T. J. Hughes, J. A. Cottrell, and Y. Bazilevs, Isogeometric analysis: CAD, finite elements, NURBS, exact geometry and mesh refinement, Computer Methods in Applied Mechanics and Engineering, vol.194, pp.4135-4195, 2005.
URL : https://hal.archives-ouvertes.fr/hal-01513346

J. Kiendl, K. Bletzinger, J. Linhard, and R. Wüchner, Isogeometric shell analysis with Kirchhoff-Love elements, Computer Methods in Applied Mechanics and Engineering, vol.198, pp.3902-3914, 2009.

R. Echter, B. Oesterle, and M. Bischoff, A hierarchic family of isogeometric shell finite elements, Computer Methods in Applied Mechanics and Engineering, vol.254, pp.170-180, 2013.

R. Bouclier, T. Elguedj, and A. Combescure, An isogeometric locking-free NURBS-based solid-shell element for geometrically nonlinear analysis, International Journal for Numerical Methods in Engineering, vol.101, pp.774-808, 2015.
URL : https://hal.archives-ouvertes.fr/hal-01978232

W. A. Wall, M. A. Frenzel, and C. Cyron, Isogeometric structural shape optimization, Computer Methods in Applied Mechanics and Engineering, vol.197, pp.2976-2988, 2008.

A. P. Nagy, S. T. Ijsselmuiden, and M. M. Abdalla, Isogeometric design of anisotropic shells: Optimal form and material distribution, Computer Methods in Applied Mechanics and Engineering, vol.264, pp.145-162, 2013.

T. Hirschler, R. Bouclier, A. Duval, T. Elguedj, and J. Morlier, Isogeometric sizing and shape optimization of thin structures with a solid-shell approach, Structural and Multidisciplinary Optimization, vol.59, pp.767-785, 2019.

T. Elguedj, Y. Bazilevs, V. Calo, and T. Hughes, B and F projection methods for nearly incompressible linear and non-linear elasticity and plasticity using higher-order NURBS elements, Computer Methods in Applied Mechanics and Engineering, vol.197, pp.2732-2762, 2008.
URL : https://hal.archives-ouvertes.fr/hal-00457010

R. Bouclier, T. Elguedj, and A. Combescure, Development of a mixed displacement-stress formulation for the analysis of elastoplastic structures under small strains: Application to a locking-free, NURBS-based solid-shell element, Computer Methods in Applied Mechanics and Engineering, vol.295, pp.543-561, 2015.
URL : https://hal.archives-ouvertes.fr/hal-01978240

M. Ambati, J. Kiendl, and L. D. Lorenzis, Isogeometric Kirchhoff-Love shell formulation for elasto-plasticity, Computer Methods in Applied Mechanics and Engineering, vol.340, pp.320-339, 2018.

A. Seitz, P. Farah, J. Kremheller, B. I. Wohlmuth, W. A. Wall et al., Isogeometric dual mortar methods for computational contact mechanics, Computer Methods in Applied Mechanics and Engineering, vol.301, pp.259-280, 2016.
URL : https://hal.archives-ouvertes.fr/hal-01382361

M. Occelli, T. Elguedj, S. Bouabdallah, and L. Morançay, LR B-Splines implementation in the Altair RadiossTM solver for explicit dynamics IsoGeometric Analysis, Advances in Engineering Software, vol.131, pp.166-185, 2019.

D. Kamensky, M. Hsu, Y. Yu, J. A. Evans, M. S. Sacks et al., Immersogeometric cardiovascular fluidstructure interaction analysis with divergence-conforming B-splines, Computer Methods in Applied Mechanics and Engineering, vol.314, pp.408-472, 2017.

A. Apostolatos, G. De-nayer, K. Bletzinger, M. Breuer, and R. Wüchner, Systematic evaluation of the interface description for fluidstructure interaction simulations using the isogeometric mortar-based mapping, Journal of Fluids and Structures, vol.86, pp.368-399, 2019.
URL : https://hal.archives-ouvertes.fr/hal-02132323

G. Xu, B. Mourrain, R. Duvigneau, and A. Galligo, Analysis-suitable volume parameterization of multi-block computational domain in isogeometric applications, Computer-Aided Design, vol.45, pp.395-404, 2013.
URL : https://hal.archives-ouvertes.fr/hal-00685002

H. Akhras, T. Elguedj, A. Gravouil, and M. Rochette, Towards an automatic isogeometric analysis suitable trivariate models generationApplication to geometric parametric analysis, Computer Methods in Applied Mechanics and Engineering, vol.316, pp.623-645, 2017.

