Residual-free bubbles are derived for the Timoshenko beam problem. Eliminating these bubbles the resulting formulation is form-identical in using the following tricks to the standard variational formulation: (i) one-point reduced integration on the shear energy term; (ii) replace its coefficient 1/epsilon(2) by 1/(epsilon(2) + (h(K)(2)/12)) in each element; (iii) modify consistently the right-hand side. This final formulation is 'legally' obtained in that the Galerkin method enriched with residual-free bubbles is developed using full integration throughout. Furthermore, this method is nodally exact by construction
Franca, L., Russo, A. (1997). Unlocking with residual-free bubbles. COMPUTER METHODS IN APPLIED MECHANICS AND ENGINEERING, 142(3-4), 361-364 [10.1016/S0045-7825(96)01138-3].
Unlocking with residual-free bubbles
RUSSO, ALESSANDRO
1997
Abstract
Residual-free bubbles are derived for the Timoshenko beam problem. Eliminating these bubbles the resulting formulation is form-identical in using the following tricks to the standard variational formulation: (i) one-point reduced integration on the shear energy term; (ii) replace its coefficient 1/epsilon(2) by 1/(epsilon(2) + (h(K)(2)/12)) in each element; (iii) modify consistently the right-hand side. This final formulation is 'legally' obtained in that the Galerkin method enriched with residual-free bubbles is developed using full integration throughout. Furthermore, this method is nodally exact by constructionI documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.