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Paper: How to Split a Shared Secret into Shared Bits in Constant-Round

Authors:
Ivan Damgård
Matthias Fitzi
Jesper Buus Nielsen
Tomas Toft
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URL: http://eprint.iacr.org/2005/140
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Abstract: We show that if a set of players hold shares of a value $a\in Z_p$ for some prime $p$ (where the set of shares is written $[a]_p$), it is possible to compute, in constant round and with unconditional security, sharings of the bits of $a$, i.e.~compute sharings $[a_0]_p, \ldots, [a_{l-1}]_p$ such that $l = \lceil \log_2(p) \rceil$, $a_0, \ldots, a_{l-1} \in \{0,1\}$ and $a = \sum_{i=0}^{l-1} a_i 2^i$. Our protocol is secure against active adversaries and works for any linear secret sharing scheme with a multiplication protocol. This result immediately implies solutions to other long-standing open problems, such as constant-round and unconditionally secure protocols for comparing shared numbers and deciding whether a shared number is zero. The complexity of our protocol is $O(l \log(l))$ invocations of the multiplication protocol for the underlying secret sharing scheme, carried out in $O(1)$.
BibTeX
@misc{eprint-2005-12476,
  title={How to Split a Shared Secret into Shared Bits in Constant-Round},
  booktitle={IACR Eprint archive},
  keywords={cryptographic protocols / secret sharing, unconditional security},
  url={http://eprint.iacr.org/2005/140},
  note={ buus@daimi.au.dk 12957 received 13 May 2005, last revised 23 Jun 2005},
  author={Ivan Damgård and Matthias Fitzi and Jesper Buus Nielsen and Tomas Toft},
  year=2005
}