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1 results

  • Structure functions with finite minimal vector sets

  • Laurence A. Baxter, Seung Min Lee
  • Journal:
    Journal of Applied Probability / Volume 26 / Issue 1 / March 1989
    Published online by Cambridge University Press:
    14 July 2016, pp. 196-201
    Print publication:
    March 1989

  • A continuum structure function (CSF) y is a non-decreasing mapping from the unit hypercube to the unit interval. Define whereas γ (γ) < α for all y < x}, the set of minimal vectors to level α. This paper examines CSFs for which each Pα is finite. It is shown that if γ is such a CSF and X is a vector of independent random variables, the distribution of γ (X) is readily calculated. Further, if γ is an arbitrary right-continuous CSF, the distribution of γ (X) may be approximated arbitrarily closely by that of γ′(X) where γ′ is a right-continuous CSF for which each minimal vector set is finite.