Ontology type: schema:ScholarlyArticle
2021-09-25
AUTHORS ABSTRACTA variation model of the gradient anisotropic elasticity theory is constructed. Its distinctive feature is the fact that the density of potential energy, along with symmetric fourth- and sixth-rank stiffness tensors, also contains a nonsymmetric fifth-rank stiffness tensor. Accordingly, the stresses in it also depend on the curvatures and the couple stresses depend on distortions. The Euler equations are three fourth-order equilibrium equations. The spectrum of boundary-value problems is determined by six pairs of alternative boundary conditions at each nonsingular surface point. At each special point of the surface (belonging to surface edges), in the general case, additional conditions arise for continuity of the displacement vector and the meniscus force vector when crossing the surface through the edge. In order to reduce the number of the physical parameters requiring experimental determination, particular types of the fifth- and sixth-rank stiffness tensors are postulated. Along with the classical tensor of anisotropic moduli, it is proposed to introduce a first-rank stiffness tensor (a vector with a length dimension), with the help of which the fifth-rank tensor is constructed from the classical fourthrank tensor by means of tensor multiplication. The sixth-rank tensor is constructed as the tensor product of the classical fourth-rank tensor and two first-rank tensors. More... »
PAGES427-438
http://scigraph.springernature.com/pub.10.1007/s11029-021-09966-x
DOIhttp://dx.doi.org/10.1007/s11029-021-09966-x
DIMENSIONShttps://app.dimensions.ai/details/publication/pub.1141365949
JSON-LD is the canonical representation for SciGraph data.
TIP: You can open this SciGraph record using an external JSON-LD service: JSON-LD Playground Google SDTT
[
{
"@context": "https://springernature.github.io/scigraph/jsonld/sgcontext.json",
"about": [
{
"id": "http://purl.org/au-research/vocabulary/anzsrc-for/2008/01",
"inDefinedTermSet": "http://purl.org/au-research/vocabulary/anzsrc-for/2008/",
"name": "Mathematical Sciences",
"type": "DefinedTerm"
},
{
"id": "http://purl.org/au-research/vocabulary/anzsrc-for/2008/0101",
"inDefinedTermSet": "http://purl.org/au-research/vocabulary/anzsrc-for/2008/",
"name": "Pure Mathematics",
"type": "DefinedTerm"
}
],
"author": [
{
"affiliation": {
"alternateName": "Institute of Applied Mechanics of the Russian Academy of Sciences, Moscow, Russia",
"id": "http://www.grid.ac/institutes/grid.465485.e",
"name": [
"Institute of Applied Mechanics of the Russian Academy of Sciences, Moscow, Russia"
],
"type": "Organization"
},
"familyName": "Belov",
"givenName": "P. A.",
"id": "sg:person.013254442355.92",
"sameAs": [
"https://app.dimensions.ai/discover/publication?and_facet_researcher=ur.013254442355.92"
],
"type": "Person"
},
{
"affiliation": {
"alternateName": "Institute of Applied Mechanics of the Russian Academy of Sciences, Moscow, Russia",
"id": "http://www.grid.ac/institutes/grid.465485.e",
"name": [
"Institute of Applied Mechanics of the Russian Academy of Sciences, Moscow, Russia"
],
"type": "Organization"
},
"familyName": "Lurie",
"givenName": "S. A.",
"id": "sg:person.07651324373.25",
"sameAs": [
