Constructions of rotation symmetric bent functions and bent idempotent functions
From MaRDI portal
Publication:6605892
DOI10.3934/AMC.2023022MaRDI QIDQ6605892
Publication date: 16 September 2024
Published in: Advances in Mathematics of Communications (Search for Journal in Brave)
bent functionalgebraic degreerotation symmetric Boolean functionalgebraic normal formidempotent function
Algebraic coding theory; cryptography (number-theoretic aspects) (11T71) Cryptography (94A60) Boolean functions (94D10)
Cites Work
- Title not available (Why is that?)
- Title not available (Why is that?)
- A secondary construction and a transformation on rotation symmetric functions, and their action on bent and semi-bent functions
- Strongly regular graphs constructed from \(p\)-ary bent functions
- Four decades of research on bent functions
- Rotation symmetric Boolean functions-count and cryptographic properties
- Strongly regular graphs associated with ternary bent functions
- Results on rotation symmetric bent functions
- On ``bent functions
- Codes, bent functions and permutations suitable for DES-like cryptosystems
- A construction of bent functions with optimal algebraic degree and large symmetric group
- A new construction of rotation symmetric bent functions with maximal algebraic degree
- A family of difference sets in non-cyclic groups
- Results on Constructions of Rotation Symmetric Bent and Semi-bent Functions
- Several New Infinite Families of Bent Functions and Their Duals
- Bent functions from spreads
- On Bent and Semi-Bent Quadratic Boolean Functions
- Search for Boolean Functions With Excellent Profiles in the Rotation Symmetric Class
- Bent-function sequences
- On cryptographic properties of the cosets of R(1, m)
- On some cosets of the first-order Reed-Muller code with high minimum weight
- The covering radius of the<tex>(2^{15}, 16)</tex>Reed-Muller code is at least 16276
- Systematic Methods of Constructing Bent Functions and 2-Rotation Symmetric Bent Functions
- Boolean Functions for Cryptography and Coding Theory
- Constructing vectorial Boolean functions with high algebraic immunity based on group decomposition
- Constructions of Quadratic and Cubic Rotation Symmetric Bent Functions
- Bent Functions
- Systematic Constructions of Rotation Symmetric Bent Functions, 2-Rotation Symmetric Bent Functions, and Bent Idempotent Functions
This page was built for publication: Constructions of rotation symmetric bent functions and bent idempotent functions
Report a bug (only for logged in users!)Click here to report a bug for this page (MaRDI item Q6605892)
