Critical points of the clamped–pinned elastica
We investigate equilibrium configurations of the clamped–pinned elastica where the pinned end can be displaced towards, and past, the clamped end. Solving the nonlinear ordinary differential equation for the clamped–pinned elastica for any mode in terms of elliptic integrals, we find sets of equatio...
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| Veröffentlicht in: | Acta mechanica 2018-12, Vol.229 (12), p.4753-4770 |
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| creator | Singh, P. Goss, V. G. A. |
| description | We investigate equilibrium configurations of the clamped–pinned elastica where the pinned end can be displaced towards, and past, the clamped end. Solving the nonlinear ordinary differential equation for the clamped–pinned elastica for any mode in terms of elliptic integrals, we find sets of equations which govern the equilibrium configurations for given displacements. Equilibrium configurations for various displacements of the pinned end and any mode are obtained by numerically solving those sets of equations. A physical quantity, such as the force that arises in the elastica due to displacement of the pinned end, is taken to be a function of displacement. Although it is generally not possible to define a physical quantity as a function of displacement explicitly, an equation for the rate of change of this physical quantity with respect to displacement can be found by partial differentiation of the sets of equations which govern the equilibrium configurations. Setting that rate of change to zero provides a constraint equation for locating the critical points of that physical quantity. That constraint equation and the sets of equations which govern the equilibrium configurations are solved numerically to obtain the critical points of the physical quantity. Our procedure is demonstrated by finding local extrema on force–displacement plots (useful when analysing the stability of equilibrium configurations) and the maximum deflection of the elastica. Finally, we suggest how our procedure has scope for wider application. |
| doi_str_mv | 10.1007/s00707-018-2259-3 |
| format | Article |
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G. A.</creator><creatorcontrib>Singh, P. ; Goss, V. G. A.</creatorcontrib><description>We investigate equilibrium configurations of the clamped–pinned elastica where the pinned end can be displaced towards, and past, the clamped end. Solving the nonlinear ordinary differential equation for the clamped–pinned elastica for any mode in terms of elliptic integrals, we find sets of equations which govern the equilibrium configurations for given displacements. Equilibrium configurations for various displacements of the pinned end and any mode are obtained by numerically solving those sets of equations. A physical quantity, such as the force that arises in the elastica due to displacement of the pinned end, is taken to be a function of displacement. Although it is generally not possible to define a physical quantity as a function of displacement explicitly, an equation for the rate of change of this physical quantity with respect to displacement can be found by partial differentiation of the sets of equations which govern the equilibrium configurations. Setting that rate of change to zero provides a constraint equation for locating the critical points of that physical quantity. That constraint equation and the sets of equations which govern the equilibrium configurations are solved numerically to obtain the critical points of the physical quantity. Our procedure is demonstrated by finding local extrema on force–displacement plots (useful when analysing the stability of equilibrium configurations) and the maximum deflection of the elastica. Finally, we suggest how our procedure has scope for wider application.</description><identifier>ISSN: 0001-5970</identifier><identifier>EISSN: 1619-6937</identifier><identifier>DOI: 10.1007/s00707-018-2259-3</identifier><language>eng</language><publisher>Vienna: Springer Vienna</publisher><subject>Classical and Continuum Physics ; Configurations ; Control ; Differential equations ; Displacement ; Dynamical Systems ; Elastica ; Elliptic functions ; Engineering ; Engineering Thermodynamics ; Heat and Mass Transfer ; Mathematical analysis ; Nonlinear differential equations ; Original Paper ; Product differentiation ; Production factors ; Solid Mechanics ; Stability analysis ; Theoretical and Applied Mechanics ; Vibration</subject><ispartof>Acta mechanica, 2018-12, Vol.229 (12), p.4753-4770</ispartof><rights>The Author(s) 2018</rights><rights>COPYRIGHT 2018 Springer</rights><rights>Acta Mechanica is a copyright of Springer, (2018). All Rights Reserved. © 2018. 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G. A.