Publicación: DISPLACEMENT-PSEUDOSTRESS FORMULATION FOR THE LINEAR ELASTICITY SPECTRAL PROBLEM
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2022
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NUMERICAL METHODS FOR PARTIAL DIFFERENTIAL EQUATIONS
Resumen
IN THIS PAPER WE ANALYZE A MIXED DISPLACEMENT-PSEUDOSTRESS FORMULATION FOR THE ELASTICITY EIGENVALUE PROBLEM. WE PROPOSE A FINITE ELEMENT METHOD TO APPROXIMATE THE PSEUDOSTRESS TENSOR WITH RAVIART-THOMAS ELEMENTS AND THE DISPLACEMENT WITH PIECEWISE POLYNOMIALS. WITH THE AID OF THE CLASSIC THEORY FOR COMPACT OPERATORS, WE PROVE THAT OUR METHOD IS CONVERGENT AND DOES NOT INTRODUCE SPURIOUS MODES. ALSO, WE OBTAIN ERROR ESTIMATES FOR THE PROPOSED METHOD. FINALLY, WE REPORT SOME NUMERICAL TESTS SUPPORTING THE THEORETICAL RESULTS.
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PROBLEMAS DE VALORES PROPIOS, MÉTODOS DE GALERKIN DISCONTINUOS, MÉTODOS DE ELEMENTOS FINITOS, FORMULACIÓN MIXTA, ESTIMACIONES DE ERRORES, ECUACIONES DE ELASTICIDAD, APROXIMACIÓN, A-PRIORI
