• DocumentCode
    3624986
  • Title

    Boolean Functions of Low Polynomial Degree for Quantum Query Complexity Theory

  • Author

    Rusins Freivalds;Liva Garkaje

  • Author_Institution
    University of Latvia, Latvia
  • fYear
    2007
  • fDate
    5/1/2007 12:00:00 AM
  • Firstpage
    17
  • Lastpage
    17
  • Abstract
    The degree of a polynomial representing (or approximating) a function f is a lower bound for the quantum query complexity of f. This observation has been a source of many lower bounds on quantum algorithms. It has been an open problem whether this lower bound is tight. This is why Boolean functions are needed with a high number of essential variables and a low polynomial degree. Unfortunately, it is a well-known problem to construct such functions. The best separation between these two complexity measures of a Boolean function was exhibited by Ambai- nis [5]. He constructed functions with polynomial degree M and number of variables Omega(M2). We improve such a separation to become exponential. On the other hand, we use a computerized exhaustive search to prove tightness of this bound.
  • Keywords
    "Boolean functions","Polynomials","Quantum mechanics","Complexity theory","Quantum computing","Mathematics","Computer science","Search problems"
  • Publisher
    ieee
  • Conference_Titel
    Multiple-Valued Logic, 2007. ISMVL 2007. 37th International Symposium on
  • ISSN
    0195-623X
  • Print_ISBN
    0-7695-2831-7
  • Type

    conf

  • DOI
    10.1109/ISMVL.2007.11
  • Filename
    4215940