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Area tensors for modeling microstructure during laminar liquid-liquid mixing
Fluid-fluid mixtures often possess a fine structure, or morphology, whose length scale is much smaller than the length scale over which the flow field and morphology vary. We define a microstructural variable called the area tensor, which describes the local morphology of such mixtures through volum...
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| Published in: | International journal of multiphase flow 1999-02, Vol.25 (1), p.35-61 |
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| Main Authors: | , |
| Format: | Article |
| Language: | English |
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| cites | cdi_FETCH-LOGICAL-c457t-9ad4c9ed273437dd36f5b8d31f1f9cf2b9881aff62edd9e0adddd5d3863ae20c3 |
| container_end_page | 61 |
| container_issue | 1 |
| container_start_page | 35 |
| container_title | International journal of multiphase flow |
| container_volume | 25 |
| creator | Wetzel, E.D. Tucker, C.L. |
| description | Fluid-fluid mixtures often possess a fine structure, or morphology, whose length scale is much smaller than the length scale over which the flow field and morphology vary. We define a microstructural variable called the
area tensor, which describes the local morphology of such mixtures through volume-averaged size, shape, and orientation characteristics. The area tensor is equivalent to the interface tensor of the rheological model, and is closely related to the general microstructural tensors. The evolution equation for the area tensor during laminar mixing is derived for the case of equal component viscosities and negligible surface tension. Solution of this evolution equation requires a closure approximation for estimating higher-order microstructural statistics. A closure approximation is generated based on exact area tensor relations for ellipsoidal shapes, and is shown to provide highly accurate evolutions of the area tensor. Area tensor histories are calculated in homogeneous elongational and shearing flows, as well as in temporally and spatially varying flows. The results are shown to be consistent with well-known mixing principles. |
| doi_str_mv | 10.1016/S0301-9322(98)00013-5 |
| format | article |
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area tensor, which describes the local morphology of such mixtures through volume-averaged size, shape, and orientation characteristics. The area tensor is equivalent to the interface tensor of the rheological model, and is closely related to the general microstructural tensors. The evolution equation for the area tensor during laminar mixing is derived for the case of equal component viscosities and negligible surface tension. Solution of this evolution equation requires a closure approximation for estimating higher-order microstructural statistics. A closure approximation is generated based on exact area tensor relations for ellipsoidal shapes, and is shown to provide highly accurate evolutions of the area tensor. Area tensor histories are calculated in homogeneous elongational and shearing flows, as well as in temporally and spatially varying flows. The results are shown to be consistent with well-known mixing principles.</description><subject>Approximation theory</subject><subject>area tensor</subject><subject>closure approximation</subject><subject>Cross-disciplinary physics: materials science; rheology</subject><subject>Exact sciences and technology</subject><subject>Fluid dynamics</subject><subject>Fundamental areas of phenomenology (including applications)</subject><subject>Heterogeneous liquids: suspensions, dispersions, emulsions, pastes, slurries, foams, block copolymers, etc</subject><subject>Hydrodynamic stability</subject><subject>interface tensor</subject><subject>Material form</subject><subject>Microstructure</subject><subject>microstructured fluids</subject><subject>Mixing</subject><subject>Morphological instability; phase changes</subject><subject>Morphology</subject><subject>Physics</subject><subject>polymer blend</subject><subject>Polymer blends</subject><subject>Rheology</subject><subject>Surface tension</subject><subject>Viscosity of liquids</subject><issn>0301-9322</issn><issn>1879-3533</issn><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>1999</creationdate><recordtype>article</recordtype><recordid>eNqFkE9LxDAQxYMouK5-BKEHQT1Uk6ZpmpMsi_9gwYN6DtlkIpG22U1a0W9vahc9OpeBmd-bxzyETgm-IphU18-YYpILWhQXor7EGBOasz00IzUXOWWU7qPZL3KIjmJ8TxDjJZ2h1SKAynroog8xsz5krTfQuO4ta50OPvZh0P0QIDNDGKeNal2nQta47eBMPrXEfqblMTqwqolwsutz9Hp3-7J8yFdP94_LxSrXJeN9LpQptQBTcFpSbgytLFvXhhJLrNC2WIu6JsraqgBjBGBlUjFD64oqKLCmc3Q-3d0Evx0g9rJ1UUPTqA78ECUvK0qIIDyRbCLHV2IAKzfBtSp8SYLlGJ78CU-OyUhRy5_wJEu6s52Dilo1NqhOu_gn5phjIRJ2M2GQvv1wEGTUDjoNxgXQvTTe_WP0DRzahTM</recordid><startdate>19990201</startdate><enddate>19990201</enddate><creator>Wetzel, E.D.