Finite-amplitude dynamics of coupled cylindrical menisci
The cylindrical meniscus is a liquid/gas interface of circular-cap cross-section constrained along its axis and bounded by end-planes (see figure). The inviscid motions of coupled cylindrical menisci are studied here. Motions result from the competition between inertia and surface tension forces. Re...
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| Veröffentlicht in: | Journal of colloid and interface science 2011-10, Vol.362 (1), p.215-220 |
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| description | The cylindrical meniscus is a liquid/gas interface of circular-cap cross-section constrained along its axis and bounded by end-planes (see figure). The inviscid motions of coupled cylindrical menisci are studied here. Motions result from the competition between inertia and surface tension forces. Restriction to shapes that are of circular-cap cross-section leads to an ordinary differential equation (ode) model, with the advantage that finite-amplitude stability can be examined. The second-order nonlinear ode model has a Hamiltonian structure, showing dynamical behavior like the Duffing-oscillator. The energy landscape has either a single- or double-welled potential depending on the extent of volume overfill. Total liquid volume is a bifurcation parameter. Unlike the spherical-cap problem, however, axial disturbances can also destabilize, depending on overfill. For large volumes, previously known axial stability results are applied to find the limit at which axial symmetry is lost and comparison is made to the Plateau-Rayleigh limit. [Display omitted]
► Inviscid motion of coupled menisci exhibits Duffing-like behavior. ► Total liquid volume is the appropriate bifurcation parameter. ► Large-volume equilibrium states are analogous to constrained full-cylinder. ► Constraint results in stabilization beyond Plateau–Rayleigh limit.
The cylindrical meniscus is a liquid/gas interface of circular-cap cross-section constrained along its axis and bounded by end-planes. The inviscid motions of coupled cylindrical menisci are studied here. Motions result from the competition between inertia and surface tension forces. Restriction to shapes that are of circular-cap cross-section leads to an ordinary differential equation (ode) model, with the advantage that finite-amplitude stability can be examined. The second-order nonlinear ode model has a Hamiltonian structure, showing dynamical behavior like the Duffing-oscillator. The energy landscape has either a single- or double-welled potential depending on the extent of volume overfill. Total liquid volume is a bifurcation parameter, as in the corresponding problem for coupled spherical-cap droplets [1]. Unlike the spherical-cap problem, however, axial disturbances can also destabilize, depending on overfill. For large volumes, previously known axial stability results are applied to find the limit at which axial symmetry is lost and comparison is made to the Plateau–Rayleigh limit. |
| doi_str_mv | 10.1016/j.jcis.2011.06.027 |
| format | Article |
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► Inviscid motion of coupled menisci exhibits Duffing-like behavior. ► Total liquid volume is the appropriate bifurcation parameter. ► Large-volume equilibrium states are analogous to constrained full-cylinder. ► Constraint results in stabilization beyond Plateau–Rayleigh limit.
