Carleman's condition

In mathematics, particularly, in analysis, Carleman's condition gives a sufficient condition for the determinacy of the moment problem. That is, if a measure $\mu$ satisfies Carleman's condition, there is no other measure $\nu$ having the same moments as $\mu .$ The condition was discovered by Torsten Carleman in 1922.^[1]

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Hamburger moment problem

For the Hamburger moment problem (the moment problem on the whole real line), the theorem states the following:

Let $\mu$ be a measure on $\mathbb {R}$ such that all the moments

m_{n}=\int _{-\infty }^{+\infty }x^{n}\,d\mu (x)~,\quad n=0,1,2,\cdots

are finite. If

\sum _{n=1}^{\infty }m_{2n}^{-{\frac {1}{2n}}}=+\infty ,

then the moment problem for

(m_{n})

is determinate; that is,

\mu

is the only measure on

\mathbb {R}

with

(m_{n})

as its sequence of moments.

Stieltjes moment problem

For the Stieltjes moment problem, the sufficient condition for determinacy is

\sum _{n=1}^{\infty }m_{n}^{-{\frac {1}{2n}}}=+\infty .

Notes

^ Akhiezer (1965)

References

Akhiezer, N. I. (1965). The Classical Moment Problem and Some Related Questions in Analysis. Oliver & Boyd.
Chapter 3.3, Durrett, Richard. Probability: Theory and Examples. 5th ed. Cambridge Series in Statistical and Probabilistic Mathematics 49. Cambridge ; New York, NY: Cambridge University Press, 2019.

This page was last edited on 22 October 2023, at 19:34

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