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Chapter I - Elliptic Curve Based Protocols
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- By N.P. Smart
- Edited by Ian F. Blake, University of Toronto, Gadiel Seroussi, Hewlett-Packard Laboratories, Palo Alto, California, Nigel P. Smart, Hewlett-Packard Laboratories, Bristol
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- Book:
- Advances in Elliptic Curve Cryptography
- Published online:
- 20 August 2009
- Print publication:
- 25 April 2005, pp 3-20
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- Chapter
- Export citation
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Summary
Introduction
In this chapter we consider the various cryptographic protocols in which elliptic curves are primarily used. We present these in greater detail than in the book [ECC] and focus on their cryptographic properties. We shall only focus on three areas: signatures, encryption and key agreement. For each of these areas we present the most important protocols, as defined by various standard bodies.
The standardization of cryptographic protocols, and elliptic curve protocols in particular, has come a long way in the last few years. Standardization is important if one wishes to deploy systems on a large scale, since different users may have different hardware/software combinations. Working to a well-defined standard for any technology aids interoperability and so should aid the takeup of the technology.
In the context of elliptic curve cryptography, standards are defined so that one knows not only the precise workings of each algorithm, but also the the format of the transmitted data. For example, a standard answers such questions as
In what format are finite field elements and elliptic curve points to be transmitted?
How are public keys to be formatted before being signed in a certificate?
How are conversions going to be performed between arbitrary bit strings to elements of finite fields, or from finite field elements to integers, and vice versa?
How are options such as the use of point compression, (see [ECC, Chapter VI]) or the choice of curve to be signalled to the user?
A number of standardization efforts have taken place, and many of these reduce the choices available to an implementor by recommending or mandating certain parameters, such as specific curves and/or specific finite fields.