The arithmetic codex
In this invited talk,1 we introduce the notion of arithmetic codex, or codex for short. It encompasses several well-established notions from cryptography (arithmetic secret sharing schemes, which enjoy additive as well as multiplicative properties) and algebraic complexity theory (bilinear complexit...
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sg-ntu-dr.10356-977052020-03-07T12:31:20Z The arithmetic codex Cascudo, Ignacio Cramer, Ronald Xing, Chaoping School of Physical and Mathematical Sciences IEEE Information Theory Workshop (11th : 2012 : Lausanne, Switzerland) DRNTU::Science::Mathematics In this invited talk,1 we introduce the notion of arithmetic codex, or codex for short. It encompasses several well-established notions from cryptography (arithmetic secret sharing schemes, which enjoy additive as well as multiplicative properties) and algebraic complexity theory (bilinear complexity of multiplication) in a natural mathematical framework. Arithmetic secret sharing schemes have important applications to secure multi-party computation and even to two-party cryptography. Interestingly, several recent applications to two-party cryptography rely crucially on the existing results on “asymptotically good families” of suitable such schemes. Moreover, the construction of these schemes requires asymptotically good towers of function fields over finite fields: no elementary (probabilistic) constructions are known in these cases. Besides introducing the notion, we discuss some of the constructions, as well as some limitations. 2013-07-22T06:48:18Z 2019-12-06T19:45:40Z 2013-07-22T06:48:18Z 2019-12-06T19:45:40Z 2012 2012 Conference Paper Cascudo, I., Cramer, R., & Xing, C. (2012). The arithmetic codex. 2012 IEEE Information Theory Workshop (ITW). https://hdl.handle.net/10356/97705 http://hdl.handle.net/10220/11994 10.1109/ITW.2012.6404767 en © 2012 IEEE. |
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DRNTU::Science::Mathematics Cascudo, Ignacio Cramer, Ronald Xing, Chaoping The arithmetic codex |
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In this invited talk,1 we introduce the notion of arithmetic codex, or codex for short. It encompasses several well-established notions from cryptography (arithmetic secret sharing schemes, which enjoy additive as well as multiplicative properties) and algebraic complexity theory (bilinear complexity of multiplication) in a natural mathematical framework. Arithmetic secret sharing schemes have important applications to secure multi-party computation and even to two-party cryptography. Interestingly, several recent applications to two-party cryptography rely crucially on the existing results on “asymptotically good families” of suitable such schemes. Moreover, the construction of these schemes requires asymptotically good towers of function fields over finite fields: no elementary (probabilistic) constructions are known in these cases. Besides introducing the notion, we discuss some of the constructions, as well as some limitations. |
| author2 |
School of Physical and Mathematical Sciences |
| author_facet |
School of Physical and Mathematical Sciences Cascudo, Ignacio Cramer, Ronald Xing, Chaoping |
| format |
Conference or Workshop Item |
| author |
Cascudo, Ignacio Cramer, Ronald Xing, Chaoping |
| author_sort |
Cascudo, Ignacio |
| title |
The arithmetic codex |
| title_short |
The arithmetic codex |
| title_full |
The arithmetic codex |
| title_fullStr |
The arithmetic codex |
| title_full_unstemmed |
The arithmetic codex |
| title_sort |
arithmetic codex |
| publishDate |
2013 |
| url |
https://hdl.handle.net/10356/97705 http://hdl.handle.net/10220/11994 |
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1681034020765302784 |