“Helly–Bray theorem”的意思、由来-开放百科全书

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Helly–Bray theorem

释义

References

In probability theory, the Helly–Bray theorem relates the weak convergence of cumulative distribution functions to the convergence of expectations of certain measurable functions. It is named after Eduard Helly and Hubert Evelyn Bray.

Let F and F₁, F₂, ... be cumulative distribution functions on the real line. The Helly–Bray theorem states that if F_n converges weakly to F, then

for each bounded, continuous function g: R → R, where the integrals involved are Riemann–Stieltjes integrals.

Note that if X and X₁, X₂, ... are random variables corresponding to these distribution functions, then the Helly–Bray theorem does not imply that E(X_n) → E(X), since g(x) = x is not a bounded function.

In fact, a stronger and more general theorem holds. Let P and P₁, P₂, ... be probability measures on some set S. Then P_n converges weakly to P if and only if

for all bounded, continuous and real-valued functions on S. (The integrals in this version of the theorem are Lebesgue–Stieltjes integrals.)

The more general theorem above is sometimes taken as defining weak convergence of measures (see Billingsley, 1999, p. 3).

References

{{cite book | author=Patrick Billingsley |authorlink=Patrick Billingsley| title=Convergence of Probability Measures, 2nd ed. | publisher=John Wiley & Sons, New York| year=1999 | isbn=0-471-19745-9}}

1 : Probability theorems

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