REFERENCES
1. Li, J.; Wang, L. Modeling magnetic soft continuum robot in nonuniform magnetic fields via energy minimization. Int. J. Mech. Sci. 2024, 282, 109688.
2. Kulkarni, M.; Edward, S.; Golecki, T.; Kaehr, B.; Golecki, H. Soft robots built for extreme environments. Soft. Sci. 2025, 5, 12.
3. Huang, X.; Xiang, H.; Wu, C.; et al. CRAB-EDM: a multi-modal underwater crab-inspired robot with temporally sequenced electro-discharge modulation. IEEE. Robot. Autom. Lett. 2026, 11, 3939-46.
4. Sun, W.; Liang, H.; Zhang, F.; et al. Dielectric elastomer minimum energy structure with a unidirectional actuation for a soft crawling robot: design, modeling, and kinematic study. Int. J. Mech. Sci. 2023, 238, 107837.
5. Chen, H.; Ali, M. A.; Wang, Z.; Chen, J.; Ramadan, M. N.; Alkhedher, M. Performance optimizing of pneumatic soft robotic hands using wave-shaped contour actuator. Results. Eng. 2025, 25, 103456.
6. Zolfagharian, A.; Lakhi, M.; Ranjbar, S.; Tadesse, Y.; Bodaghi, M. 3D printing non-assembly compliant joints for soft robotics. Results. Eng. 2022, 15, 100558.
7. Braganza, D.; Dawson, D.; Walker, I.; Nath, N. A neural network controller for continuum robots. IEEE. Trans. Robot. 2007, 23, 1270-7.
8. Reinhart, R. F.; Steil, J. J. Hybrid mechanical and data-driven modeling improves inverse kinematic control of a soft robot. Procedia. Technol. 2016, 26, 12-9.
9. Thuruthel, T. G.; Shih, B.; Laschi, C.; Tolley, M. T. Soft robot perception using embedded soft sensors and recurrent neural networks. Sci. Robot. 2019, 4, eaav1488.
10. Holsten, F.; Engell-Nørregård, M. P.; Darkner, S.; Erleben, K. Data driven inverse kinematics of soft robots using local models. In 2019 International Conference on Robotics and Automation (ICRA), Montreal, Canada, May 20-24, 2019. IEEE; 2019. pp. 6251-7.
11. Liu, J.; Low, J. H.; Han, Q. Q.; et al. Simulation data driven design optimization for reconfigurable soft gripper system. IEEE. Robot. Autom. Lett. 2022, 7, 5803-10.
12. Bruder, D.; Fu, X.; Gillespie, R. B.; Remy, C. D.; Vasudevan, R. Data-driven control of soft robots using Koopman operator theory. IEEE. Trans. Robot. 2021, 37, 948-61.
13. Della Santina, C.; Bicchi, A.; Rus, D. On an improved state parametrization for soft robots with piecewise constant curvature and its use in model based control. IEEE. Robot. Autom. Lett. 2020, 5, 1001-8.
14. Wang, M.; Dong, X.; Ba, W.; Mohammad, A.; Axinte, D.; Norton, A. Design, modelling and validation of a novel extra slender continuum robot for in-situ inspection and repair in aeroengine. Robot. Comput. Integr. Manuf. 2021, 67, 102054.
15. Nuelle, K.; Sterneck, T.; Lilge, S.; Xiong, D.; Burgner-Kahrs, J.; Ortmaier, T. Modeling, calibration, and evaluation of a tendon-actuated planar parallel continuum robot. IEEE. Robot. Autom. Lett. 2020, 5, 5811-8.
16. Falkenhahn, V.; Hildebrandt, A.; Neumann, R.; Sawodny, O. Model-based feedforward position control of constant curvature continuum robots using feedback linearization. In 2015 IEEE International Conference on Robotics and Automation (ICRA), Seattle, USA, May 26-30, 2015. IEEE; 2015. pp. 762-7.
