Analyzing Nonlinear Structures with Random Excitation Using Integral Quadratic Constraints

Sze Kwan Cheah; Ryan J. Caverly

doi:10.1007/978-3-031-69409-7_14

Analyzing Nonlinear Structures with Random Excitation Using Integral Quadratic Constraints

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution

Abstract

Modeling the response of nonlinear structures due to random excitation is crucial for the design of mechanical systems, including the estimation of loading on mechanical joints and the fatigue life of nonlinear components. This chapter presents a method for bounding the maximum variance of the output response of a nonlinear system under random excitation of known power spectral density. The proposed approach leverages integral quadratic constraints (IQCs) that enclose the relationship between inputs and outputs of the nonlinearity sufficiently for analysis. While IQCs have traditionally been employed in robust control to analyze stability and performance, recent advancements have extended its applications to analyzing optimization algorithm rate of convergence and stability of transitional flows. In this chapter, we explore an optimization-based algorithm that harnesses different IQCs to bound the nonlinearities in the system. To validate the efficacy of the proposed algorithm, we apply it to the analysis of the Duffing equation, a well-known nonlinear oscillator. Results demonstrate the effectiveness of the algorithm in bounding the maximum variance of the system’s response and its potential for application in the design and analysis of nonlinear structures subject to random vibration.

Original language	English (US)
Title of host publication	Nonlinear Structures and Systems - Proceedings of the 42nd IMAC, A Conference and Exposition on Structural Dynamics 2024
Editors	Matthew R. W. Brake, Ludovic Renson, Robert J. Kuether, Paolo Tiso
Publisher	Springer
Pages	79-82
Number of pages	4
ISBN (Print)	9783031694080
DOIs	https://doi.org/10.1007/978-3-031-69409-7_14
State	Published - 2024
Externally published	Yes
Event	42nd IMAC, A Conference and Exposition on Structural Dynamics, IMAC 2024 - Orlando, United States Duration: Jan 29 2024 → Feb 1 2024

Publication series

Name	Conference Proceedings of the Society for Experimental Mechanics Series
ISSN (Print)	2191-5644
ISSN (Electronic)	2191-5652

Conference

Conference	42nd IMAC, A Conference and Exposition on Structural Dynamics, IMAC 2024
Country/Territory	United States
City	Orlando
Period	1/29/24 → 2/1/24

Bibliographical note

Publisher Copyright:
© The Society for Experimental Mechanics, Inc. 2024.

Keywords

Forced-damped vibrations
Nonlinear simulation
Nonlinear structural dynamics
Nonlinear vibrations
Random response

Publisher link

10.1007/978-3-031-69409-7_14

Find It

Find It at U of M Libraries

Cite this

Cheah, S. K., & Caverly, R. J. (2024). Analyzing Nonlinear Structures with Random Excitation Using Integral Quadratic Constraints. In M. R. W. Brake, L. Renson, R. J. Kuether, & P. Tiso (Eds.), Nonlinear Structures and Systems - Proceedings of the 42nd IMAC, A Conference and Exposition on Structural Dynamics 2024 (pp. 79-82). (Conference Proceedings of the Society for Experimental Mechanics Series). Springer. https://doi.org/10.1007/978-3-031-69409-7_14

Analyzing Nonlinear Structures with Random Excitation Using Integral Quadratic Constraints. / Cheah, Sze Kwan; Caverly, Ryan J.
Nonlinear Structures and Systems - Proceedings of the 42nd IMAC, A Conference and Exposition on Structural Dynamics 2024. ed. / Matthew R. W. Brake; Ludovic Renson; Robert J. Kuether; Paolo Tiso. Springer, 2024. p. 79-82 (Conference Proceedings of the Society for Experimental Mechanics Series).

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution

Cheah, SK & Caverly, RJ 2024, Analyzing Nonlinear Structures with Random Excitation Using Integral Quadratic Constraints. in MRW Brake, L Renson, RJ Kuether & P Tiso (eds), Nonlinear Structures and Systems - Proceedings of the 42nd IMAC, A Conference and Exposition on Structural Dynamics 2024. Conference Proceedings of the Society for Experimental Mechanics Series, Springer, pp. 79-82, 42nd IMAC, A Conference and Exposition on Structural Dynamics, IMAC 2024, Orlando, United States, 1/29/24. https://doi.org/10.1007/978-3-031-69409-7_14

Cheah SK, Caverly RJ. Analyzing Nonlinear Structures with Random Excitation Using Integral Quadratic Constraints. In Brake MRW, Renson L, Kuether RJ, Tiso P, editors, Nonlinear Structures and Systems - Proceedings of the 42nd IMAC, A Conference and Exposition on Structural Dynamics 2024. Springer. 2024. p. 79-82. (Conference Proceedings of the Society for Experimental Mechanics Series). doi: 10.1007/978-3-031-69409-7_14

Cheah, Sze Kwan ; Caverly, Ryan J. / Analyzing Nonlinear Structures with Random Excitation Using Integral Quadratic Constraints. Nonlinear Structures and Systems - Proceedings of the 42nd IMAC, A Conference and Exposition on Structural Dynamics 2024. editor / Matthew R. W. Brake ; Ludovic Renson ; Robert J. Kuether ; Paolo Tiso. Springer, 2024. pp. 79-82 (Conference Proceedings of the Society for Experimental Mechanics Series).

