Piedade, C. A. (2023)
The existence of a unique even transitive string C-group of degree 11 for ranks 4 and 5. pre-print, 28 pages.
Piedade, C. A. (2023) Infinite families of hypertopes from centrally symmetric polytopes. Electronic Journal of Combinatorics, 40(2), P2.20.
Fernandes, M. E., & Piedade, C. A. (2022) The degrees of
regular polytopes [4,4,4]. SIAM Journal on Discrete Mathematics, 36(2),
1143-1155.
Fernandes, M. E., Leemans, D., Piedade, C. A., & Weiss, A.
I. (2021) Two families of
locally toroidal regular 4-hypertopes arising from toroids. In Contemporary
Mathematics, volume 764, pages 89–100. American Mathematical Society.
Fernandes, M. E., & Piedade, C. A. (2021) The degrees of
toroidal regular proper hypermaps. The Art of Discrete
and Applied Mathematics, 4(3), P3-13.
Fernandes, M. E., & Piedade, C. A. (2020) Faithful
permutation representations of toroidal regular maps. Journal of Algebraic
Combinatorics, 52(3), 317-337.
Fernandes, M. E., & Piedade, C. A. (2020)
Correction to
“Faithful permutation representations of toroidal regular maps”. Journal of Algebraic
Combinatorics, 1-6.
Piedade, C. A., Silva, M. S., Cordeiro, C., & Ferreira, A. E. (2017) Virus
Disassembly Pathways Predicted from Geometry and Configuration Energy. In International
Joint Conference on Biomedical Engineering Systems and Technologies (pp.
289-301). Springer, Cham.
8.
Piedade C.A., Ferreira A. & Cordeiro C. (2017) How to
Disassemble a Virus Capsid - A Computational Approach. In Proceedings of the
10th International Joint Conference on Biomedical Engineering Systems and
Technologies - Volume 3: BIOINFORMATICS, (BIOSTEC 2017) ISBN
978-989-758-214-1, pages 217-222.
Piedade, C.A. Faithful permutation representations of C-groups. PhD thesis, Universidade de Aveiro (2022)
Piedade, C.A. How to Disassemble a Virus Capsid - A Computational Approach. Master thesis, Faculdade de Ciências da Universidade de Lisboa (2017)