F. Massarwi, P. Antolin, and G. Elber, Volumetric untrimming: Precise decomposition of trimmed trivariates into tensor products, Computer Aided Geometric Design, vol.71, pp.1-15, 2019.

B. Marussig and T. J. Hughes, A Review of Trimming in Isogeometric Analysis: Challenges, Data Exchange and Simulation Aspects, Archives of Computational Methods in Engineering, vol.25, pp.1059-1127, 2018.

T. Teschemacher, A. M. Bauer, T. Oberbichler, M. Breitenberger, R. Rossi et al., Realization of CAD-integrated shell simulation based on isogeometric B-Rep analysis, Advanced Modeling and Simulation in Engineering Sciences, vol.5, p.19, 2018.

A. Apostolatos, M. Breitenberger, R. Wüchner, and K. Bletzinger, Domain decomposition methods and kirchhoff-love shell multipatch coupling in isogeometric analysis, Isogeometric Analysis and Applications, pp.73-101, 2014.

M. Breitenberger, A. Apostolatos, B. Philipp, R. Wüchner, and K. Bletzinger, Analysis in computer aided design: Nonlinear isogeometric B-Rep analysis of shell structures, Computer Methods in Applied Mechanics and Engineering, vol.284, pp.401-457, 2015.

A. J. Herrema, E. L. Johnson, D. Proserpio, M. C. Wu, J. Kiendl et al., Penalty coupling of non-matching isogeometric KirchhoffLove shell patches with application to composite wind turbine blades, Computer Methods in Applied Mechanics and Engineering, 2018.

E. Brivadis, A. Buffa, B. Wohlmuth, and L. Wunderlich, Isogeometric mortar methods, Computer Methods in Applied Mechanics and Engineering, vol.284, pp.292-319, 2015.

R. Bouclier, J. Passieux, and M. Salaün, Development of a new, more regular, mortar method for the coupling of NURBS subdomains within a NURBS patch: Application to a non-intrusive local enrichment of NURBS patches, Computer Methods in Applied Mechanics and Engineering, vol.316, pp.123-150, 2017.
URL : https://hal.archives-ouvertes.fr/hal-01577934

R. Bouclier, J. Passieux, and M. Salaün, Local enrichment of NURBS patches using a non-intrusive coupling strategy: Geometric details, local refinement, inclusion, fracture, Computer Methods in Applied Mechanics and Engineering, vol.300, pp.1-26, 2016.
URL : https://hal.archives-ouvertes.fr/hal-01295461

W. Dornisch, J. Stöckler, and R. Müller, Dual and approximate dual basis functions for B-splines and NURBS Comparison and application for an efficient coupling of patches with the isogeometric mortar method, Computer Methods in Applied Mechanics and Engineering, vol.316, pp.449-496, 2017.

Z. Zou, M. Scott, M. Borden, D. Thomas, W. Dornisch et al., Isogeometric Bézier dual mortaring: Refineable higher-order spline dual bases and weakly continuous geometry, Computer Methods in Applied Mechanics and Engineering, vol.333, pp.497-534, 2018.

T. Hirschler, R. Bouclier, A. Duval, T. Elguedj, and J. Morlier, The embedded isogeometric Kirchhoff-Love shell: From design to shape optimization of non-conforming stiffened multipatch structures, Computer Methods in Applied Mechanics and Engineering, vol.349, pp.774-797, 2019.
URL : https://hal.archives-ouvertes.fr/hal-02055622

L. Wunderlich, A. Seitz, M. D. Alaydn, B. Wohlmuth, and A. Popp, Biorthogonal splines for optimal weak patch-coupling in isogeometric analysis with applications to finite deformation elasticity, Computer Methods in Applied Mechanics and Engineering, vol.346, pp.197-215, 2019.

S. Schuß, M. Dittmann, B. Wohlmuth, S. Klinkel, and C. Hesch, Multi-patch isogeometric analysis for Kirchhoff-Love shell elements, Computer Methods in Applied Mechanics and Engineering, vol.349, pp.91-116, 2019.

V. P. Nguyen, P. Kerfriden, M. Brino, S. P. Bordas, and E. Bonisoli, Nitsche's method for two and three dimensional nurbs patch coupling, Computational Mechanics, vol.53, pp.1163-1182, 2014.