@inproceedings{34a6d7c0821443d8abd20d3a8f71cf6c,

title = "Analyzing Nonlinear Structures with Random Excitation Using Integral Quadratic Constraints",

abstract = "Modeling the response of nonlinear structures due to random excitation is crucial for the design of mechanical systems, including the estimation of loading on mechanical joints and the fatigue life of nonlinear components. This chapter presents a method for bounding the maximum variance of the output response of a nonlinear system under random excitation of known power spectral density. The proposed approach leverages integral quadratic constraints (IQCs) that enclose the relationship between inputs and outputs of the nonlinearity sufficiently for analysis. While IQCs have traditionally been employed in robust control to analyze stability and performance, recent advancements have extended its applications to analyzing optimization algorithm rate of convergence and stability of transitional flows. In this chapter, we explore an optimization-based algorithm that harnesses different IQCs to bound the nonlinearities in the system. To validate the efficacy of the proposed algorithm, we apply it to the analysis of the Duffing equation, a well-known nonlinear oscillator. Results demonstrate the effectiveness of the algorithm in bounding the maximum variance of the system{\textquoteright}s response and its potential for application in the design and analysis of nonlinear structures subject to random vibration.",

keywords = "Forced-damped vibrations, Nonlinear simulation, Nonlinear structural dynamics, Nonlinear vibrations, Random response",

author = "Cheah, {Sze Kwan} and Caverly, {Ryan J.}",

note = "Publisher Copyright: {\textcopyright} The Society for Experimental Mechanics, Inc. 2024.; 42nd IMAC, A Conference and Exposition on Structural Dynamics, IMAC 2024 ; Conference date: 29-01-2024 Through 01-02-2024",

year = "2024",

doi = "10.1007/978-3-031-69409-7_14",

language = "English (US)",

isbn = "9783031694080",

series = "Conference Proceedings of the Society for Experimental Mechanics Series",

publisher = "Springer",

pages = "79--82",

editor = "Brake, {Matthew R. W.} and Ludovic Renson and Kuether, {Robert J.} and Paolo Tiso",

booktitle = "Nonlinear Structures and Systems - Proceedings of the 42nd IMAC, A Conference and Exposition on Structural Dynamics 2024",

}

TY - GEN

T1 - Analyzing Nonlinear Structures with Random Excitation Using Integral Quadratic Constraints

AU - Cheah, Sze Kwan

AU - Caverly, Ryan J.

N1 - Publisher Copyright: © The Society for Experimental Mechanics, Inc. 2024.

PY - 2024

Y1 - 2024

N2 - Modeling the response of nonlinear structures due to random excitation is crucial for the design of mechanical systems, including the estimation of loading on mechanical joints and the fatigue life of nonlinear components. This chapter presents a method for bounding the maximum variance of the output response of a nonlinear system under random excitation of known power spectral density. The proposed approach leverages integral quadratic constraints (IQCs) that enclose the relationship between inputs and outputs of the nonlinearity sufficiently for analysis. While IQCs have traditionally been employed in robust control to analyze stability and performance, recent advancements have extended its applications to analyzing optimization algorithm rate of convergence and stability of transitional flows. In this chapter, we explore an optimization-based algorithm that harnesses different IQCs to bound the nonlinearities in the system. To validate the efficacy of the proposed algorithm, we apply it to the analysis of the Duffing equation, a well-known nonlinear oscillator. Results demonstrate the effectiveness of the algorithm in bounding the maximum variance of the system’s response and its potential for application in the design and analysis of nonlinear structures subject to random vibration.

AB - Modeling the response of nonlinear structures due to random excitation is crucial for the design of mechanical systems, including the estimation of loading on mechanical joints and the fatigue life of nonlinear components. This chapter presents a method for bounding the maximum variance of the output response of a nonlinear system under random excitation of known power spectral density. The proposed approach leverages integral quadratic constraints (IQCs) that enclose the relationship between inputs and outputs of the nonlinearity sufficiently for analysis. While IQCs have traditionally been employed in robust control to analyze stability and performance, recent advancements have extended its applications to analyzing optimization algorithm rate of convergence and stability of transitional flows. In this chapter, we explore an optimization-based algorithm that harnesses different IQCs to bound the nonlinearities in the system. To validate the efficacy of the proposed algorithm, we apply it to the analysis of the Duffing equation, a well-known nonlinear oscillator. Results demonstrate the effectiveness of the algorithm in bounding the maximum variance of the system’s response and its potential for application in the design and analysis of nonlinear structures subject to random vibration.

KW - Forced-damped vibrations

KW - Nonlinear simulation

KW - Nonlinear structural dynamics

KW - Nonlinear vibrations

KW - Random response

UR - http://www.scopus.com/inward/record.url?scp=85207825892&partnerID=8YFLogxK

UR - http://www.scopus.com/inward/citedby.url?scp=85207825892&partnerID=8YFLogxK

U2 - 10.1007/978-3-031-69409-7_14

DO - 10.1007/978-3-031-69409-7_14

M3 - Conference contribution

AN - SCOPUS:85207825892

SN - 9783031694080

T3 - Conference Proceedings of the Society for Experimental Mechanics Series

SP - 79

EP - 82

BT - Nonlinear Structures and Systems - Proceedings of the 42nd IMAC, A Conference and Exposition on Structural Dynamics 2024

A2 - Brake, Matthew R. W.

A2 - Renson, Ludovic

A2 - Kuether, Robert J.

A2 - Tiso, Paolo

PB - Springer

T2 - 42nd IMAC, A Conference and Exposition on Structural Dynamics, IMAC 2024

Y2 - 29 January 2024 through 1 February 2024

ER -

Analyzing Nonlinear Structures with Random Excitation Using Integral Quadratic Constraints

Abstract

Publication series

Conference

Bibliographical note

Keywords

Publisher link

Find It

Other files and links

Fingerprint

Cite this