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ACISP
2003
Springer
2003
Springer
New Constructions for Resilient and Highly Nonlinear Boolean Functions
Abstract. We explore three applications of geometric sequences in constructing cryptographic Boolean functions. First, we construct 1-resilient functions of n Boolean variables with nonlinearity 2n−1 −2(n−1)/2 , n odd. The Hadamard transform of these functions is 3-valued, which limits the efficiency of certain stream cipher attacks. From the case for n odd, we construct highly nonlinear 1-resilient functions which disprove a conjecture of Pasalic and Johansson for n even. Our constructions do not have a potential weakness shared by resilient functions which are formed from concatenation of linear functions. Second, we give a new construction for balanced Boolean functions with high nonlinearity, exceeding 2n−1 −2(n−1)/2 , which is not based on the direct sum construction. Moreover, these functions have high algebraic degree and large linear span. Third, we construct balanced vectorial Boolean functions with nonlinearity 2n−1 − 2(n−1)/2 and low maximum correlation. Th...
Real-time Traffic1-resilient Functions | ACISP 2003 | Boolean Functions | Cryptographic Boolean Functions | Security Privacy |
Related Content
| Added | 06 Jul 2010 |
| Updated | 06 Jul 2010 |
| Type | Conference |
| Year | 2003 |
| Where | ACISP |
| Authors | Khoongming Khoo, Guang Gong |
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