In this paper, algebraic-geometric codes over $GF(2^m)$ are used to modify Carlet and Kurosawa-Satoh's construction for giving vectorial resilient Boolean ...
Jun 2, 2006 · In this paper, algebraic-geometric codes over GF(2^m) are used to modify Carlet and Kurosawa-Satoh's construction for giving vectorial resilient ...
In this paper we investigate the relationship between the nonlinearity and the order of resiliency of a Boolean function. We flrst prove a sharper version of ...
The algebraic-geometric codes over GF(2m) are used to modify the Carlet and Kurosawa-Satoh's construction for giving vectorial resilient Boolean functions ...
Vectorial Resilient $PC(l)$ of Order $k$ Boolean Functions from AG-Codes. H. Chen, L. Ma, and J. Li. CoRR, (2006 ). 1. 1. Meta data.
Dec 28, 2010 · In this paper, the algebraic-geometric codes over GF(2m) are used to modify the Carlet and Kurosawa-Satoh's construction for giving vectorial ...
Abstract: Propagation criteria and resiliency of vectorial Boolean functions are important for cryptographic purpose (see [1-4, 7, 8, 1, 11, 16]).
In this paper, algebraic-geometric codes over $GF(2^m)$ are used to modify Carlet and Kurosawa-Satoh's construction for giving vectorial resilient Boolean ...
Vectorial Resilient $PC(l)$ of Order $k$ Boolean Functions from AG-Codes · Метаданные · тэги · Пользователи данного ресурса · Комментарии и рецензиипоказать / ...
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Feb 17, 2019 · In this paper, we study a new family of Boolean functions with cryptographically strong properties such as non-linearity, propagation criterion, ...