Journal Articles
Novelino, L. S., Ze, Q., Wu, S., Paulino, G. H., & Zhao, R. (2020). Untethered control of functional origami microrobots with distributed actuation. Proceedings of the National Academy of Sciences, 117(39), 24096-24101.
Ze, Q., Wu, S., Nishikawa, J., Dai, J., Sun, Y., Leanza, S., Zemelka, C., Novelino, L.S., Paulino, G. H., & Zhao, R.R. (2022). Soft robotic origami crawler. Science advances, 8(13), eabm7834.
Lin, Z., Novelino, L. S., Wei, H., Alderete, N. A., Paulino, G. H., Espinosa, H. D., & Krishnaswamy, S. (2020). Folding at the microscale: Enabling multifunctional 3D origami‐architected metamaterials. Small, 16(35), 2002229.
Lin, Z., Novelino, L. S., Wei, H., Alderete, N. A., Paulino, G. H., Espinosa, H. D., & Krishnaswamy, S. (2020). Mechanical Metamaterials: Folding at the Microscale: Enabling Multifunctional 3D Origami‐Architected Metamaterials. (Small 35/2020). Small, 16(35), 2070192.
Liu, K., Novelino, L. S., Gardoni, P., & Paulino, G. H. (2020). Big influence of small random imperfections in origami-based metamaterials. Proceedings of the Royal Society A, 476(2241), 20200236.
Nauroze, S. A., Novelino, L. S., Tentzeris, M. M., & Paulino, G. H. (2020). Continuous-range tunable multilayer frequency selective surfaces using origami and inkjet-printing. Proceedings of the National Academy of Sciences, 115(52), 13210-13215.
Conference Proceedings
L. S. Novelino, S. A. Nauroze, M. M. Tentzeris, and G. H. Paulino (2018) Multiphysics origami: Achieving tunable frequency selective surfaces from origami principles, in Origami 7: Seventh International Meeting of Origami Science, Mathematics, and Education (7OSME), Tarquin, vol. 3. PDF
Nauroze, S. A., Novelino, L., Tentzeris, M. M., & Paulino, G. H. (2017, June). Inkjet-printed “4D” tunable spatial filters using on-demand foldable surfaces. In 2017 IEEE MTT-S International Microwave Symposium (IMS) (pp. 1575-1578). IEEE.
Peixoto, H. D. F. C., Novelino, L. S., & Dumont, N. A. (2015). A fast-multipole unified technique for the analysis of continuum mechanics problems with the boundary element methods. In XXXVI Ibero-Latin American Congress on Computational Methods in Engineering (Vol. 16).
Peixoto, H. D. F. C., Novelino, L. S., & Dumont, N. A. (2015). Basics of a fast-multipole unified technique for the analysis of several classes of continuum mechanics problems with the boundary element method. Boundary Elements and Other Mesh Reduction Methods XXXVIII, 61, 47. PDF
Ph.D. Thesis
Simoes Novelino, L. (2021). Multifunctional Origami: From Architected Metamaterials to Untethered Robots. PDF
MS Thesis
Novelino, L. S. (2015). Aplicação de Técnicas de ‘Fast Multipole’nos Métodos de Elementos de Contorno. PDF