</creatorcontrib><title>Critical points of the clamped–pinned elastica</title><title>Acta mechanica</title><addtitle>Acta Mech</addtitle><description>We investigate equilibrium configurations of the clamped–pinned elastica where the pinned end can be displaced towards, and past, the clamped end. Solving the nonlinear ordinary differential equation for the clamped–pinned elastica for any mode in terms of elliptic integrals, we find sets of equations which govern the equilibrium configurations for given displacements. Equilibrium configurations for various displacements of the pinned end and any mode are obtained by numerically solving those sets of equations. A physical quantity, such as the force that arises in the elastica due to displacement of the pinned end, is taken to be a function of displacement. Although it is generally not possible to define a physical quantity as a function of displacement explicitly, an equation for the rate of change of this physical quantity with respect to displacement can be found by partial differentiation of the sets of equations which govern the equilibrium configurations. Setting that rate of change to zero provides a constraint equation for locating the critical points of that physical quantity. That constraint equation and the sets of equations which govern the equilibrium configurations are solved numerically to obtain the critical points of the physical quantity. Our procedure is demonstrated by finding local extrema on force–displacement plots (useful when analysing the stability of equilibrium configurations) and the maximum deflection of the elastica. Finally, we suggest how our procedure has scope for wider application.</description><subject>Classical and Continuum Physics</subject><subject>Configurations</subject><subject>Control</subject><subject>Differential equations</subject><subject>Displacement</subject><subject>Dynamical Systems</subject><subject>Elastica</subject><subject>Elliptic functions</subject><subject>Engineering</subject><subject>Engineering Thermodynamics</subject><subject>Heat and Mass Transfer</subject><subject>Mathematical analysis</subject><subject>Nonlinear differential equations</subject><subject>Original Paper</subject><subject>Product differentiation</subject><subject>Production factors</subject><subject>Solid Mechanics</subject><subject>Stability analysis</subject><subject>Theoretical and Applied Mechanics</subject><subject>Vibration</subject><issn>0001-5970</issn><issn>1619-6937</issn><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2018</creationdate><recordtype>article</recordtype><sourceid>C6C</sourceid><sourceid>8G5</sourceid><sourceid>BENPR</sourceid><sourceid>GUQSH</sourceid><sourceid>M2O</sourceid><recordid>eNp1kM1KxDAQx4MouK4-gLeC5-gkzUd7XBa_QPCi5zBNkzVLt61J9-DNd_ANfRKzVPAkgcnM8P_NDH9CLhlcMwB9k3IATYFVlHNZ0_KILJhiNVV1qY_JAgAYlbWGU3KW0jZXXAu2ILCOYQoWu2IcQj-lYvDF9OYK2-FudO3359cY-t61heswHYTn5MRjl9zF778kr3e3L-sH-vR8_7hePVErhJooSmGlQqukQOtZBY4jSJQ1YKvbnJVNyTyWDn0DsuEVr2vXNNY2stWq4eWSXM1zxzi8712azHbYxz6vNJyBEFIp0Fl1Pas22DkTej9MEW1-rdsFO_TOh9xfSSU4qyoGGWAzYOOQUnTejDHsMH4YBubgpJmdNNlJc3DSlJnhM5Oytt-4-HfK_9APDHh2Bg</recordid><startdate>20181201</startdate><enddate>20181201</enddate><creator>Singh, P.</creator><creator>Goss, V. 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G. A.</au><format>journal</format><genre>article</genre><ristype>JOUR</ristype><atitle>Critical points of the clamped–pinned elastica</atitle><jtitle>Acta mechanica</jtitle><stitle>Acta Mech</stitle><date>2018-12-01</date><risdate>2018</risdate><volume>229</volume><issue>12</issue><spage>4753</spage><epage>4770</epage><pages>4753-4770</pages><issn>0001-5970</issn><eissn>1619-6937</eissn><abstract>We investigate equilibrium configurations of the clamped–pinned elastica where the pinned end can be displaced towards, and past, the clamped end. Solving the nonlinear ordinary differential equation for the clamped–pinned elastica for any mode in terms of elliptic integrals, we find sets of equations which govern the equilibrium configurations for given displacements. Equilibrium configurations for various displacements of the pinned end and any mode are obtained by numerically solving those sets of equations. A physical quantity, such as the force that arises in the elastica due to displacement of the pinned end, is taken to be a function of displacement. Although it is generally not possible to define a physical quantity as a function of displacement explicitly, an equation for the rate of change of this physical quantity with respect to displacement can be found by partial differentiation of the sets of equations which govern the equilibrium configurations. Setting that rate of change to zero provides a constraint equation for locating the critical points of that physical quantity. That constraint equation and the sets of equations which govern the equilibrium configurations are solved numerically to obtain the critical points of the physical quantity. Our procedure is demonstrated by finding local extrema on force–displacement plots (useful when analysing the stability of equilibrium configurations) and the maximum deflection of the elastica. Finally, we suggest how our procedure has scope for wider application.</abstract><cop>Vienna</cop><pub>Springer Vienna</pub><doi>10.1007/s00707-018-2259-3</doi><tpages>18</tpages><oa>free_for_read</oa></addata></record> |
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| subjects | Classical and Continuum Physics Configurations Control Differential equations Displacement Dynamical Systems Elastica Elliptic functions Engineering Engineering Thermodynamics Heat and Mass Transfer Mathematical analysis Nonlinear differential equations Original Paper Product differentiation Production factors Solid Mechanics Stability analysis Theoretical and Applied Mechanics Vibration |
| title | Critical points of the clamped–pinned elastica |
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