"https://app.dimensions.ai/discover/publication?and_facet_researcher=ur.07651324373.25"
],
"type": "Person"
}
],
"citation": [
{
"id": "sg:pub.10.1007/s00707-016-1689-z",
"sameAs": [
"https://app.dimensions.ai/details/publication/pub.1020821119",
"https://doi.org/10.1007/s00707-016-1689-z"
],
"type": "CreativeWork"
},
{
"id": "sg:pub.10.1007/s00033-019-1181-4",
"sameAs": [
"https://app.dimensions.ai/details/publication/pub.1120369133",
"https://doi.org/10.1007/s00033-019-1181-4"
],
"type": "CreativeWork"
},
{
"id": "sg:pub.10.1007/978-3-030-43830-2_1",
"sameAs": [
"https://app.dimensions.ai/details/publication/pub.1128882494",
"https://doi.org/10.1007/978-3-030-43830-2_1"
],
"type": "CreativeWork"
},
{
"id": "sg:pub.10.1007/bf00253945",
"sameAs": [
"https://app.dimensions.ai/details/publication/pub.1031046763",
"https://doi.org/10.1007/bf00253945"
],
"type": "CreativeWork"
},
{
"id": "sg:pub.10.1134/s1995080220100042",
"sameAs": [
"https://app.dimensions.ai/details/publication/pub.1132872640",
"https://doi.org/10.1134/s1995080220100042"
],
"type": "CreativeWork"
},
{
"id": "sg:pub.10.1007/s001610050069",
"sameAs": [
"https://app.dimensions.ai/details/publication/pub.1001564382",
"https://doi.org/10.1007/s001610050069"
],
"type": "CreativeWork"
},
{
"id": "sg:pub.10.1007/bf00248490",
"sameAs": [
"https://app.dimensions.ai/details/publication/pub.1035717737",
"https://doi.org/10.1007/bf00248490"
],
"type": "CreativeWork"
},
{
"id": "sg:pub.10.1007/s00707-019-02552-2",
"sameAs": [
"https://app.dimensions.ai/details/publication/pub.1123011411",
"https://doi.org/10.1007/s00707-019-02552-2"
],
"type": "CreativeWork"
},
{
"id": "sg:pub.10.1007/s00161-019-00806-x",
"sameAs": [
"https://app.dimensions.ai/details/publication/pub.1117490750",
"https://doi.org/10.1007/s00161-019-00806-x"
],
"type": "CreativeWork"
}
],
"datePublished": "2021-09-25",
"datePublishedReg": "2021-09-25",
"description": "A variation model of the gradient anisotropic elasticity theory is constructed. Its distinctive feature is the fact that the density of potential energy, along with symmetric fourth- and sixth-rank stiffness tensors, also contains a nonsymmetric fifth-rank stiffness tensor. Accordingly, the stresses in it also depend on the curvatures and the couple stresses depend on distortions. The Euler equations are three fourth-order equilibrium equations. The spectrum of boundary-value problems is determined by six pairs of alternative boundary conditions at each nonsingular surface point. At each special point of the surface (belonging to surface edges), in the general case, additional conditions arise for continuity of the displacement vector and the meniscus force vector when crossing the surface through the edge. In order to reduce the number of the physical parameters requiring experimental determination, particular types of the fifth- and sixth-rank stiffness tensors are postulated. Along with the classical tensor of anisotropic moduli, it is proposed to introduce a first-rank stiffness tensor (a vector with a length dimension), with the help of which the fifth-rank tensor is constructed from the classical fourthrank tensor by means of tensor multiplication. The sixth-rank tensor is constructed as the tensor product of the classical fourth-rank tensor and two first-rank tensors.",
