Proportional viscous damping model for matching damping ratios

•A new proportional model for matching user-specified modal damping ratios.•It overcomes the limitations of Rayleigh, Caughey, and Wilson-Penzien models.•It is accurate for constant modal damping within a broad range of frequencies.•It enforces zero damping for rigid body modes and avoids spurious d...

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Veröffentlicht in:Engineering structures 2020-03, Vol.207, p.110178, Article 110178
1. Verfasser: Lee, Chin-Long
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description •A new proportional model for matching user-specified modal damping ratios.•It overcomes the limitations of Rayleigh, Caughey, and Wilson-Penzien models.•It is accurate for constant modal damping within a broad range of frequencies.•It enforces zero damping for rigid body modes and avoids spurious damping forces.•Graphs, tables, and formulas are given for optimized values of model parameters. A proportional viscous damping model is proposed to address the limitations of existing models that are either inaccurate or computationally costly in matching damping ratios. The proposed model allows easy curve-fitting to a given damping ratio distribution with negligible error and is remarkably accurate for matching a constant damping ratio within a practical range of structural frequencies, which is commonly considered in seismic response history analysis of large-scale structures for simulating ‘un-modeled’ damping. The resultant curve is always positive and is zero only at zero and infinite frequencies, thereby avoiding spurious damping forces and undamped response in higher vibration modes that would otherwise cause significant errors in structural forces. The model combines several bell-shape basis functions, with each parameterized by the frequency and damping ratio at its peak, to form a user-specified damping ratio curve. Three methods are suggested to determine the coefficients of the proposed model: exact, linear least squares, and nonlinear least squares curve fitting. In the first method, the matrix for determining the model coefficients is always well-conditioned and symmetric positive definite. Several graphs and formulas are provided to help users determine the required number of basis functions, resultant maximum residuals, and optimized coefficients for matching a constant damping ratio within a practical range of frequencies. Two response history analysis examples showcase the performance of the proposed model compared against existing proportional damping models.
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A proportional viscous damping model is proposed to address the limitations of existing models that are either inaccurate or computationally costly in matching damping ratios. The proposed model allows easy curve-fitting to a given damping ratio distribution with negligible error and is remarkably accurate for matching a constant damping ratio within a practical range of structural frequencies, which is commonly considered in seismic response history analysis of large-scale structures for simulating ‘un-modeled’ damping. The resultant curve is always positive and is zero only at zero and infinite frequencies, thereby avoiding spurious damping forces and undamped response in higher vibration modes that would otherwise cause significant errors in structural forces. The model combines several bell-shape basis functions, with each parameterized by the frequency and damping ratio at its peak, to form a user-specified damping ratio curve. Three methods are suggested to determine the coefficients of the proposed model: exact, linear least squares, and nonlinear least squares curve fitting. In the first method, the matrix for determining the model coefficients is always well-conditioned and symmetric positive definite. Several graphs and formulas are provided to help users determine the required number of basis functions, resultant maximum residuals, and optimized coefficients for matching a constant damping ratio within a practical range of frequencies. 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Three methods are suggested to determine the coefficients of the proposed model: exact, linear least squares, and nonlinear least squares curve fitting. In the first method, the matrix for determining the model coefficients is always well-conditioned and symmetric positive definite. Several graphs and formulas are provided to help users determine the required number of basis functions, resultant maximum residuals, and optimized coefficients for matching a constant damping ratio within a practical range of frequencies. Two response history analysis examples showcase the performance of the proposed model compared against existing proportional damping models.