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Implications of Buckingham’s Pi Theorem to the Study of Similitude in Discrete Structures: Introduction of the R_F^N, μ^N, and S^N Dimensionless Numbers and the Concept of Structural Speed

Rosakis, Ares J. and Andrade, José E. and Gabuchian, Vahe and Harmon, John M. and Conte, Joel P. and Restrepo, José I. and Rodriguez, Andrés and Nema, Arpit and Pedretti, Andrea R. (2021) Implications of Buckingham’s Pi Theorem to the Study of Similitude in Discrete Structures: Introduction of the R_F^N, μ^N, and S^N Dimensionless Numbers and the Concept of Structural Speed. Journal of Applied Mechanics, 88 (9). Art. No. 091008. ISSN 0021-8936. doi:10.1115/1.4051338. https://resolver.caltech.edu/CaltechAUTHORS:20210929-175142710

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Abstract

Motivated by the need to evaluate the seismic response of large-capacity gravity energy storage systems (potential energy batteries) such as the proposed frictional Multiblock Tower Structures (MTS) recently discussed by Andrade et al. (2021, “Seismic Performance Assessment of Multiblock Tower Structures As Gravity Energy Storage Systems,” ASME J. Appl. Mech., Submitted), we apply Buckingham’s Pi theorem (Buckingham, E., 1914, “On Physically Similar Systems; Illustrations of the Use of Dimensional Equations,” Phys. Rev., 4, pp. 345–376) to identify the most general forms of dimensionless numbers and dynamic similitude laws appropriate for scaling discontinuous multiblock structural systems involving general restoring forces resisting inertial loading. We begin by introducing the dimensionless “mu-number” (μ^N) appropriate for both gravitational and frictional restoring forces and then generalize by introducing the “arbitrary restoring force number” (⁠R^N_F⁠). R^N_F is subsequently employed to study similitude in various types of discontinuous or discrete systems featuring frictional, gravitational, cohesive, elastic, and mixed restoring forces acting at the block interfaces. In the process, we explore the additional consequences of inter and intra-block elasticity on scaling. We also formulate a model describing the mechanism of structural signal transmission for the case of rigid MTS featuring inter-block restoring forces composed of elastic springs and interfacial friction, introducing the concept of “structural speed.” Finally, we validate our results by demonstrating that dynamic time-histories of field quantities and structural speeds between MTS models at various scales are governed by our proposed similitude laws, thus demonstrating the consistency of our approach.


Item Type:Article
Related URLs:
URLURL TypeDescription
https://doi.org/10.1115/1.4051338DOIArticle
ORCID:
AuthorORCID
Rosakis, Ares J.0000-0003-0559-0794
Andrade, José E.0000-0003-3741-0364
Conte, Joel P.0000-0003-2068-7965
Alternate Title:Implications of Buckingham’s Pi Theorem to the Study of Similitude in Discrete Structures: Introduction of the RFN, μN, and SN Dimensionless Numbers and the Concept of Structural Speed
Additional Information:© 2021 The American Society of Mechanical Engineers. Paper No: JAM-21-1204. Received: May 5, 2021; Revised: May 13, 2021; Accepted: May 14, 2021; Published: July 12, 2021. This research was supported by Energy Vault, Inc. We gratefully acknowledge Energy Vault’s support, encouragement and freedom during this project. We also thank the contractors (Whiteside Concrete Construction, Dynamic Isolation Systems, BlockMex, TCI Precision Metals, AbelCine, Samy’s Camera, Luka Grip & Lighting, DTC Lighting & Grip), and university facility personnel at UCB and Caltech for their commitment to this project. Data Availability Statement: The authors attest that all data for this study are included in the paper.
Group:GALCIT
Funders:
Funding AgencyGrant Number
Energy Vault, Inc.UNSPECIFIED
Subject Keywords:discontinuous system, discrete frictional structures, dynamic similitude, scaling, seismic testing
Issue or Number:9
DOI:10.1115/1.4051338
Record Number:CaltechAUTHORS:20210929-175142710
Persistent URL:https://resolver.caltech.edu/CaltechAUTHORS:20210929-175142710
Official Citation:Rosakis, A. J., Andrade, J. E., Gabuchian, V., Harmon, J. M., Conte, J. P., Restrepo, J. I., Rodriguez, A., Nema, A., and Pedretti, A. R. (July 12, 2021). "Implications of Buckingham’s Pi Theorem to the Study of Similitude in Discrete Structures: Introduction of the RNF⁠, μN⁠, and SN Dimensionless Numbers and the Concept of Structural Speed." ASME. J. Appl. Mech. September 2021; 88(9): 091008. https://doi.org/10.1115/1.4051338
Usage Policy:No commercial reproduction, distribution, display or performance rights in this work are provided.
ID Code:111094
Collection:CaltechAUTHORS
Deposited By: Tony Diaz
Deposited On:04 Oct 2021 19:27
Last Modified:04 Oct 2021 20:27

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