"genre": "article",
"id": "sg:pub.10.1007/s11029-021-09966-x",
"inLanguage": "en",
"isAccessibleForFree": false,
"isPartOf": [
{
"id": "sg:journal.1136433",
"issn": [
"0191-5665",
"1573-8922"
],
"name": "Mechanics of Composite Materials",
"publisher": "Springer Nature",
"type": "Periodical"
},
{
"issueNumber": "4",
"type": "PublicationIssue"
},
{
"type": "PublicationVolume",
"volumeNumber": "57"
}
],
"keywords": [
"stiffness tensor",
"fourth-order equilibrium equations",
"boundary value problem",
"couple stress",
"alternative boundary conditions",
"anisotropic elasticity theory",
"first-rank tensor",
"elasticity theory",
"anisotropic elasticity",
"anisotropic modulus",
"Euler equations",
"sixth-rank tensors",
"equilibrium equations",
"boundary conditions",
"classical tensors",
"tensor product",
"displacement vector",
"tensor multiplication",
"force vector",
"fourth-rank tensor",
"general case",
"additional conditions",
"physical parameters",
"special points",
"tensor",
"surface points",
"experimental determination",
"potential energy",
"equations",
"variation model",
"surface",
"modulus",
"theory",
"stress",
"elasticity",
"conditions",
"energy",
"anisotropy",
"vector",
"density",
"distortion",
"particular type",
"parameters",
"curvature",
"point",
"problem",
"edge",
"multiplication",
"order",
"distinctive features",
"model",
"products",
"help",
"determination",
"continuity",
"means",
"spectra",
"number",
"concept",
"pairs",
"features",
"types",
"cases",
"fact",
"development"
],
"name": "Development of the \u201cSeparated Anisotropy\u201d Concept in the Theory of Gradient Anisotropic Elasticity",
"pagination": "427-438",
"productId": [
{
"name": "dimensions_id",
"type": "PropertyValue",
"value": [
"pub.1141365949"
]
},
{
"name": "doi",
"type": "PropertyValue",
"value": [
"10.1007/s11029-021-09966-x"
]
}
],
"sameAs": [
"https://doi.org/10.1007/s11029-021-09966-x",
"https://app.dimensions.ai/details/publication/pub.1141365949"
],
"sdDataset": "articles",
"sdDatePublished": "2022-05-20T07:39",
"sdLicense": "https://scigraph.springernature.com/explorer/license/",
"sdPublisher": {
"name": "Springer Nature - SN SciGraph project",
"type": "Organization"
},
"sdSource": "s3://com-springernature-scigraph/baseset/20220519/entities/gbq_results/article/article_903.jsonl",
"type": "ScholarlyArticle",
"url": "https://doi.org/10.1007/s11029-021-09966-x"
}
]Download the RDF metadata as: json-ld nt turtle xml License info
JSON-LD is a popular format for linked data which is fully compatible with JSON.
curl -H 'Accept: application/ld+json' 'https://scigraph.springernature.com/pub.10.1007/s11029-021-09966-x'
N-Triples is a line-based linked data format ideal for batch operations.
curl -H 'Accept: application/n-triples' 'https://scigraph.springernature.com/pub.10.1007/s11029-021-09966-x'
Turtle is a human-readable linked data format.
curl -H 'Accept: text/turtle' 'https://scigraph.springernature.com/pub.10.1007/s11029-021-09966-x'
RDF/XML is a standard XML format for linked data.
curl -H 'Accept: application/rdf+xml' 'https://scigraph.springernature.com/pub.10.1007/s11029-021-09966-x'
This table displays all metadata directly associated to this object as RDF triples.
166 TRIPLES
22 PREDICATES
99 URIs
82 LITERALS
