An important and useful characterization of the Weibull distribution is its lack of memory (of order a) property, i.e., P (X ≥ a√(xa + ya)|X ≥ y ) = P(X ≥ x) for all x, y ≥ 0. The technique commonly employed in proving this characterization is the well-known Cauchy functional equation φ(a√(xa + ya)) = φ(x)φ(y). The stability estimation in this characterization of the Weibull distribution is analysied.
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