17. Caasenbrood, B. J.; Pogromsky, A. Y.; Nijmeijer, H. Dynamic modeling of hyper-elastic soft robots using spatial curves. IFAC. PapersOnLine. 2020, 53, 9238-43.
18. Liu, S.; Jiao, J.; Meng, F.; Mei, T.; Sun, X.; Kong, W. Modeling of a soft actuator with a semicircular cross section under gravity and external load. IEEE. Trans. Ind. Electron. 2023, 70, 4952-61.
19. Xun, L.; Zheng, G.; Kruszewski, A. Cosserat-Rod-based dynamic modeling of soft slender robot interacting with environment. IEEE. Trans. Robot. 2024, 40, 2811-30.
20. Naughton, N.; Sun, J.; Tekinalp, A.; Parthasarathy, T.; Chowdhary, G.; Gazzola, M. Elastica: a compliant mechanics environment for soft robotic control. IEEE. Robot. Autom. Lett. 2021, 6, 3389-96.
21. Ma, J.; Han, Z.; Yang, L.; Min, G.; Liu, Z.; He, W. Dynamics modeling of a soft arm under the Cosserat theory. In 2021 IEEE International Conference on Real-time Computing and Robotics (RCAR), Xining, China, Jul 15-19, 2021. IEEE; 2021. pp. 87-90.
22. George Thuruthel, T.; Renda, F.; Iida, F. First-order dynamic modeling and control of soft robots. Front. Robot. AI. 2020, 7, 95.
23. Mitros, Z.; Thamo, B.; Bergeles, C.; da Cruz, L.; Dhaliwal, K.; Khadem, M. Design and modelling of a continuum robot for distal lung sampling in mechanically ventilated patients in critical care. Front. Robot. AI. 2021, 8, 611866.
24. Amehri, W.; Zheng, G.; Kruszewski, A. FEM-based exterior workspace boundary estimation for soft robots via optimization. IEEE. Robot. Autom. Lett. 2022, 7, 3672-8.
25. Schegg, P.; Duriez, C. Review on generic methods for mechanical modeling, simulation and control of soft robots. PLoS. One. 2022, 17, e0251059.
26. Wang, T.; Zhang, Y.; Zhu, Y.; Zhu, S. A computationally efficient dynamical model of fluidic soft actuators and its experimental verification. Mechatronics 2019, 58, 1-8.
27. Peng, Y.; Sakai, Y.; Funabora, Y.; Yokoe, K.; Aoyama, T.; Doki, S. Funabot-Sleeve: a wearable device employing McKibben artificial muscles for haptic sensation in the forearm. IEEE. Robot. Autom. Lett. 2025, 10, 1944-51.
28. Liew, A.; Gardner, L.; Block, P. Moment-curvature-thrust relationships for beam-columns. Structures 2017, 11, 146-54.
29. Marsden, J.; Scheurle, J. The reduced Euler-Lagrange equations. In: Enos M, editor. Dynamics and control of mechanical systems: the falling cat and related problems. Providence: American Mathematical Society; 1993. pp. 139-64. https://www.semanticscholar.org/paper/The-Reduced-Euler-Lagrange-Equations-Marsden-Scheurle/cd941c78b9e22944a3e2afcba433ca021e401fa7. (accessed 2026-06-12).
30. Uppalapati, N. K.; Krishnan, G. Design and modeling of soft continuum manipulators using parallel asymmetric combination of fiber-reinforced elastomers. J. Mech. Robot. 2021, 13, 011010.
31. Bartholdt, M.; Wiese, M.; Schappler, M.; Spindeldreier, S.; Raatz, A. A parameter identification method for static cosserat rod models: application to soft material actuators with exteroceptive sensors. In 2021 IEEE/RSJ International Conference on Intelligent Robots and Systems (IROS), Prague, Czech Republic, Sep 27 - Oct 01, 2021. IEEE; 2021. pp. 624-31.
