[EN] The superconvergent patch recovery (SPR) technique is widely used in the evaluation of a recovered stress field sigma* from the finite element Solution sigma(fe). Several modifications of the original SPR technique have been proposed. A new improvement of the SPR technique, called SPR-C technique (Constrained SPR), is presented in this paper. This new technique proposes the use of the appropriate constraint equations in order to obtain stress interpolation polynomials in the patch sigma(p)* that locally satisfy the equations that should be satisfied by the exact Solution. As a result the evaluated expressions for sigma(p)* will satisfy the internal equilibrium and compatibility equations in the whole patch and the boundary equilibrium ...
An important part in the development of numerical strategies for the solution of physical problems c...
peer reviewedEP/G042705/1 Increased Reliability for Industrially Relevant Automatic Crack Growth Sim...
In this paper, a three-dimensional Superconvergent Patch Recovery (SPR) method is developed for data...
In this paper, we study an approach for recovery of an improved stress resultant field for plate ben...
Abstract: In this work it is presented the application of the smoothed stress field improved techniq...
In the last years, much attention has been focused on recovery procedures aimed at improving the acc...
In this paper we investigate an approach for a posteriori error estimation based on recovery of an i...
Abstract. The recovery type error estimators introduced by Zienkiewicz and Zhu use a recovered stres...
In this paper a study is performed on application of two recovery methods, i.e. Superconvergent Patc...
The superconvergent patch recovery (SPR) with bilinear interpolation functions usually gives good va...
The Zienkiewicz–Zhu (ZZ) super-convergent patch recovery technique based on a node neighborhood patc...
A new stress recovery procedure that provides accurate estimations of the discretization error for l...
The present work deals with an a posteriori error estimator for linear finite element analysis, base...
Error estimation is a key tool in modern finite element technology in order to verify and validate t...
Finite element analyses can be rather complicated because numerous industrial problems are geometric...
An important part in the development of numerical strategies for the solution of physical problems c...
peer reviewedEP/G042705/1 Increased Reliability for Industrially Relevant Automatic Crack Growth Sim...
In this paper, a three-dimensional Superconvergent Patch Recovery (SPR) method is developed for data...
In this paper, we study an approach for recovery of an improved stress resultant field for plate ben...
Abstract: In this work it is presented the application of the smoothed stress field improved techniq...
In the last years, much attention has been focused on recovery procedures aimed at improving the acc...
In this paper we investigate an approach for a posteriori error estimation based on recovery of an i...
Abstract. The recovery type error estimators introduced by Zienkiewicz and Zhu use a recovered stres...
In this paper a study is performed on application of two recovery methods, i.e. Superconvergent Patc...
The superconvergent patch recovery (SPR) with bilinear interpolation functions usually gives good va...
The Zienkiewicz–Zhu (ZZ) super-convergent patch recovery technique based on a node neighborhood patc...
A new stress recovery procedure that provides accurate estimations of the discretization error for l...
The present work deals with an a posteriori error estimator for linear finite element analysis, base...
Error estimation is a key tool in modern finite element technology in order to verify and validate t...
Finite element analyses can be rather complicated because numerous industrial problems are geometric...
An important part in the development of numerical strategies for the solution of physical problems c...
peer reviewedEP/G042705/1 Increased Reliability for Industrially Relevant Automatic Crack Growth Sim...
In this paper, a three-dimensional Superconvergent Patch Recovery (SPR) method is developed for data...