The cylindrical meniscus is a liquid/gas interface of circular-cap cross-section constrained along its axis and bounded by end-planes. The inviscid motions of coupled cylindrical menisci are studied here. Motions result from the competition between inertia and surface tension forces. Restriction to shapes that are of circular-cap cross-section leads to an ordinary differential equation (ode) model, with the advantage that finite-amplitude stability can be examined. The second-order nonlinear ode model has a Hamiltonian structure, showing dynamical behavior like the Duffing-oscillator. The energy landscape has either a single- or double-welled potential depending on the extent of volume overfill. Total liquid volume is a bifurcation parameter, as in the corresponding problem for coupled spherical-cap droplets [1]. Unlike the spherical-cap problem, however, axial disturbances can also destabilize, depending on overfill. For large volumes, previously known axial stability results are applied to find the limit at which axial symmetry is lost and comparison is made to the Plateau–Rayleigh limit.</description><identifier>ISSN: 0021-9797</identifier><identifier>EISSN: 1095-7103</identifier><identifier>DOI: 10.1016/j.jcis.2011.06.027</identifier><identifier>PMID: 21723560</identifier><identifier>CODEN: JCISA5</identifier><language>eng</language><publisher>Amsterdam: Elsevier Inc</publisher><subject>Bifurcations ; Capillarity ; Chemistry ; Circularity ; Cross sections ; Differential equations ; Droplets ; energy ; equations ; Exact sciences and technology ; Finite-amplitude motion ; Fluid oscillations ; General and physical chemistry ; landscapes ; Liquids ; Menisci ; Plateau–Rayleigh instability ; Stability ; Surface physical chemistry ; Surface tension</subject><ispartof>Journal of colloid and interface science, 2011-10, Vol.362 (1), p.215-220</ispartof><rights>2011 Elsevier Inc.</rights><rights>2015 INIST-CNRS</rights><rights>Copyright © 2011 Elsevier Inc. All rights reserved.</rights><lds50>peer_reviewed</lds50><woscitedreferencessubscribed>false</woscitedreferencessubscribed><cites>FETCH-LOGICAL-c392t-b91682b8d06e7b8898299115b1870793605a7fc5362f697e9f8e2fa12e2c141e3</cites></display><links><openurl>$$Topenurl_article</openurl><openurlfulltext>$$Topenurlfull_article</openurlfulltext><thumbnail>$$Tsyndetics_thumb_exl</thumbnail><linktohtml>$$Uhttps://dx.doi.org/10.1016/j.jcis.2011.06.027$$EHTML$$P50$$Gelsevier$$H</linktohtml><link.rule.ids>314,780,784,3550,27924,27925,45995</link.rule.ids><backlink>$$Uhttp://pascal-francis.inist.fr/vibad/index.php?action=getRecordDetail&idt=24455020$$DView record in Pascal Francis$$Hfree_for_read</backlink><backlink>$$Uhttps://www.ncbi.nlm.nih.gov/pubmed/21723560$$D View this record in MEDLINE/PubMed$$Hfree_for_read</backlink></links><search><creatorcontrib>Cox, B.L.</creatorcontrib><creatorcontrib>Steen, P.H.</creatorcontrib><title>Finite-amplitude dynamics of coupled cylindrical menisci</title><title>Journal of colloid and interface science</title><addtitle>J Colloid Interface Sci</addtitle><description>The cylindrical meniscus is a liquid/gas interface of circular-cap cross-section constrained along its axis and bounded by end-planes (see figure). The inviscid motions of coupled cylindrical menisci are studied here. Motions result from the competition between inertia and surface tension forces. Restriction to shapes that are of circular-cap cross-section leads to an ordinary differential equation (ode) model, with the advantage that finite-amplitude stability can be examined. The second-order nonlinear ode model has a Hamiltonian structure, showing dynamical behavior like the Duffing-oscillator. The energy landscape has either a single- or double-welled potential depending on the extent of volume overfill. Total liquid volume is a bifurcation parameter. Unlike the spherical-cap problem, however, axial disturbances can also destabilize, depending on overfill. For large volumes, previously known axial stability results are applied to find the limit at which axial symmetry is lost and comparison is made to the Plateau-Rayleigh limit. [Display omitted]
► Inviscid motion of coupled menisci exhibits Duffing-like behavior. ► Total liquid volume is the appropriate bifurcation parameter. ► Large-volume equilibrium states are analogous to constrained full-cylinder. ► Constraint results in stabilization beyond Plateau–Rayleigh limit.