6 BLANK NODES
| Subject | Predicate | Object | |
|---|---|---|---|
| 1 | sg:pub.10.1007/s11029-021-09966-x | schema:about | anzsrc-for:01 |
| 2 | ″ | ″ | anzsrc-for:0101 |
| 3 | ″ | schema:author | Nda85a276b7584eaab45101a2822e52a5 |
| 4 | ″ | schema:citation | sg:pub.10.1007/978-3-030-43830-2_1 |
| 5 | ″ | ″ | sg:pub.10.1007/bf00248490 |
| 6 | ″ | ″ | sg:pub.10.1007/bf00253945 |
| 7 | ″ | ″ | sg:pub.10.1007/s00033-019-1181-4 |
| 8 | ″ | ″ | sg:pub.10.1007/s00161-019-00806-x |
| 9 | ″ | ″ | sg:pub.10.1007/s001610050069 |
| 10 | ″ | ″ | sg:pub.10.1007/s00707-016-1689-z |
| 11 | ″ | ″ | sg:pub.10.1007/s00707-019-02552-2 |
| 12 | ″ | ″ | sg:pub.10.1134/s1995080220100042 |
| 13 | ″ | schema:datePublished | 2021-09-25 |
| 14 | ″ | schema:datePublishedReg | 2021-09-25 |
| 15 | ″ | schema:description | A variation model of the gradient anisotropic elasticity theory is constructed. Its distinctive feature is the fact that the density of potential energy, along with symmetric fourth- and sixth-rank stiffness tensors, also contains a nonsymmetric fifth-rank stiffness tensor. Accordingly, the stresses in it also depend on the curvatures and the couple stresses depend on distortions. The Euler equations are three fourth-order equilibrium equations. The spectrum of boundary-value problems is determined by six pairs of alternative boundary conditions at each nonsingular surface point. At each special point of the surface (belonging to surface edges), in the general case, additional conditions arise for continuity of the displacement vector and the meniscus force vector when crossing the surface through the edge. In order to reduce the number of the physical parameters requiring experimental determination, particular types of the fifth- and sixth-rank stiffness tensors are postulated. Along with the classical tensor of anisotropic moduli, it is proposed to introduce a first-rank stiffness tensor (a vector with a length dimension), with the help of which the fifth-rank tensor is constructed from the classical fourthrank tensor by means of tensor multiplication. The sixth-rank tensor is constructed as the tensor product of the classical fourth-rank tensor and two first-rank tensors. |
| 16 | ″ | schema:genre | article |
| 17 | ″ | schema:inLanguage | en |
| 18 | ″ | schema:isAccessibleForFree | false |
| 19 | ″ | schema:isPartOf | N31eae0d112dd4ccf8420cebb6156d0e5 |
| 20 | ″ | ″ | Nc44b5ef64d7b4feeb143c5b4cd390b9f |
| 21 | ″ | ″ | sg:journal.1136433 |
| 22 | ″ | schema:keywords | Euler equations |
| 23 | ″ | ″ | additional conditions |
| 24 | ″ | ″ | alternative boundary conditions |
| 25 | ″ | ″ | anisotropic elasticity |
| 26 | ″ | ″ | anisotropic elasticity theory |
| 27 | ″ | ″ | anisotropic modulus |
| 28 | ″ | ″ | anisotropy |
| 29 | ″ | ″ | boundary conditions |
| 30 | ″ | ″ | boundary value problem |
| 31 | ″ | ″ | cases |
| 32 | ″ | ″ | classical tensors |
| 33 | ″ | ″ | concept |
| 34 | ″ | ″ | conditions |
| 35 | ″ | ″ | continuity |
| 36 | ″ | ″ | couple stress |
| 37 | ″ | ″ | curvature |
| 38 | ″ | ″ | density |
| 39 | ″ | ″ | determination |
| 40 | ″ | ″ | development |
| 41 | ″ | ″ | displacement vector |
| 42 | ″ | ″ | distinctive features |
| 43 | ″ | ″ | distortion |
| 44 | ″ | ″ | edge |
| 45 | ″ | ″ | elasticity |
