S. Arnab and V. Raja, Simulating a deformable object using a surface mass spring system, 2008 3rd International Conference on Geometric Modeling and Imaging, vol.4, pp.21-26, 2008.

,

D. Baraff and A. Witkin, Large steps in cloth simulation, Proceedings of the 25th Annual Conference on Computer Graphics and Interactive Techniques, SIGGRAPH '98, pp.43-54, 1998.

V. Baudet, M. Beuve, F. Jaillet, B. Shariat, and F. Zara, Integrating Tensile Parameters in Hexahedral Mass-Spring System for Simulation, 2009.
URL : https://hal.archives-ouvertes.fr/hal-00994456

J. Bender, M. Müller, M. A. Otaduy, and M. Teschner, Positionbased Methods for the Simulation of Solid Objects in Computer Graphics, STAR Proceedings of Eurographics, 2013.

M. Born and K. Huang, The Dynamical Theory of Crystal Lattices, 1954.

D. Bourguignon and M. P. Cani, Controlling Anisotropy in MassSpring Systems, pp.113-123, 2000.
URL : https://hal.archives-ouvertes.fr/inria-00537510

R. Bridson, R. Fedkiw, and J. Anderson, Robust treatment of collisions, contact and friction for cloth animation, ACM Trans. Graph, vol.21, issue.3, pp.594-603, 2002.

A. L. Cauchy, De la pression ou tension dans un système de points matériels, OEuvrescompì etes, vol.2, pp.1882-1974

A. L. Cauchy, Sur l'´ equilibre et le mouvement d'un système de points matériels sollicités par des forces d'attraction ou de répuslion mutuelle, Exercices de Mathématiques, vol.3, pp.1882-1974

Y. Chen, Q. Zhu, and A. Kaufman, Physically-based animation of volumetric objects, Proceedings of IEEE Computer Animation 98, pp.154-160, 1998.

R. Diziol, J. Bender, and D. Bayer, Robust real-time deformation of incompressible surface meshes, Proceedings of the 2011 ACM SIGGRAPH/Eurographics Symposium on Computer Animation, SCA '11, pp.237-246, 2011.

Y. Duan, W. Huang, H. Chang, W. Chen, J. Zhou et al., Volume Preserved Mass-spring Model with Novel Constraints for Soft Tissue Deformation, IEEE journal of biomedical and health informatics, vol.2194, issue.c, pp.1-12, 2014.

L. Elcoro and J. Etxebarria, Common misconceptions about the dynamical theory of crystal lattices: Cauchy relations, lattice potentials and infinite crystals, Eur. J. Phys, vol.32, pp.25-35, 2011.

A. V. Gelder, Approximate simulation of elastic membranes by triangulated spring meshes, Journal of Graphics Tools, vol.3, issue.2, pp.21-41, 1998.

J. O. Hallquist, LS-DYNA Theory Manual, 2006.

O. Jarrousse, T. Fritz, and O. Dössel, Implicit Time Integration in a Volumetric Mass-Spring System for Modeling Myocardial Elastomechanics, pp.876-879, 2010.

P. N. Keating, Effect of Invariance Requirements on the Elastic Strain Energy of Crystals with Applications to the Diamond Structure, Phys. Rev, vol.145, pp.637-645, 1966.

P. N. Keating, Relationship between the macroscopic and microscopic theory of crystal elasticity. I. Primitive crystals, Phys. Rev, vol.152, pp.774-779, 1966.

J. G. Kirkwood, The Skeletal Modes of Vibration of Long Chain Molecules, Journal of Chemical Physics, vol.7, pp.506-509, 1939.

M. Kot and H. Nagahashi, Second degree of freedom of elastic objects -adjustable Poisson's ratio for mass spring models, GRAPP 2015 -Proceedings, pp.138-142, 2015.

M. Kot and H. Nagahashi, Mass spring models with adjustable Poisson's ratio

. Vis and . Comput, , vol.33, pp.283-291, 2017.

M. Kot, H. Nagahashi, and P. Szymczak, Elastic moduli of simple mass spring models, Vis. Comput, vol.31, issue.10, pp.1339-1350, 2015.

E. Lifshitz, A. Kosevich, and L. Pitaevskii, Theory of elasticity, 1986.

B. A. Lloyd, G. Székely, and M. Harders, Identification of spring parameters for deformable object simulation, IEEE Transactions on Visualization and Computer Graphics, vol.13, issue.1, pp.1081-1093, 2007.

,

M. Marchal, Soft tissue modeling for computer assisted medical interventions, 2006.
URL : https://hal.archives-ouvertes.fr/tel-00129430

W. Mollemans, F. Schutyser, J. Van-cleynenbreugel, and P. Suetens, Tetrahedral Mass Spring Model for Fast Soft Tissue Deformation, pp.145-154, 2003.

S. Natsupakpong and M. Glu, Cenk: Determination of elasticity parameters in lumped element (mass-spring) models of deformable objects, Graphical Models, vol.72, issue.6, pp.61-73, 2010.

J. Niiranen, Fast and accurate symmetric Euler algorithm for electromechanical simulations, IMACS, vol.1, pp.71-78, 1999.

M. Ostoja-starzewski, P. Y. Sheng, and K. Alzebdeh, Spring network models in elasticity and fracture of composites and polycrystals, Comput. Mater. Sci, vol.7, pp.82-93, 1996.

M. Sahimi and S. Arbabi, Mechanics of disordered solids. II. Percolation on elastic networks with bond-bending forces, Physical Review B, vol.47, pp.703-712, 1993.

A. J. De-saint-venant, De la torsion des prismes, avec des considérations sur leur flexion ainsi que sur l'´ equililbre des solidesélastiquessolides´solidesélastiques en général et des formules pratiques pour le calcul de leur résistancè a divers efforts s'exerçant simultanément. No. 14 in Mémoires présentés par divers savantsà savants`savantsà l'Académie des Sciences de l, 1855.

G. San-vicente, I. Aguinaga, and J. Tomás-celigüeta, Cubical Mass-Spring Model design based on a tensile deformation test and nonlinear material model, IEEE transactions on visualization and computer graphics, vol.18, issue.2, pp.228-269, 2012.

D. Terzopoulos, J. Platt, and K. Fleischer, Heating and melting deformable models, The Journal of Visualization and Computer Animation, vol.2, issue.2, pp.68-73, 1991.

I. Todhunter, A History of the Theory of Elasticity and of the Strength of Materials: From Galilei to the Present Time, Cambridge Library Collection -Mathematics, vol.2, 2014.

G. S. Vincente-otamendi, Designing deformable models of soft tissue for virtual surgery planning and simulation using the MassSpring Model, 2011.