The cylindrical meniscus is a liquid/gas interface of circular-cap cross-section constrained along its axis and bounded by end-planes. The inviscid motions of coupled cylindrical menisci are studied here. Motions result from the competition between inertia and surface tension forces. Restriction to shapes that are of circular-cap cross-section leads to an ordinary differential equation (ode) model, with the advantage that finite-amplitude stability can be examined. The second-order nonlinear ode model has a Hamiltonian structure, showing dynamical behavior like the Duffing-oscillator. The energy landscape has either a single- or double-welled potential depending on the extent of volume overfill. Total liquid volume is a bifurcation parameter, as in the corresponding problem for coupled spherical-cap droplets [1]. Unlike the spherical-cap problem, however, axial disturbances can also destabilize, depending on overfill. For large volumes, previously known axial stability results are applied to find the limit at which axial symmetry is lost and comparison is made to the Plateau–Rayleigh limit.</description><subject>Bifurcations</subject><subject>Capillarity</subject><subject>Chemistry</subject><subject>Circularity</subject><subject>Cross sections</subject><subject>Differential equations</subject><subject>Droplets</subject><subject>energy</subject><subject>equations</subject><subject>Exact sciences and technology</subject><subject>Finite-amplitude motion</subject><subject>Fluid oscillations</subject><subject>General and physical chemistry</subject><subject>landscapes</subject><subject>Liquids</subject><subject>Menisci</subject><subject>Plateau–Rayleigh instability</subject><subject>Stability</subject><subject>Surface physical chemistry</subject><subject>Surface tension</subject><issn>0021-9797</issn><issn>1095-7103</issn><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2011</creationdate><recordtype>article</recordtype><recordid>eNqF0D2P1DAQgGELgbjl4A9QQBpElTDjrL8kmtOJA6STKOBqy3HGyKt8LHaCtP8eR7tcCZWbxzOjl7HXCA0Cyg-H5uBjbjggNiAb4OoJ2yEYUSuE9inbAXCsjTLqir3I-QAFCmGesyuOirdCwo7puzjFhWo3Hoe4rD1V_WlyY_S5mkPl5_U4UF_50xCnPkXvhmqkKWYfX7JnwQ2ZXl3ea_Zw9-nH7Zf6_tvnr7c397VvDV_qzqDUvNM9SFKd1kZzY8oZHWoFyrQShFPBi1byII0iEzTx4JAT97hHaq_Z-_PcY5p_rZQXO5b1NAxuonnN1iDIvVBa_VdqDQo1gCiSn6VPc86Jgj2mOLp0sgh2S2sPdktrt7QWpC1py6c3l_FrN1L_-OVvywLeXYDLJVRIbtpmPLr9Xgjgm3t7dsHN1v1MxTx8L5skAEitkRfx8SyohP0dKdkSnCZPfUzkF9vP8V-X_gE9354b</recordid><startdate>20111001</startdate><enddate>20111001</enddate><creator>Cox, B.L.</creator><creator>Steen, P.H.</creator><general>Elsevier Inc</general><general>Elsevier</general><scope>FBQ</scope><scope>IQODW</scope><scope>NPM</scope><scope>AAYXX</scope><scope>CITATION</scope><scope>7X8</scope><scope>7U5</scope><scope>8FD</scope><scope>L7M</scope></search><sort><creationdate>20111001</creationdate><title>Finite-amplitude dynamics of coupled cylindrical menisci</title><author>Cox, B.L. ; Steen, P.H.</author></sort><facets><frbrtype>5</frbrtype><frbrgroupid>cdi_FETCH-LOGICAL-c392t-b91682b8d06e7b8898299115b1870793605a7fc5362f697e9f8e2fa12e2c141e3</frbrgroupid><rsrctype>articles</rsrctype><prefilter>articles</prefilter><language>eng</language><creationdate>2011</creationdate><topic>Bifurcations</topic><topic>Capillarity</topic><topic>Chemistry</topic><topic>Circularity</topic><topic>Cross sections</topic><topic>Differential equations</topic><topic>Droplets</topic><topic>energy</topic><topic>equations</topic><topic>Exact sciences and technology</topic><topic>Finite-amplitude motion</topic><topic>Fluid oscillations</topic><topic>General and physical chemistry</topic><topic>landscapes</topic><topic>Liquids</topic><topic>Menisci</topic><topic>Plateau–Rayleigh instability</topic><topic>Stability</topic><topic>Surface physical chemistry</topic><topic>Surface tension</topic><toplevel>peer_reviewed</toplevel><toplevel>online_resources</toplevel><creatorcontrib>Cox, B.L.</creatorcontrib><creatorcontrib>Steen, P.H.