D. Schillinger, I. Harari, M. Hsu, D. Kamensky, S. K. Stoter et al., The non-symmetric Nitsche method for the parameterfree imposition of weak boundary and coupling conditions in immersed finite elements, Computer Methods in Applied Mechanics and Engineering, vol.309, pp.625-652, 2016.

Y. Guo, M. Ruess, and D. Schillinger, A parameter-free variational coupling approach for trimmed isogeometric thin shells, Computational Mechanics, vol.59, pp.693-715, 2017.

N. Nguyen-thanh, K. Zhou, X. Zhuang, P. Areias, H. Nguyen-xuan et al., Isogeometric analysis of large-deformation thin shells using RHT-splines for multiple-patch coupling, Computer Methods in Applied Mechanics and Engineering, vol.316, pp.1157-1178, 2017.

R. Bouclier and J. Passieux, A Nitsche-based non-intrusive coupling strategy for global/local isogeometric structural analysis, Computer Methods in Applied Mechanics and Engineering, vol.340, pp.253-277, 2018.
URL : https://hal.archives-ouvertes.fr/hal-01816443

Y. Guo, J. Heller, T. J. Hughes, M. Ruess, and D. Schillinger, Variationally consistent isogeometric analysis of trimmed thin shells at finite deformations, based on the STEP exchange format, Computer Methods in Applied Mechanics and Engineering, vol.336, pp.39-79, 2018.

D. Stefanica, A Numerical Study of FETI Algorithms for Mortar Finite Element Methods, SIAM Journal on Scientific Computing, vol.23, pp.1135-1160, 2001.

D. Stefanica, Parallel FETI algorithms for mortars, vol.54, pp.266-279, 2005.

P. Gosselet and C. Rey, Non-overlapping domain decomposition methods in structural mechanics, Archives of Computational Methods in Engineering, vol.13, pp.515-572, 2006.
URL : https://hal.archives-ouvertes.fr/hal-01224408

C. Farhat and F. Roux, A method of finite element tearing and interconnecting and its parallel solution algorithm, International Journal for Numerical Methods in Engineering, vol.32, pp.1205-1227, 1991.

P. Tallec, Y. Roeck, and M. Vidrascu, Domain decomposition methods for large linearly elliptic three-dimensional problems, Journal of Computational and Applied Mathematics, vol.34, pp.93-117, 1991.
URL : https://hal.archives-ouvertes.fr/inria-00075376

S. K. Kleiss, C. Pechstein, B. Jüttler, and S. Tomar, IETI -Isogeometric Tearing and Interconnecting, Computer Methods in Applied Mechanics and Engineering, pp.201-215, 2012.

C. Farhat, M. Lesoinne, P. Letallec, K. Pierson, and D. Rixen, FETI-DP: a dual-primal unified FETI method-part I: A faster alternative to the two-level FETI method, International Journal for Numerical Methods in Engineering, vol.50, pp.1523-1544, 2001.

C. Hofer and U. Langer, Dual-primal isogeometric tearing and interconnecting solvers for multipatch dG-IgA equations, Computer Methods in Applied Mechanics and Engineering, vol.316, pp.2-21, 2017.

G. Stavroulakis, D. Tsapetis, and M. Papadrakakis, Non-overlapping domain decomposition solution schemes for structural mechanics isogeometric analysis, Computer Methods in Applied Mechanics and Engineering, vol.341, pp.695-717, 2018.

C. Farhat, P. Chen, J. Mandel, and F. X. Roux, The two-level FETI method Part II: Extension to shell problems, parallel implementation and performance results, Computer Methods in Applied Mechanics and Engineering, vol.155, pp.153-179, 1998.

A. Amini, D. Dureisseix, P. Cartraud, and N. Buannic, A domain decomposition method for problems with structural heterogeneities on the interface: Application to a passenger ship, Computer Methods in Applied Mechanics and Engineering, vol.198, pp.3452-3463, 2009.
URL : https://hal.archives-ouvertes.fr/hal-00510475

L. Piegl and W. Tiller, The NURBS Book, 1997.

D. F. Rogers, An Introduction to NURBS: With Historical Perspective, 2001.

J. , Isogeometric Analysis and Shape Optimal Design of Shell Structures, 2011.

F. Cirak, M. Ortiz, and P. Schrder, Subdivision surfaces: a new paradigm for thin-shell finite-element analysis, International Journal for Numerical Methods in Engineering, vol.47, pp.2039-2072, 2000.

