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Alice Silverberg
Researcher at University of California, Irvine
Publications - 124
Citations - 3876
Alice Silverberg is an academic researcher from University of California, Irvine. The author has contributed to research in topics: Abelian group & Elliptic curve. The author has an hindex of 28, co-authored 123 publications receiving 3705 citations. Previous affiliations of Alice Silverberg include University of California & Harvard University.
Papers
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Book ChapterDOI
Hierarchical ID-Based Cryptography
Craig Gentry,Alice Silverberg +1 more
TL;DR: In this article, the authors presented hierarchical identity-based encryption schemes and signature schemes that have total collusion resistance on an arbitrary number of levels and that have chosen ciphertext security in the random oracle model assuming the difficulty of the Bilinear Diffie-Hellman problem.
Posted Content
Applications of Multilinear Forms to Cryptography.
Dan Boneh,Alice Silverberg +1 more
TL;DR: The problem of finding efficiently computable non-degenerate multilinear maps from G1 to G2, where G1 and G2 are groups of the same prime order, and where computing discrete logarithms in G1 is hard is studied.
Book ChapterDOI
Supersingular Abelian Varieties in Cryptology
Karl Rubin,Alice Silverberg +1 more
TL;DR: In this paper, the security parameters of supersingular abelian varieties were investigated for identity-based encryption and short signature schemes, and they were shown to have security parameters that are neither too small nor too large.
Patent
Securing binding update using address based keys
TL;DR: In this paper, a system and method are disclosed for securing binding updates in a wireless telecommunications system, in which a public key is generated using a home address value of the mobile host, and a home agent, such as a router, generates a private key using public cryptographic parameters.
Journal ArticleDOI
Fields of definition for homomorphisms of abelian varieties
TL;DR: In this paper, the authors give results on when homomorphisms between abelian varieties are or are not defined over fields obtained from division points on the varieties, and they show that every element of Hom(A, B) is defined over L, L F is unramified at the discrete places of good reduction for A × B, and [L : F] divides H(d, e) where H(e) is a number given by an explicit formula and is less than 4(9d 2d(9e)2d( 9e)