- E-mailMarco.Calderini@uib.no
- Phone+47 55 58 40 11
- Visitor AddressHIB - Thormøhlensgt. 55
- Postal AddressPostboks 78035020 Bergen
My research interests primarily lie in cryptography and coding theory. Currently, I am focusing on the construction and analysis of optimal functions defined over finite fields with applications to cryptography, with particular interest to perfect nonlinear (PN) and almost perfect nonlinear (APN) functions.
Academic article
- 2021. On properties of translation groups in the affine general linear group with applications to cryptography. Journal of Algebra.
- 2020. Some group-theoretical results on Feistel Networks in a long-key scenario. Advances in Mathematics of Communications. 727-743.
- 2020. Primitivity of the group of a cipher involving the action of the key-schedule. Journal of Algebra and its Applications.
- 2020. On the EA-classes of known APN functions in small dimensions. Cryptography and Communications. 821-840.
- 2020. On the Boomerang Uniformity of some Permutation Polynomials. Cryptography and Communications. 1161-1178.
- 2020. On equivalence between known families of quadratic APN functions. Finite Fields and Their Applications. 21 pages.
- 2020. Generalized isotopic shift construction for APN functions. Designs, Codes and Cryptography. 19-32.
- 2020. Differentially low uniform permutations from known 4-uniform functions. Designs, Codes and Cryptography. 33-52.
- 2020. Constructing APN functions through isotopic shifts. IEEE Transactions on Information Theory. 5299-5309.
- 2019. Wave-shaped round functions and primitive groups. Advances in Mathematics of Communications. 67-88.
- 2019. On relations between CCZ- and EA-equivalences. Cryptography and Communications. 85-100.
- 2019. On hidden sums compatible with a given block cipher diffusion layer. Discrete Mathematics. 373-386.
- 2018. A NOTE ON SOME ALGEBRAIC TRAPDOORS FOR BLOCK CIPHERS. Advances in Mathematics of Communications. 515-524.
Academic chapter/article/Conference paper
- 2019. On Isotopic Shift Construction for Planar Functions. 5 pages.
More information in national current research information system (CRIStin)
Fields of competence