2016
DOI: 10.1007/s00158-016-1448-8
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Accurate analysis and thickness optimization of tailor rolled blanks based on isogeometric analysis

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Cited by 27 publications
(10 citation statements)
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“…Hughes et al (2005) and Cottrell et al (2009) firstly introduced the concept of IGA by using the spline basis functions [such as non-uniform rational B-splines (NURBSs)] constructing the exact geometric models as interpolation functions in CAE analysis. Up to now, this approach has also gained widespread reception from the scientific community and many applications have been verified, for example, structural optimization (Cho and Ha, 2009;Qian, 2010;Ding et al, 2016;Ding et al, 2018c;Lian et al, 2017;Lian et al, 2016;Hao et al, 2018a;Hao et al, 2019;Hao et al, 2018b), plate and composite structures (Thai et al, 2014;Yu et al, 2018;Thai et al, 2015;Nguyen-Xuan et al, 2014;Chang et al, 2016;Yin et al, 2015;Thanh et al, 2019b;Phung-Van et al, 2019;Thanh et al, 2019a;Thanh et al, 2018;Phung-Van et al, 2018;Thai et al, 2018b;Thai et al, 2018a;Tran et al, 2017;Thai et al, 2016), isogeometric boundary methods (Simpson et al, 2013;Simpson et al, 2012;Peng et al, 2017;Scott et al, 2013), stochastic analysis (Ding et al, 2019a;Ding et al, 2018b;Ding et al, 2019b;Ding et al, 2019c), other splines based methods (Atroshchenko et al, 2018;Nguyen-Thanh et al, 2011;Gu et al, 2018a;Gu et al, 2018b), and especially the severa...…”
Section: Cae Modelmentioning
confidence: 99%
“…Hughes et al (2005) and Cottrell et al (2009) firstly introduced the concept of IGA by using the spline basis functions [such as non-uniform rational B-splines (NURBSs)] constructing the exact geometric models as interpolation functions in CAE analysis. Up to now, this approach has also gained widespread reception from the scientific community and many applications have been verified, for example, structural optimization (Cho and Ha, 2009;Qian, 2010;Ding et al, 2016;Ding et al, 2018c;Lian et al, 2017;Lian et al, 2016;Hao et al, 2018a;Hao et al, 2019;Hao et al, 2018b), plate and composite structures (Thai et al, 2014;Yu et al, 2018;Thai et al, 2015;Nguyen-Xuan et al, 2014;Chang et al, 2016;Yin et al, 2015;Thanh et al, 2019b;Phung-Van et al, 2019;Thanh et al, 2019a;Thanh et al, 2018;Phung-Van et al, 2018;Thai et al, 2018b;Thai et al, 2018a;Tran et al, 2017;Thai et al, 2016), isogeometric boundary methods (Simpson et al, 2013;Simpson et al, 2012;Peng et al, 2017;Scott et al, 2013), stochastic analysis (Ding et al, 2019a;Ding et al, 2018b;Ding et al, 2019b;Ding et al, 2019c), other splines based methods (Atroshchenko et al, 2018;Nguyen-Thanh et al, 2011;Gu et al, 2018a;Gu et al, 2018b), and especially the severa...…”
Section: Cae Modelmentioning
confidence: 99%
“…Finally, the use of solid-shell NURBS element offers the possibility to optimize through the thickness. The thickness optimization issue seems to be promising (Ding et al 2016), and it is investigated in the present work (see section 5).…”
Section: Imposing Shape Variationsmentioning
confidence: 99%
“…Indeed, the volume representation of the structure enables to optimize the thickness profile continuously by modifying the control point coordinates. In this respect, Ding et al (2016) highlight the benefits of making use of a NURBS solid element to accurately represent and analyze the thickness variations encountered in tailor rolled blanks. Thickness optimization becomes thus natural with the solid-shell approach and its inherent continuous transition between the thin and the thick case appears attractive in a large range of applications.…”
Section: Introductionmentioning
confidence: 99%
“…Third, it is easier to refine the mesh than FEM and has greater accuracy in satisfaction of the essential boundary conditions. Due to these features, IGA has attracted many researchers to work in its theory and various engineering applications, such as shape and topology optimization [9][10][11][12][13][14], fluid mechanics [15][16][17] and fluid-structure interaction problems [18][19][20], contact mechanics [21][22][23], and damage and fracture mechanics [24][25][26] Yang proposed a matrix perturbation method for structural modal reanalysis [43,44].…”
Section: Introductionmentioning
confidence: 99%
“…T s y y y  y (14) the general solution of the balanced equations to satisfy the unbalanced equations. In order to use the SMW formula directly, the change in the stiffness matrix are converted to a low-rank form by using the Cholesky factorization of the initial stiffness matrix.…”
mentioning
confidence: 99%