes a scale factor for that quantity, i.e. the ratio of the quantity in the model to the quantity in the prototype. σ may represent any quantity with units of pressure (e.g. elastic modulus, shear strength, stress, pressure). If then the stress in the model (smodel) will be equal to the stress in the prototype (sprototype). With a centrifuge model, we scale down the length (L) of the model and we scale up gravity (g) [or acceleration (a)]. We use the same soil at the same mass density (r) to ensure we get similar behavior. That is, for a given scaling factor N, ~~and~~ ~~Note that stress has units of pressure, or force per unit area. Thus we can write~~ ~~Substituting F = m∙a (Newton’s law, force = mass ∙ acceleration) and r = m/L3 (from the definition of mass density),~~ ~~Substituting from above,~~ Therefore, if we build a reduced-scale model using the same soil at the same mass density, reduce the length by a factor of N while simultaneously increasing gravity by the same factor N, then we ensure that the stress in the model is the same as it would be in the prototype. Scale factors for many other quantities can be derived from the above relationships. The table below summarizes common scale factors for centrifuge testing. Scale Factors for Centrifuge Model Tests (from Garnier et al., 2007 <ref name=garnier2007/>) (Table is suggested to be added here) ==Value of ~~Centrifuge~~centrifuge in ~~Geotechnical~~geotechnical ~~Earthquake~~earthquake ~~Engineering~~engineering== [[File:Schematic Piles In Centrifuge Model.jpg\|thumb\|Schematic of a model containing piles in sloping ground. The dimensions are given in prototype scale. For this experiment the scale factor was 30 or 50.]] Large Earthquakes are infrequent and unrepeatable but they can be devastating. All of these factors make it difficult to obtain the required data to study their effects by post earthquake field investigations. Instrumentation of full scale structures is expensive to maintain over the large periods of time that may elapse between major temblors, and the instrumentation may not be placed in the most scientifically useful locations. Even if engineers are lucky enough to obtain timely recordings of data from real failures, there is no guarantee that the instrumentation is providing repeatable data. In addition, scientifically educational failures from real earthquakes come at the expense of the safety of the public. Understandably, after a real earthquake, most of the interesting data is rapidly cleared away before engineers have an opportunity to adequately study the failure modes. [[File:BrandenbergSoilexcavation.jpg\|thumb\|Excavation of a centrifuge model after liquefaction and lateral spreading.]] {{more citations needed section\|date=January 2021}} Large earthquakes are infrequent and unrepeatable but they can be devastating. All of these factors make it difficult to obtain the required data to study their effects by post earthquake field investigations. Instrumentation of full scale structures is expensive to maintain over the large periods of time that may elapse between major temblors, and the instrumentation may not be placed in the most scientifically useful locations. Even if engineers are lucky enough to obtain timely recordings of data from real failures, there is no guarantee that the instrumentation is providing repeatable data. In addition, scientifically educational failures from real earthquakes come at the expense of the safety of the public. Understandably, after a real earthquake, most of the interesting data is rapidly cleared away before engineers have an opportunity to adequately study the failure modes. Centrifuge modeling is a valuable tool for studying the effects of ground shaking on critical structures without risking the safety of the public. The efficacy of alternative designs or seismic retrofitting techniques can compared in a repeatable scientific series of tests. ==Verification of ~~Numerical~~numerical ~~Models~~models== {{more citations needed section\|date=January 2021}} Centrifuge tests can also be used to obtain experimental data to verify a design procedure or a computer model. The rapid development of computational power over recent decades has revolutionized engineering analysis. Many computer models have been developed to predict the behavior of geotechnical structures during earthquakes and other loads. Before a computer model can be used with confidence, it must be proven to be valid based on evidence. The meager and unrepeatable data provided by natural earthquakes, for example, is usually insufficient for this purpose. Verification of the validity of assumptions made by a computational algorithm is especially important in the area of geotechnical engineering due to the complexity of soil behavior. Soils exhibit highly non-linear behavior, their strength and stiffness depend on their stress history and on the water pressure in the pore fluid, all of which may evolve during the loading caused by an earthquake. The computer models which are intended to simulate these phenomena are very complex and require extensive verification. Experimental data from centrifuge tests is useful for verifying assumptions made by a computational algorithm. If the results show the computer model to be inaccurate, the centrifuge test data provides insight into the physical processes which in turn stimulates the development of