| 46 | ″ | ″ | elasticity theory |
| 47 | ″ | ″ | energy |
| 48 | ″ | ″ | equations |
| 49 | ″ | ″ | equilibrium equations |
| 50 | ″ | ″ | experimental determination |
| 51 | ″ | ″ | fact |
| 52 | ″ | ″ | features |
| 53 | ″ | ″ | first-rank tensor |
| 54 | ″ | ″ | force vector |
| 55 | ″ | ″ | fourth-order equilibrium equations |
| 56 | ″ | ″ | fourth-rank tensor |
| 57 | ″ | ″ | general case |
| 58 | ″ | ″ | help |
| 59 | ″ | ″ | means |
| 60 | ″ | ″ | model |
| 61 | ″ | ″ | modulus |
| 62 | ″ | ″ | multiplication |
| 63 | ″ | ″ | number |
| 64 | ″ | ″ | order |
| 65 | ″ | ″ | pairs |
| 66 | ″ | ″ | parameters |
| 67 | ″ | ″ | particular type |
| 68 | ″ | ″ | physical parameters |
| 69 | ″ | ″ | point |
| 70 | ″ | ″ | potential energy |
| 71 | ″ | ″ | problem |
| 72 | ″ | ″ | products |
| 73 | ″ | ″ | sixth-rank tensors |
| 74 | ″ | ″ | special points |
| 75 | ″ | ″ | spectra |
| 76 | ″ | ″ | stiffness tensor |
| 77 | ″ | ″ | stress |
| 78 | ″ | ″ | surface |
| 79 | ″ | ″ | surface points |
| 80 | ″ | ″ | tensor |
| 81 | ″ | ″ | tensor multiplication |
| 82 | ″ | ″ | tensor product |
| 83 | ″ | ″ | theory |
| 84 | ″ | ″ | types |
| 85 | ″ | ″ | variation model |
| 86 | ″ | ″ | vector |
| 87 | ″ | schema:name | Development of the “Separated Anisotropy” Concept in the Theory of Gradient Anisotropic Elasticity |
| 88 | ″ | schema:pagination | 427-438 |
| 89 | ″ | schema:productId | N88753b9a919140478bfbfa665d76eaf2 |
| 90 | ″ | ″ | N8bf9d711e1d44e1598ac52fc56b1d5b2 |
| 91 | ″ | schema:sameAs | https://app.dimensions.ai/details/publication/pub.1141365949 |
| 92 | ″ | ″ | https://doi.org/10.1007/s11029-021-09966-x |
| 93 | ″ | schema:sdDatePublished | 2022-05-20T07:39 |
| 94 | ″ | schema:sdLicense | https://scigraph.springernature.com/explorer/license/ |
| 95 | ″ | schema:sdPublisher | N82b35c034902437b89a8beec63838c2c |
| 96 | ″ | schema:url | https://doi.org/10.1007/s11029-021-09966-x |
| 97 | ″ | sgo:license | sg:explorer/license/ |
| 98 | ″ | sgo:sdDataset | articles |
| 99 | ″ | rdf:type | schema:ScholarlyArticle |
| 100 | N31eae0d112dd4ccf8420cebb6156d0e5 | schema:issueNumber | 4 |
| 101 | ″ | rdf:type | schema:PublicationIssue |
| 102 | N82b35c034902437b89a8beec63838c2c | schema:name | Springer Nature - SN SciGraph project |
| 103 | ″ | rdf:type | schema:Organization |
| 104 | N88753b9a919140478bfbfa665d76eaf2 | schema:name | doi |
| 105 | ″ | schema:value | 10.1007/s11029-021-09966-x |
| 106 | ″ | rdf:type | schema:PropertyValue |
| 107 | N8bf9d711e1d44e1598ac52fc56b1d5b2 | schema:name | dimensions_id |
| 108 | ″ | schema:value | pub.1141365949 |
| 109 | ″ | rdf:type | schema:PropertyValue |
| 110 | Nc44b5ef64d7b4feeb143c5b4cd390b9f | schema:volumeNumber | 57 |
| 111 | ″ | rdf:type | schema:PublicationVolume |
| 112 | Nce40df2ab45b4639983985690c6d3933 | rdf:first | sg:person.07651324373.25 |
| 113 | ″ | rdf:rest | rdf:nil |
| 114 | Nda85a276b7584eaab45101a2822e52a5 | rdf:first | sg:person.013254442355.92 |
| 115 | ″ | rdf:rest | Nce40df2ab45b4639983985690c6d3933 |
| 116 | anzsrc-for:01 | schema:inDefinedTermSet | anzsrc-for: |
| 117 | ″ | schema:name | Mathematical Sciences |
| 118 | ″ | rdf:type | schema:DefinedTerm |
| 119 | anzsrc-for:0101 | schema:inDefinedTermSet | anzsrc-for: |
