On the Properties of the Ortho-Derivatives of Quadratic Functions - Institut Polytechnique de Paris
Communication Dans Un Congrès Année : 2024

On the Properties of the Ortho-Derivatives of Quadratic Functions

Résumé

Quadratic APN vectorial functions are under intense scrutiny due to their role, e.g., in the big APN problem. Recently, a new tool has emerged to investigate their differential properties: the ortho-derivative. We present new results about this object. We first generalize it as a family of functions that can be defined for any quadratic function, even if not APN. We highlight a relation between the preimage sets of the ortho-derivative and the set of bent components, and between the ortho-derivative and some EA-invariants recently introduced by Kaleyski. We also show it is possible to reconstruct a quadratic function given its ortho-derivative. In the APN case, we prove that its algebraic degree is always at most equal to n−2 using a previously unknown relation between the ortho-derivatives and cofactor matrices.
Fichier principal
Vignette du fichier
onefile.pdf (343.96 Ko) Télécharger le fichier
Origine Fichiers produits par l'(les) auteur(s)

Dates et versions

hal-04648515 , version 1 (15-07-2024)

Licence

Identifiants

  • HAL Id : hal-04648515 , version 1

Citer

Alain Couvreur, Anne Canteaut, Léo Perrin. On the Properties of the Ortho-Derivatives of Quadratic Functions. WCC 2024 - The Thirteenth International Workshop on Coding and Cryptography, Jun 2024, Perugia, Italy. ⟨hal-04648515⟩
154 Consultations
106 Téléchargements

Partager

More