better computer models. ==See also== Centrifuge tests can also be used to obtain experimental data to verify a design procedure or a computer model. The rapid development of computational power over the last two decades has revolutionized engineering analysis. Many computer models have been developed to predict the behavior of geotechnical structures during earthquakes. Before a computer model can be used with confidence, it must be proven to be valid based on experimental data. The meager and unrepeatable data provided by natural earthquakes is usually insufficient for this purpose. Verification of the validity of assumptions made by a computer program is especially important in the area of geotechnical engineering due to the complexity of soil behavior. Soils exhibit highly non-linear behavior, their strength and stiffness depend on their stress history and on the water pressure in the pore fluid, all of which may evolve during the loading caused by an earthquake. The computer models which claim to be able to simulate these phenomena are very complex and require extensive verification. The centrifuge is useful for verifying assumptions made by a computer model. If the results show the computer model to be inaccurate, the centrifuge test data provides some insight into the physical processes which in turn stimulates the development of better computer models. {{Portal\| Engineering }} {{colbegin}} [[Andrew N. Schofield]] * [[Civil engineer]] * [[Geotechnical engineering]] * [[Network for Earthquake Engineering Simulation]] * [[Physical model]] * [[Scale model]] * [[Soil mechanics]] {{colend}} ==References== <references/> {{refbegin}} * {{Citation ~~\| surname1=Bucky~~ ~~\| given1=P.B.~~ ~~\| authorlink=~~ ~~\| year=1931~~ ~~\| title=The use of models for the study of mining problems~~ ~~\| publisher=New York: Am. Inst. Of Min. & Met. Engng.~~ ~~\| volume= Technical Publication 425~~ ~~\| issue=~~ ~~\| pages=~~ ~~\| id=~~ ~~\| url=~~ ~~\| accessdate=~~ }} * {{Citation ~~\| surname1=Garnier~~ ~~\| given1=J.~~ ~~\| surname2=Gaudin~~ ~~\| given2=C.~~ ~~\| surname3=Springman~~ ~~\| given3=S.M.~~ ~~\| surname4=Culligan~~ ~~\| given4=P.J.~~ ~~\| surname5=Goodings~~ ~~\| given5=D.J.~~ ~~\| surname6=Konig~~ ~~\| given6=D.~~ ~~\| surname7=Kutter~~ ~~\| given7=B.L.~~ ~~\| surname8=Phillips~~ ~~\| given8=R.~~ ~~\| surname9=Randolph~~ ~~\| given9=M.F.~~ ~~\| surname10=Thorel~~ ~~\| given10=L.~~ ~~\| authorlink=~~ ~~\| year=2007~~ ~~\| title=Catalog of scaling laws and similitude questions in geotechnical centrifuge modelling~~ ~~\| publisher=International Journal of Physical Modelling in Geotechnics~~ ~~\| volume=7~~ ~~\| issue=3~~ ~~\| pages=1-23~~ ~~\| id= ISSN: 1346-213X, E-ISSN: 2042-6550~~ ~~\| url=~~ ~~\| accessdate=~~ }} * {{Citation ~~\| surname1=Malushitsky~~ ~~\| year=1975~~ ~~\| title=The centrifugal modelling of waste-heap embankments~~ ~~\| publisher=Russian edition, Kiev, English translation edited by A. N. Schofield, Cambridge University Press (1981)~~ }} * {{Citation ~~\| surname1=Pokrovsky~~ ~~\| given1=G. Y.~~ ~~\| surname2=Fedorov~~ ~~\| given1=I. S.~~ ~~\| authorlink=~~ ~~\| year=1936~~ ~~\| title=Studies of soil pressures and soil deformations by means of a centrifuge~~ ~~\| publisher=Proc. 1st Int. Conf. On Soil Mechanics & Foundation Engineering~~ ~~\| volume=1~~ ~~\| issue=~~ ~~\| pages=~~ ~~\| id=~~ ~~\| url=~~ ~~\| accessdate=~~ }} * {{Citation ~~\| surname1=Phillips~~ ~~\| given1=Edouard~~ ~~\| authorlink=~~ ~~\| year=1869~~ ~~\| title=De l’equilibre des solides elastiques semblables~~ ~~\| publisher=C. R. Acad. Sci., Paris~~ ~~\| volume=68~~ ~~\| issue=~~ ~~\| pages=75-79~~ ~~\| id=~~ ~~\| url=~~ ~~\| accessdate=~~ }} * {{Citation ~~\| surname1=Schofield~~ ~~\| given1=A. N.~~ ~~\| authorlink=~~ ~~\| year=1980~~ ~~\| title=Cambridge geotechnical centrifuge operations~~ ~~\| publisher=Géotechnique~~ ~~\| volume=30~~ ~~\| issue=3~~ ~~\| pages=227-268~~ ~~\| id=~~ ~~\| url=~~ ~~\| accessdate=~~ }} * {{Citation ~~\| surname1=Craig~~ ~~\| given1=W.H.~~ ~~\| authorlink=~~ ~~\| year=2001~~ ~~\| title=The seven ages of centrifuge modelling~~ ~~\| publisher=Workshop on constitutive and centrifuge modeling: two extremes~~ ~~\| volume=~~ ~~\| issue=~~ ~~\| pages=~~ ~~\| id=~~ ~~\| url=~~ ~~\| accessdate=~~ }} Schofield (1993), From cam clay to centrifuge models, JSSMFE Vol. 41, No. 5 Ser. No. 424 pp 83– 87, No. 6 Ser. No. 425 pp 84–90, No. 7, Ser. No. 426 pp 71–78. ~~Schmidt (1988), in Centrifuges in soil mechanics; Craig, James and Schofield eds. Balkema.~~ {{refend}} ~~Schofield (1993), From cam clay to centrifuge models, JSSMFE Vol. 41, No. 5 Ser. No. 424 pp 83- 87, No. 6 Ser. No. 425 pp 84-90, No. 7, Ser. No. 426 pp 71-78.~~ ==External links== ~~Mikasa M., Takada N. & Yamada K. 1969. Centrifugal model test of a rockfill dam. Proc. 7th Int. Conf.~~ [https://www.issmge.org/committees/technical-committees/fundamentals/physical-modelling Technical committee on physical modelling in geotechnics] ~~Soil Mechanics & Foundation Engineering 2: 325-333. México: Sociedad Mexicana de Mecánica de~~ * [http://www.issmge.org/ International Society for Soil Mechanics and Geotechnical Engineering] ~~Suelos.~~ * [https://web.archive.org/web/20090409030828/http://www.asce.org/asce.cfm American Society of Civil Engineers] ~~{{refend}}~~ [[Category:Tests in geotechnical laboratories]] [[Category:Civil engineering]] [[Category:Scale modeling]]