ON THE CONVERGENCE OF A TRIANGULAR MIXED FINITE ELEMENT METHOD FOR REISSNER–MINDLIN PLATES
1996 ◽
Vol 06
(03)
◽
pp. 339-352
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Keyword(s):
We analyze the convergence of a mixed finite element method introduced by Zienkiewicz, Taylor, Papadopoulos and Oñate for the Reissner–Mindlin plate model. In order to do this, we compare it with a method which is known to be convergent with optimal order uniformly in the plate thickness. We show that the difference between the solutions of both methods is of higher order than the error. In particular the method does not present locking and is optimal order convergent. We also present several numerical experiments which confirm the similar behavior of both methods.
2001 ◽
Vol 190
(51-52)
◽
pp. 6895-6908
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2022 ◽
Vol 402
◽
pp. 113783
1998 ◽
Vol 163
(1-4)
◽
pp. 71-85
◽
2012 ◽
pp. 247-255
◽
2012 ◽
Vol 29
(1)
◽
pp. 40-63
◽
2021 ◽
Vol 393
◽
pp. 113504
Keyword(s):