• DocumentCode
    1632856
  • Title

    Pseudo-random generators and structure of complete degrees

  • Author

    Agrawal, Manindra

  • Author_Institution
    Dept. of Comput. Sci. & Eng., Indian Inst. of Technol., Kanpur, India
  • fYear
    2002
  • fDate
    6/24/1905 12:00:00 AM
  • Firstpage
    113
  • Lastpage
    121
  • Abstract
    It is shown that, if there exist sets in E (the exponential complexity class) that require 2Ω(n)-sized circuits, then sets that are hard for class P (the polynomial complexity class) and above, under 1-1 reductions, are also hard under 1-1 size-increasing reductions. Under the assumption of the hardness of solving the RSA (Rivest-Shamir-Adleman, 1978) problem or the discrete log problem, it is shown that sets that are hard for class NP (nondeterministic polynomial) and above, under many-1 reductions, are also hard under (non-uniform) 1-1 and size-increasing reductions
  • Keywords
    computational complexity; number theory; public key cryptography; random number generation; 1-1 reductions; NP complexity class; RSA problem; circuit size; complete degree structure; discrete log problem; exponential complexity class; hard sets; many-one reductions; polynomial complexity class; pseudo-random generators; size-increasing reductions; Circuits; Computational complexity; Cryptography; Polynomials;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Computational Complexity, 2002. Proceedings. 17th IEEE Annual Conference on
  • Conference_Location
    Montreal, Que.
  • ISSN
    1093-0159
  • Print_ISBN
    0-7695-1468-5
  • Type

    conf

  • DOI
    10.1109/CCC.2002.1004349
  • Filename
    1004349