</creator><creator>Tucker, C.L.</creator><general>Elsevier Ltd</general><general>Elsevier</general><scope>IQODW</scope><scope>AAYXX</scope><scope>CITATION</scope><scope>7TC</scope></search><sort><creationdate>19990201</creationdate><title>Area tensors for modeling microstructure during laminar liquid-liquid mixing</title><author>Wetzel, E.D. ; Tucker, C.L.</author></sort><facets><frbrtype>5</frbrtype><frbrgroupid>cdi_FETCH-LOGICAL-c457t-9ad4c9ed273437dd36f5b8d31f1f9cf2b9881aff62edd9e0adddd5d3863ae20c3</frbrgroupid><rsrctype>articles</rsrctype><prefilter>articles</prefilter><language>eng</language><creationdate>1999</creationdate><topic>Approximation theory</topic><topic>area tensor</topic><topic>closure approximation</topic><topic>Cross-disciplinary physics: materials science; rheology</topic><topic>Exact sciences and technology</topic><topic>Fluid dynamics</topic><topic>Fundamental areas of phenomenology (including applications)</topic><topic>Heterogeneous liquids: suspensions, dispersions, emulsions, pastes, slurries, foams, block copolymers, etc</topic><topic>Hydrodynamic stability</topic><topic>interface tensor</topic><topic>Material form</topic><topic>Microstructure</topic><topic>microstructured fluids</topic><topic>Mixing</topic><topic>Morphological instability; phase changes</topic><topic>Morphology</topic><topic>Physics</topic><topic>polymer blend</topic><topic>Polymer blends</topic><topic>Rheology</topic><topic>Surface tension</topic><topic>Viscosity of liquids</topic><toplevel>peer_reviewed</toplevel><toplevel>online_resources</toplevel><creatorcontrib>Wetzel, E.D.</creatorcontrib><creatorcontrib>Tucker, C.L.</creatorcontrib><collection>Pascal-Francis</collection><collection>CrossRef</collection><collection>Mechanical Engineering Abstracts</collection><jtitle>International journal of multiphase flow</jtitle></facets><delivery><delcategory>Remote Search Resource</delcategory><fulltext>fulltext</fulltext></delivery><addata><au>Wetzel, E.D.</au><au>Tucker, C.L.</au><format>journal</format><genre>article</genre><ristype>JOUR</ristype><atitle>Area tensors for modeling microstructure during laminar liquid-liquid mixing</atitle><jtitle>International journal of multiphase flow</jtitle><date>1999-02-01</date><risdate>1999</risdate><volume>25</volume><issue>1</issue><spage>35</spage><epage>61</epage><pages>35-61</pages><issn>0301-9322</issn><eissn>1879-3533</eissn><coden>IJMFBP</coden><abstract>Fluid-fluid mixtures often possess a fine structure, or morphology, whose length scale is much smaller than the length scale over which the flow field and morphology vary. 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area tensor, which describes the local morphology of such mixtures through volume-averaged size, shape, and orientation characteristics. The area tensor is equivalent to the interface tensor of the rheological model, and is closely related to the general microstructural tensors. The evolution equation for the area tensor during laminar mixing is derived for the case of equal component viscosities and negligible surface tension. Solution of this evolution equation requires a closure approximation for estimating higher-order microstructural statistics. A closure approximation is generated based on exact area tensor relations for ellipsoidal shapes, and is shown to provide highly accurate evolutions of the area tensor. Area tensor histories are calculated in homogeneous elongational and shearing flows, as well as in temporally and spatially varying flows. The results are shown to be consistent with well-known mixing principles.</abstract><cop>Oxford</cop><pub>Elsevier Ltd</pub><doi>10.1016/S0301-9322(98)00013-5</doi><tpages>27</tpages></addata></record> |
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| identifier | ISSN: 0301-9322 |
| ispartof | International journal of multiphase flow, 1999-02, Vol.25 (1), p.35-61 |
| issn | 0301-9322 1879-3533 |
| language | eng |
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| source | ScienceDirect Freedom Collection |
| subjects | Approximation theory area tensor closure approximation Cross-disciplinary physics: materials science rheology Exact sciences and technology Fluid dynamics Fundamental areas of phenomenology (including applications) Heterogeneous liquids: suspensions, dispersions, emulsions, pastes, slurries, foams, block copolymers, etc Hydrodynamic stability interface tensor Material form Microstructure microstructured fluids Mixing Morphological instability phase changes Morphology Physics polymer blend Polymer blends Rheology Surface tension Viscosity of liquids |
| title | Area tensors for modeling microstructure during laminar liquid-liquid mixing |
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