TY - JOUR
T1 - On invariant integrals in the Marguerre-von Kármán shallow shell
AU - Li, Shaofan
AU - Shyy, Wei
PY - 1997/8
Y1 - 1997/8
N2 - By employing the second-order Noether's theorem, several new invariant integrals have been derived for the non-linear shallow shell - the Marguerre-von Kármán shell. The dynamic effect is considered in the derivations. These invariant integrals are path-independent over the projection image of the middle surface of the shell in a Cartesian plane, in which the projection area of the middle surface of the shallow shell is maximum. The proposed invariant integrals can be used to evaluate the asymptotic field around a defect embedded in the shell. Unlike most other studies, the Lagrangian density of the invariant variational principle used here belongs to a mixed type variational principle.
AB - By employing the second-order Noether's theorem, several new invariant integrals have been derived for the non-linear shallow shell - the Marguerre-von Kármán shell. The dynamic effect is considered in the derivations. These invariant integrals are path-independent over the projection image of the middle surface of the shell in a Cartesian plane, in which the projection area of the middle surface of the shallow shell is maximum. The proposed invariant integrals can be used to evaluate the asymptotic field around a defect embedded in the shell. Unlike most other studies, the Lagrangian density of the invariant variational principle used here belongs to a mixed type variational principle.
UR - https://www.webofscience.com/wos/woscc/full-record/WOS:A1997XK35400001
UR - https://openalex.org/W2063163490
UR - https://www.scopus.com/pages/publications/0031209407
U2 - 10.1016/s0020-7683(96)00200-4
DO - 10.1016/s0020-7683(96)00200-4
M3 - Journal Article
SN - 0020-7683
VL - 34
SP - 2927
EP - 2944
JO - International Journal of Solids and Structures
JF - International Journal of Solids and Structures
IS - 23
ER -