Coding Theory and Cryptography
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| There are three main areas in post quantum cryptography. These are codes based cryptography, lattices based cryptography, and polynomial based cryptography. We invited top researchers in each area and discuss current research with the connection of Coding Theory, Algebra, Number Theory, and Algebraic Geometry. | There are three main areas in post quantum cryptography. These are codes based cryptography, lattices based cryptography, and polynomial based cryptography. We invited top researchers in each area and discuss current research with the connection of Coding Theory, Algebra, Number Theory, and Algebraic Geometry. | ||
| - | * Philippe Gaborit (Université de Limoges) | + | * Jung Hee Cheon (Seoul National University, S. Korea) |
| - | * Daniel Bernstein (University of Illinois at Chicago) | + | * Jon-Lark Kim (Sogang University, S. Korea) |
| * Daniel Smith (University of Louisville) | * Daniel Smith (University of Louisville) | ||
| - | * Tanja Lange (Technische Universiteit Eindhoven) | + | * Kirill Morozov (Kyushu University, Japan) |
Revision as of 21:20, 9 February 2015
Post quantum cryptography has become so important because quantum computers would be built in the future and so many of our current cryptosystems based on the hardness of the problem of factorization of integers and discrete log problems would be broken.
There are three main areas in post quantum cryptography. These are codes based cryptography, lattices based cryptography, and polynomial based cryptography. We invited top researchers in each area and discuss current research with the connection of Coding Theory, Algebra, Number Theory, and Algebraic Geometry.
- Jung Hee Cheon (Seoul National University, S. Korea)
- Jon-Lark Kim (Sogang University, S. Korea)
- Daniel Smith (University of Louisville)
- Kirill Morozov (Kyushu University, Japan)
