Large deflection analysis of axisymmetric circular plates with variable thickness by the boundary element method

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Large deflection analysis of axisymmetric circular plates with variable thickness by the boundary element method. / Ye, Jianqiao.
In: Applied Mathematical Modelling, Vol. 15, No. 6, 06.1991, p. 325-328.

Research output: Contribution to Journal/Magazine › Journal article › peer-review

Harvard

Ye, J 1991, 'Large deflection analysis of axisymmetric circular plates with variable thickness by the boundary element method', Applied Mathematical Modelling, vol. 15, no. 6, pp. 325-328. https://doi.org/10.1016/0307-904X(91)90048-T

APA

Ye, J. (1991). Large deflection analysis of axisymmetric circular plates with variable thickness by the boundary element method. Applied Mathematical Modelling, 15(6), 325-328. https://doi.org/10.1016/0307-904X(91)90048-T

Vancouver

Ye J. Large deflection analysis of axisymmetric circular plates with variable thickness by the boundary element method. Applied Mathematical Modelling. 1991 Jun;15(6):325-328. doi: 10.1016/0307-904X(91)90048-T

Author

Ye, Jianqiao. / Large deflection analysis of axisymmetric circular plates with variable thickness by the boundary element method. In: Applied Mathematical Modelling. 1991 ; Vol. 15, No. 6. pp. 325-328.

Bibtex

@article{a89df0f607454d4e8e3672e04d26725d,

title = "Large deflection analysis of axisymmetric circular plates with variable thickness by the boundary element method",

abstract = "An integral equation formulation for the finite deflection analysis of axisymmetric circular plates with variable thickness is presented, based on the Karman equations and by means of the Green identity. A plate analog method is suggested to simplify the solving procedure. A number of numerical examples show that the approach developed in this paper is effective.",

keywords = "boundary element method, plates with variable thickness , equivalent load , finite deflection , spline function , axisymmetric bending",

author = "Jianqiao Ye",

year = "1991",

month = jun,

doi = "10.1016/0307-904X(91)90048-T",

language = "English",

volume = "15",

pages = "325--328",

journal = "Applied Mathematical Modelling",

issn = "0307-904X",

publisher = "Elsevier Inc.",

number = "6",

}

RIS

TY - JOUR

T1 - Large deflection analysis of axisymmetric circular plates with variable thickness by the boundary element method

AU - Ye, Jianqiao

PY - 1991/6

Y1 - 1991/6

N2 - An integral equation formulation for the finite deflection analysis of axisymmetric circular plates with variable thickness is presented, based on the Karman equations and by means of the Green identity. A plate analog method is suggested to simplify the solving procedure. A number of numerical examples show that the approach developed in this paper is effective.

AB - An integral equation formulation for the finite deflection analysis of axisymmetric circular plates with variable thickness is presented, based on the Karman equations and by means of the Green identity. A plate analog method is suggested to simplify the solving procedure. A number of numerical examples show that the approach developed in this paper is effective.

KW - boundary element method

KW - plates with variable thickness

KW - equivalent load

KW - finite deflection

KW - spline function

KW - axisymmetric bending

U2 - 10.1016/0307-904X(91)90048-T

DO - 10.1016/0307-904X(91)90048-T

M3 - Journal article

VL - 15

SP - 325

EP - 328

JO - Applied Mathematical Modelling

JF - Applied Mathematical Modelling

SN - 0307-904X

IS - 6

ER -

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