</description><subject>Basis functions</subject><subject>Coefficients</subject><subject>Computer simulation</subject><subject>Constant damping ratio</subject><subject>Curve fitting</subject><subject>Damping ratio</subject><subject>Earthquake dampers</subject><subject>Least squares</subject><subject>Mathematical models</subject><subject>Matrix methods</subject><subject>Model matching</subject><subject>Proportional damping model</subject><subject>Seismic analysis</subject><subject>Seismic response</subject><subject>Spurious damping forces</subject><subject>Un-modeled damping</subject><subject>Undamped response</subject><subject>Vibration mode</subject><subject>Viscous damping</subject><subject>Well-conditioned matrix</subject><issn>0141-0296</issn><issn>1873-7323</issn><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2020</creationdate><recordtype>article</recordtype><recordid>eNqFkE9LxDAQxYMouK5-Bgueu06SbZNchGXxHyzoQc8hTZM1ZdvUpF3w25tS9epp4M17j5kfQtcYVhhwedusTLePQxj1sCJAkppkxk_QAnNGc0YJPUULwGucAxHlObqIsQEAwjks0N1r8L0Pg_OdOmRHF7UfY1artnfdPmt9bQ6Z9SFr1aA_Jul3FVTKxEt0ZtUhmqufuUTvD_dv26d89_L4vN3scr0GMeRaWaClqkGDFYQVBWaaKEowcMF5YTkrKmJEZUVFqCaarKsaC1FwqrFgwOkS3cy9ffCfo4mDbPwY0slREspKgktWTC42u3TwMQZjZR9cq8KXxCAnWLKRf7DkBEvOsFJyMydNeuLoTJBRO9NpU7tgkrf27t-Ob4zZdp0</recordid><startdate>20200315</startdate><enddate>20200315</enddate><creator>Lee, Chin-Long</creator><general>Elsevier Ltd</general><general>Elsevier BV</general><scope>AAYXX</scope><scope>CITATION</scope><scope>7SR</scope><scope>7ST</scope><scope>8BQ</scope><scope>8FD</scope><scope>C1K</scope><scope>FR3</scope><scope>JG9</scope><scope>KR7</scope><scope>SOI</scope></search><sort><creationdate>20200315</creationdate><title>Proportional viscous damping model for matching damping ratios</title><author>Lee, Chin-Long</author></sort><facets><frbrtype>5</frbrtype><frbrgroupid>cdi_FETCH-LOGICAL-c409t-caf036ad0c0f9275517c2a321089885f875b2e9bf9b23c2c24bd199583c197083</frbrgroupid><rsrctype>articles</rsrctype><prefilter>articles</prefilter><language>eng</language><creationdate>2020</creationdate><topic>Basis functions</topic><topic>Coefficients</topic><topic>Computer simulation</topic><topic>Constant damping ratio</topic><topic>Curve fitting</topic><topic>Damping ratio</topic><topic>Earthquake dampers</topic><topic>Least squares</topic><topic>Mathematical models</topic><topic>Matrix methods</topic><topic>Model matching</topic><topic>Proportional damping model</topic><topic>Seismic analysis</topic><topic>Seismic response</topic><topic>Spurious damping forces</topic><topic>Un-modeled damping</topic><topic>Undamped response</topic><topic>Vibration mode</topic><topic>Viscous damping</topic><topic>Well-conditioned matrix</topic><toplevel>peer_reviewed</toplevel><toplevel>online_resources</toplevel><creatorcontrib>Lee, Chin-Long</creatorcontrib><collection>CrossRef</collection><collection>Engineered Materials Abstracts</collection><collection>Environment Abstracts</collection><collection>METADEX</collection><collection>Technology Research Database</collection><collection>Environmental Sciences and Pollution Management</collection><collection>Engineering Research Database</collection><collection>Materials Research Database</collection><collection>Civil Engineering Abstracts</collection><collection>Environment Abstracts</collection><jtitle>Engineering structures</jtitle></facets><delivery><delcategory>Remote Search Resource</delcategory><fulltext>fulltext</fulltext></delivery><addata><au>Lee, Chin-Long</au><format>journal</format><genre>article</genre><ristype>JOUR</ristype><atitle>Proportional viscous damping model for matching damping ratios</atitle><jtitle>Engineering structures</jtitle><date>2020-03-15</date><risdate>2020</risdate><volume>207</volume><spage>110178</spage><pages>110178-</pages><artnum>110178</artnum><issn>0141-0296</issn><eissn>1873-7323</eissn><abstract>•A new proportional model for matching user-specified modal damping ratios.•It overcomes the limitations of Rayleigh, Caughey, and Wilson-Penzien models.•It is accurate for constant modal damping within a broad range of frequencies.•It enforces zero damping for rigid body modes and avoids spurious damping forces.•Graphs, tables, and formulas are given for optimized values of model parameters. 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Three methods are suggested to determine the coefficients of the proposed model: exact, linear least squares, and nonlinear least squares curve fitting. In the first method, the matrix for determining the model coefficients is always well-conditioned and symmetric positive definite. Several graphs and formulas are provided to help users determine the required number of basis functions, resultant maximum residuals, and optimized coefficients for matching a constant damping ratio within a practical range of frequencies. Two response history analysis examples showcase the performance of the proposed model compared against existing proportional damping models.</abstract><cop>Kidlington</cop><pub>Elsevier Ltd</pub><doi>10.1016/j.engstruct.2020.110178</doi></addata></record>
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subjects Basis functions
Coefficients
Computer simulation
Constant damping ratio
Curve fitting
Damping ratio
Earthquake dampers
Least squares
Mathematical models
Matrix methods
Model matching
Proportional damping model
Seismic analysis
Seismic response
Spurious damping forces
Un-modeled damping
Undamped response
Vibration mode
Viscous damping
Well-conditioned matrix
title Proportional viscous damping model for matching damping ratios
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