</creatorcontrib><collection>AGRIS</collection><collection>Pascal-Francis</collection><collection>PubMed</collection><collection>CrossRef</collection><collection>MEDLINE - Academic</collection><collection>Solid State and Superconductivity Abstracts</collection><collection>Technology Research Database</collection><collection>Advanced Technologies Database with Aerospace</collection><jtitle>Journal of colloid and interface science</jtitle></facets><delivery><delcategory>Remote Search Resource</delcategory><fulltext>fulltext</fulltext></delivery><addata><au>Cox, B.L.</au><au>Steen, P.H.</au><format>journal</format><genre>article</genre><ristype>JOUR</ristype><atitle>Finite-amplitude dynamics of coupled cylindrical menisci</atitle><jtitle>Journal of colloid and interface science</jtitle><addtitle>J Colloid Interface Sci</addtitle><date>2011-10-01</date><risdate>2011</risdate><volume>362</volume><issue>1</issue><spage>215</spage><epage>220</epage><pages>215-220</pages><issn>0021-9797</issn><eissn>1095-7103</eissn><coden>JCISA5</coden><abstract>The cylindrical meniscus is a liquid/gas interface of circular-cap cross-section constrained along its axis and bounded by end-planes (see figure). The inviscid motions of coupled cylindrical menisci are studied here. Motions result from the competition between inertia and surface tension forces. Restriction to shapes that are of circular-cap cross-section leads to an ordinary differential equation (ode) model, with the advantage that finite-amplitude stability can be examined. The second-order nonlinear ode model has a Hamiltonian structure, showing dynamical behavior like the Duffing-oscillator. The energy landscape has either a single- or double-welled potential depending on the extent of volume overfill. Total liquid volume is a bifurcation parameter. Unlike the spherical-cap problem, however, axial disturbances can also destabilize, depending on overfill. For large volumes, previously known axial stability results are applied to find the limit at which axial symmetry is lost and comparison is made to the Plateau-Rayleigh limit. [Display omitted]
► Inviscid motion of coupled menisci exhibits Duffing-like behavior. ► Total liquid volume is the appropriate bifurcation parameter. ► Large-volume equilibrium states are analogous to constrained full-cylinder. ► Constraint results in stabilization beyond Plateau–Rayleigh limit.
The cylindrical meniscus is a liquid/gas interface of circular-cap cross-section constrained along its axis and bounded by end-planes. The inviscid motions of coupled cylindrical menisci are studied here. Motions result from the competition between inertia and surface tension forces. Restriction to shapes that are of circular-cap cross-section leads to an ordinary differential equation (ode) model, with the advantage that finite-amplitude stability can be examined. The second-order nonlinear ode model has a Hamiltonian structure, showing dynamical behavior like the Duffing-oscillator. The energy landscape has either a single- or double-welled potential depending on the extent of volume overfill. Total liquid volume is a bifurcation parameter, as in the corresponding problem for coupled spherical-cap droplets [1]. Unlike the spherical-cap problem, however, axial disturbances can also destabilize, depending on overfill. For large volumes, previously known axial stability results are applied to find the limit at which axial symmetry is lost and comparison is made to the Plateau–Rayleigh limit.</abstract><cop>Amsterdam</cop><pub>Elsevier Inc</pub><pmid>21723560</pmid><doi>10.1016/j.jcis.2011.06.027</doi><tpages>6</tpages></addata></record> |
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| subjects | Bifurcations Capillarity Chemistry Circularity Cross sections Differential equations Droplets energy equations Exact sciences and technology Finite-amplitude motion Fluid oscillations General and physical chemistry landscapes Liquids Menisci Plateau–Rayleigh instability Stability Surface physical chemistry Surface tension |
| title | Finite-amplitude dynamics of coupled cylindrical menisci |
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