J. Kiendl, M. Hsu, M. C. Wu, and A. Reali, Isogeometric Kirchhoff-Love shell formulations for general hyperelastic materials, Computer Methods in Applied Mechanics and Engineering, vol.291, pp.280-303, 2015.

M. Bischoff, E. Ramm, and J. Irslinger, Models and Finite Elements for Thin-Walled Structures, Encyclopedia of Computational Mechanics Second Edition, 1859, pp.1-86, 2017.

L. Coox, F. Maurin, F. Greco, E. Deckers, D. Vandepitte et al., A flexible approach for coupling NURBS patches in rotationless isogeometric analysis of Kirchhoff-Love shells, Computer Methods in Applied Mechanics and Engineering, vol.325, pp.505-531, 2017.

C. Lacour, Analyse et résolution numérique de méthodes de sous-domaines non conformes pour des problèmes de plaques, 1997.

A. Bauer, M. Breitenberger, B. Philipp, R. Wüchner, and K. Bletzinger, Embedded structural entities in NURBS-based isogeometric analysis, Computer Methods in Applied Mechanics and Engineering, vol.325, pp.198-218, 2017.

P. Gosselet, D. Rixen, F. Roux, and N. Spillane, Simultaneous FETI and block FETI: Robust domain decomposition with multiple search directions, International Journal for Numerical Methods in Engineering, vol.104, pp.905-927, 2015.
URL : https://hal.archives-ouvertes.fr/hal-01056928

C. Bovet, A. Parret-fréaud, N. Spillane, and P. Gosselet, Adaptive multipreconditioned FETI: Scalability results and robustness assessment, Computers & Structures, vol.193, pp.1-20, 2017.
URL : https://hal.archives-ouvertes.fr/hal-01458725

D. Dureisseix and C. Farhat, A numerically scalable domain decomposition method for the solution of frictionless contact problems, International Journal for Numerical Methods in Engineering, vol.50, pp.2643-2666, 2001.
URL : https://hal.archives-ouvertes.fr/hal-00321391

D. J. Rixen, C. Farhat, R. Tezaur, and J. Mandel, Theoretical comparison of the FETI and algebraically partitioned FETI methods, and performance comparisons with a direct sparse solver, International Journal for Numerical Methods in Engineering, vol.46, pp.501-533, 1999.

Z. Dostál, D. Horák, and R. Ku?era, Total FETI-an easier implementable variant of the FETI method for numerical solution of elliptic PDE, Communications in Numerical Methods in Engineering, vol.22, pp.1155-1162, 2006.

T. Kozubek, V. Vondrák, M. Men?k, D. Horák, Z. Dostál et al., Total FETI domain decomposition method and its massively parallel implementation, Advances in Engineering Software, vol.60, pp.14-22, 2013.

C. Farhat and M. Géradin, On the general solution by a direct method of a large-scale singular system of linear equations: application to the analysis of floating structures, International Journal for Numerical Methods in Engineering, vol.41, pp.675-696, 1998.

G. Golub and W. Kahan, Calculating the Singular Values and Pseudo-Inverse of a Matrix, Journal of the Society for Industrial and Applied Mathematics Series B Numerical Analysis, vol.2, pp.205-224, 1965.

D. J. Rixen, Extended preconditioners for the FETI method applied to constrained problems, International Journal for Numerical Methods in Engineering, vol.54, pp.1-26, 2002.

T. Belytschko, H. Stolarski, W. K. Liu, N. Carpenter, and J. S. Ong, Stress projection for membrane and shear locking in shell finite elements, Computer Methods in Applied Mechanics and Engineering, vol.51, pp.221-258, 1985.

R. Bouclier, T. Elguedj, and A. Combescure, Efficient isogeometric NURBS-based solid-shell elements: Mixed formulation and B-Method, Computer Methods in Applied Mechanics and Engineering, vol.267, pp.86-110, 2013.
URL : https://hal.archives-ouvertes.fr/hal-00938261

J. Vassberg, M. Dehaan, M. Rivers, and R. Wahls, Development of a Common Research Model for Applied CFD Validation Studies, 26th AIAA Applied Aerodynamics Conference, pp.1-22, 2008.