Équations de von Kármán généralisées

Philippe G. Ciarlet; Liliana Gratie

doi:10.1016/s0764-4442(00)01639-6

Équations de von Kármán généralisées

Philippe G. Ciarlet, Liliana Gratie

Research output: Journal Publications and Reviews › RGC 22 - Publication in policy or professional journal

3 Citations (Scopus)

Abstract

In a previous work, the first author has identified three-dimensional boundary conditions "of von Kármán's type" that lead, through a formal asymptotic analysis of the three-dimensional solution, to the classical von Kármán equations, when they are applied to the entire lateral face of a nonlinearly elastic plate. In this Note, we consider the more general situation where only a portion of the lateral face is subjected to boundary conditions of von Kármán's type, while the remaining portion is subjected to boundary conditions of free edge. We then show that the asymptotic analysis of the three-dimensional solution still leads in this case to a two-dimensional boundary value problem that is analogous to the von Kármán equations. In particular, the boundary conditions for the Airy function can still be determined solely from the data. © 2000 Académie des sciences/Éditions scientifiques et médicales Elsevier SAS.

Original language	French
Pages (from-to)	329-335
Journal	Comptes Rendus de l'Academie des Sciences - Series I: Mathematics
Volume	331
Issue number	4
DOIs	https://doi.org/10.1016/s0764-4442(00)01639-6
Publication status	Published - 15 Aug 2000
Externally published	Yes

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title = "{\'E}quations de von K{\'a}rm{\'a}n g{\'e}n{\'e}ralis{\'e}es",

abstract = "In a previous work, the first author has identified three-dimensional boundary conditions {"}of von K{\'a}rm{\'a}n's type{"} that lead, through a formal asymptotic analysis of the three-dimensional solution, to the classical von K{\'a}rm{\'a}n equations, when they are applied to the entire lateral face of a nonlinearly elastic plate. In this Note, we consider the more general situation where only a portion of the lateral face is subjected to boundary conditions of von K{\'a}rm{\'a}n's type, while the remaining portion is subjected to boundary conditions of free edge. We then show that the asymptotic analysis of the three-dimensional solution still leads in this case to a two-dimensional boundary value problem that is analogous to the von K{\'a}rm{\'a}n equations. In particular, the boundary conditions for the Airy function can still be determined solely from the data. {\textcopyright} 2000 Acad{\'e}mie des sciences/{\'E}ditions scientifiques et m{\'e}dicales Elsevier SAS.",

author = "Ciarlet, {Philippe G.} and Liliana Gratie",

year = "2000",

month = aug,

day = "15",

doi = "10.1016/s0764-4442(00)01639-6",

language = "French",

volume = "331",

pages = "329--335",

journal = "Comptes Rendus de l'Academie des Sciences - Series I: Mathematics",

issn = "0249-6291",

publisher = "Academie des sciences",

number = "4",

}

TY - JOUR

T1 - Équations de von Kármán généralisées

AU - Ciarlet, Philippe G.

AU - Gratie, Liliana

PY - 2000/8/15

Y1 - 2000/8/15

N2 - In a previous work, the first author has identified three-dimensional boundary conditions "of von Kármán's type" that lead, through a formal asymptotic analysis of the three-dimensional solution, to the classical von Kármán equations, when they are applied to the entire lateral face of a nonlinearly elastic plate. In this Note, we consider the more general situation where only a portion of the lateral face is subjected to boundary conditions of von Kármán's type, while the remaining portion is subjected to boundary conditions of free edge. We then show that the asymptotic analysis of the three-dimensional solution still leads in this case to a two-dimensional boundary value problem that is analogous to the von Kármán equations. In particular, the boundary conditions for the Airy function can still be determined solely from the data. © 2000 Académie des sciences/Éditions scientifiques et médicales Elsevier SAS.

AB - In a previous work, the first author has identified three-dimensional boundary conditions "of von Kármán's type" that lead, through a formal asymptotic analysis of the three-dimensional solution, to the classical von Kármán equations, when they are applied to the entire lateral face of a nonlinearly elastic plate. In this Note, we consider the more general situation where only a portion of the lateral face is subjected to boundary conditions of von Kármán's type, while the remaining portion is subjected to boundary conditions of free edge. We then show that the asymptotic analysis of the three-dimensional solution still leads in this case to a two-dimensional boundary value problem that is analogous to the von Kármán equations. In particular, the boundary conditions for the Airy function can still be determined solely from the data. © 2000 Académie des sciences/Éditions scientifiques et médicales Elsevier SAS.

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UR - https://www.scopus.com/record/pubmetrics.uri?eid=2-s2.0-0034662570&origin=recordpage

U2 - 10.1016/s0764-4442(00)01639-6

DO - 10.1016/s0764-4442(00)01639-6

M3 - Isn't the information, if a journal is professional or not an attribute of the journal itself and not the article in it? This is to fullfill RGC category.

SN - 0249-6291

VL - 331

SP - 329

EP - 335

JO - Comptes Rendus de l'Academie des Sciences - Series I: Mathematics

JF - Comptes Rendus de l'Academie des Sciences - Series I: Mathematics

IS - 4

ER -

Équations de von Kármán généralisées

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