Data Completion, Model Correction and Enrichment Based on Sparse Identification and Data Assimilation
Article dans une revue avec comité de lecture
Abstract
Many models assumed to be able to predict the response of structural systems fail to efficiently accomplish that purpose because of two main reasons. First, some structures in operation undergo localized damage that degrades their mechanical performances. To reflect this local loss of performance, the stiffness matrix associated with the structure should be locally corrected. Second, the nominal model is sometimes too coarse grained for reflecting all structural details, and consequently, the predictions are expected to deviate from the measurements. In that case, there is no small region of the model that needs to be repaired, but the entire domain needs to be repaired; therefore, the entire structure-stiffness matrix should be corrected. In the present work, we propose a methodology for locally correcting or globally enriching the models from collected data, which is, upon its turn, completed beyond the sensor’s location. The proposed techniques consist in the first case of an L1-minimization procedure that, with the support of data, aims at the same time period to detect the damaged zone in the structure and to predict the correct solution. For the global enrichment, instead, the methodology consists of an L2-minimization procedure with the support of measurements. The results obtained showed, for the local problem, a correction up to 90% with respect to the initially incorrectly predicted displacement of the structure, and for the global one, a correction up to 60% was observed (this results concern the problems considered in the present study, but they depend on different factors, such as the number of data used, the geometry or the intensity of the damage). The benefits and potential of such techniques are illustrated on four different problems, showing the large generality and adaptability of the methodology.
Files in this item
- Name:
- PIMM_AS_2022_DI-LORENZO.pdf
- Size:
- 6.429Mb
- Format:
- Description:
- Data Completion, Model Correction ...
- Embargoed until:
- 2023-03-25
Related items
Showing items related by title, author, creator and subject.
-
Article dans une revue avec comité de lectureGHNATIOS, Chady; DI LORENZO, Daniele; CHAMPANEY, Victor; CUETO, Elias; CHINESTA SORIA, Francisco (American Institute of Mathematical Sciences (AIMS), 2024-07)Trajectory optimization is a complex process that includes an infinite number of possibilities and combinations. This work focuses on a particular aspect of the trajectory optimization, related to the optimization of a ...
-
Article dans une revue avec comité de lectureDI LORENZO, Daniele; RODRIGUEZ, Sebastian; CHAMPANEY, Laurent; GERMOSO, Claudia; BERINGHIER, Marianne; CHINESTA SORIA, Francisco (Elsevier BV, 2024-06)Structural Health Monitoring (SHM) techniques are key to monitor the health state of engineering structures, where damage type, location and severity are to be estimated by applying sophisticated techniques to signals ...
-
Article dans une revue avec comité de lectureRUNACHER, Antoine; KAZEMZADEH-PARSI, Mohammad-Javad; DI LORENZO, Daniele; CHAMPANEY, Victor; HASCOET, Nicolas; AMMAR, Amine; CHINESTA SORIA, Francisco (2023)Many composite manufacturing processes employ the consolidation of pre-impregnated preforms. However, in order to obtain adequate performance of the formed part, intimate contact and molecular diffusion across the different ...
-
Article dans une revue avec comité de lectureREILLE, Agathe; CHAMPANEY, Victor; DAIM, Fatima; TOURBIER, Yves; HASCOET, Nicolas; GONZALEZ, David; CUETO, Elias; DUVAL, Jean Louis; CHINESTA SORIA, Francisco (EDP Sciences, 2021)Solving mechanical problems in large structures with rich localized behaviors remains a challenging issue despite the enormous advances in numerical procedures and computational performance. In particular, these localized ...
-
Article dans une revue avec comité de lectureSANCARLOS, Abel; CHAMPANEY, Victor; CUETO, Elias; CHINESTA SORIA, Francisco (Springer Open, 2023-03)Regressions created from experimental or simulated data enable the construction of metamodels, widely used in a variety of engineering applications. Many engineering problems involve multi-parametric physics whose corresponding ...