Efficient generation of shared RSA keys.
We describe efficient techniques for a number of parties to jointly generate an RSA key. At the end of the protocol an RSA modulus N = pq is publicly known. None of the parties know the factorization of N. In addition a public encryption exponent is publicly known and each party holds a share of the...
| Publikašuvnnas: | Journal of the ACM 48, 4 (2001). |
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| Váldodahkki: | |
| Materiálatiipa: | Artihkal |
| Giella: | eaŋgalasgiella |
| Fáttát: |