| 120 | ″ | schema:name | Pure Mathematics |
| 121 | ″ | rdf:type | schema:DefinedTerm |
| 122 | sg:journal.1136433 | schema:issn | 0191-5665 |
| 123 | ″ | ″ | 1573-8922 |
| 124 | ″ | schema:name | Mechanics of Composite Materials |
| 125 | ″ | schema:publisher | Springer Nature |
| 126 | ″ | rdf:type | schema:Periodical |
| 127 | sg:person.013254442355.92 | schema:affiliation | grid-institutes:grid.465485.e |
| 128 | ″ | schema:familyName | Belov |
| 129 | ″ | schema:givenName | P. A. |
| 130 | ″ | schema:sameAs | https://app.dimensions.ai/discover/publication?and_facet_researcher=ur.013254442355.92 |
| 131 | ″ | rdf:type | schema:Person |
| 132 | sg:person.07651324373.25 | schema:affiliation | grid-institutes:grid.465485.e |
| 133 | ″ | schema:familyName | Lurie |
| 134 | ″ | schema:givenName | S. A. |
| 135 | ″ | schema:sameAs | https://app.dimensions.ai/discover/publication?and_facet_researcher=ur.07651324373.25 |
| 136 | ″ | rdf:type | schema:Person |
| 137 | sg:pub.10.1007/978-3-030-43830-2_1 | schema:sameAs | https://app.dimensions.ai/details/publication/pub.1128882494 |
| 138 | ″ | ″ | https://doi.org/10.1007/978-3-030-43830-2_1 |
| 139 | ″ | rdf:type | schema:CreativeWork |
| 140 | sg:pub.10.1007/bf00248490 | schema:sameAs | https://app.dimensions.ai/details/publication/pub.1035717737 |
| 141 | ″ | ″ | https://doi.org/10.1007/bf00248490 |
| 142 | ″ | rdf:type | schema:CreativeWork |
| 143 | sg:pub.10.1007/bf00253945 | schema:sameAs | https://app.dimensions.ai/details/publication/pub.1031046763 |
| 144 | ″ | ″ | https://doi.org/10.1007/bf00253945 |
| 145 | ″ | rdf:type | schema:CreativeWork |
| 146 | sg:pub.10.1007/s00033-019-1181-4 | schema:sameAs | https://app.dimensions.ai/details/publication/pub.1120369133 |
| 147 | ″ | ″ | https://doi.org/10.1007/s00033-019-1181-4 |
| 148 | ″ | rdf:type | schema:CreativeWork |
| 149 | sg:pub.10.1007/s00161-019-00806-x | schema:sameAs | https://app.dimensions.ai/details/publication/pub.1117490750 |
| 150 | ″ | ″ | https://doi.org/10.1007/s00161-019-00806-x |
| 151 | ″ | rdf:type | schema:CreativeWork |
| 152 | sg:pub.10.1007/s001610050069 | schema:sameAs | https://app.dimensions.ai/details/publication/pub.1001564382 |
| 153 | ″ | ″ | https://doi.org/10.1007/s001610050069 |
| 154 | ″ | rdf:type | schema:CreativeWork |
| 155 | sg:pub.10.1007/s00707-016-1689-z | schema:sameAs | https://app.dimensions.ai/details/publication/pub.1020821119 |
| 156 | ″ | ″ | https://doi.org/10.1007/s00707-016-1689-z |
| 157 | ″ | rdf:type | schema:CreativeWork |
| 158 | sg:pub.10.1007/s00707-019-02552-2 | schema:sameAs | https://app.dimensions.ai/details/publication/pub.1123011411 |
| 159 | ″ | ″ | https://doi.org/10.1007/s00707-019-02552-2 |
| 160 | ″ | rdf:type | schema:CreativeWork |
| 161 | sg:pub.10.1134/s1995080220100042 | schema:sameAs | https://app.dimensions.ai/details/publication/pub.1132872640 |
| 162 | ″ | ″ | https://doi.org/10.1134/s1995080220100042 |
| 163 | ″ | rdf:type | schema:CreativeWork |
| 164 | grid-institutes:grid.465485.e | schema:alternateName | Institute of Applied Mechanics of the Russian Academy of Sciences, Moscow, Russia |
| 165 | ″ | schema:name | Institute of Applied Mechanics of the Russian Academy of Sciences, Moscow, Russia |
| 166 | ″ | rdf:type | schema:Organization |