Several classes of even-variable 1-resilient rotation symmetric Boolean functions with high algebraic degree and nonlinearity
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Publication:2065926
DOI10.1016/J.DISC.2021.112752zbMath1492.94261OpenAlexW4200298503MaRDI QIDQ2065926
Zexia Shi, Lei Sun, Fang-Wei Fu
Publication date: 13 January 2022
Published in: Discrete Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.disc.2021.112752
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- A secondary construction and a transformation on rotation symmetric functions, and their action on bent and semi-bent functions
- Balanced \(2p\)-variable rotation symmetric Boolean functions with maximum algebraic immunity
- Results on rotation-symmetric S-boxes
- Rotation symmetric Boolean functions-count and cryptographic properties
- On the weight and nonlinearity of homogeneous rotation symmetric Boolean functions of degree 2
- Analysis and design of stream ciphers
- On non-existence of bent-negabent rotation symmetric Boolean functions
- Construction and count of 1-resilient rotation symmetric Boolean functions
- Improving the lower bound on the maximum nonlinearity of 1-resilient Boolean functions and designing functions satisfying all cryptographic criteria
- Construction of rotation symmetric Boolean functions with optimal algebraic immunity and high nonlinearity
- Construction of Rotation Symmetric S-Boxes with High Nonlinearity and Improved DPA Resistivity
- Correlation-immunity of nonlinear combining functions for cryptographic applications (Corresp.)
- Search for Boolean Functions With Excellent Profiles in the Rotation Symmetric Class
- Privacy Amplification by Public Discussion
- A spectral characterization of correlation-immune combining functions
- Generic Construction of Bent Functions and Bent Idempotents With Any Possible Algebraic Degrees
- 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
- On the number of rotation symmetric Boolean functions
- Systematic Constructions of Rotation Symmetric Bent Functions, 2-Rotation Symmetric Bent Functions, and Bent Idempotent Functions
- Enumeration of 9-Variable Rotation Symmetric Boolean Functions Having Nonlinearity > 240
- Fast Software Encryption
- Enumeration of binary orthogonal arrays of strength 1
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