• DocumentCode
    2914037
  • Title

    Witnesses for non-satisfiability of dense random 3CNF formulas

  • Author

    Feige, Uriel ; Kim, Jeong Han ; Ofek, Eran

  • fYear
    2006
  • fDate
    Oct. 2006
  • Firstpage
    497
  • Lastpage
    508
  • Abstract
    We consider random 3CNF formulas with n variables and m clauses. It is well known that when m > cn (for a sufficiently large constant c), most formulas are not satisfiable. However, it is not known whether such formulas are likely to have polynomial size witnesses that certify that they are not satisfiable. A value of m sime n3/2 was the forefront of our knowledge in this respect. When m > cn3/2 , such witnesses are known to exist, based on spectral techniques. When m < n3/2-epsi, it is known that resolution (which is a common approach for refutation) cannot produce witnesses of size smaller than 2nepsiv. Likewise, it is known that certain variants of the spectral techniques do not work in this range. In the current paper we show that when m > cn7/5, almost all 3CNF formulas have polynomial size witnesses for non-satisfiability. We also show that such a witness can be found in time 2(O(n0.2 log n)), whenever it exists. Our approach is based on an extension of the known spectral techniques, and involves analyzing a certain fractional packing problem for random 3-uniform hypergraphs
  • Keywords
    computability; computational complexity; graph theory; random processes; dense random 3CNF formulas; fractional packing problem; nonsatisfiability; polynomial size witnesses; random 3-uniform hypergraphs; spectral techniques; Algorithm design and analysis; Computer science; Eigenvalues and eigenfunctions; NP-complete problem; Polynomials;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Foundations of Computer Science, 2006. FOCS '06. 47th Annual IEEE Symposium on
  • Conference_Location
    Berkeley, CA
  • ISSN
    0272-5428
  • Print_ISBN
    0-7695-2720-5
  • Type

    conf

  • DOI
    10.1109/FOCS.2006.78
  • Filename
    4031385