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Cramér–Wold theorem

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In mathematics, the Cramér–Wold theorem or the Cramér–Wold device is a theorem in measure theory and which states that a Borel probability measure on R k {\displaystyle \mathbb {R} ^{k}} is uniquely determined by the totality of its one-dimensional projections. It is used as a method for proving joint convergence results. The theorem is named after Harald Cramér and Herman Ole Andreas Wold, who published the result in 1936.

Let

X n = ( X n 1 , , X n k ) {\displaystyle {X}_{n}=(X_{n1},\dots ,X_{nk})}

and

X = ( X 1 , , X k ) {\displaystyle \;{X}=(X_{1},\dots ,X_{k})}

be random vectors of dimension k. Then X n {\displaystyle {X}_{n}} converges in distribution to X {\displaystyle {X}} if and only if:

i = 1 k t i X n i n D i = 1 k t i X i . {\displaystyle \sum _{i=1}^{k}t_{i}X_{ni}{\overset {D}{\underset {n\rightarrow \infty }{\rightarrow }}}\sum _{i=1}^{k}t_{i}X_{i}.}

for each ( t 1 , , t k ) R k {\displaystyle (t_{1},\dots ,t_{k})\in \mathbb {R} ^{k}} , that is, if every fixed linear combination of the coordinates of X n {\displaystyle {X}_{n}} converges in distribution to the correspondent linear combination of coordinates of X {\displaystyle {X}} .

If X n {\displaystyle {X}_{n}} takes values in R + k {\displaystyle \mathbb {R} _{+}^{k}} , then the statement is also true with ( t 1 , , t k ) R + k {\displaystyle (t_{1},\dots ,t_{k})\in \mathbb {R} _{+}^{k}} .

References

  1. Samanta, M. (1989-04-01). "Non-parametric estimation of conditional quantiles". Statistics & Probability Letters. 7 (5): 407–412. doi:10.1016/0167-7152(89)90095-3. ISSN 0167-7152.
  2. Cuesta-Albertos, Juan Antonio; Fraiman, Ricardo; Ransford, Thomas (2007). "A Sharp Form of the Cramér–Wold Theorem". Journal of Theoretical Probability. 20 (2): 201–209. doi:10.1007/s10959-007-0060-7. ISSN 0894-9840.
  3. Mueller, Jonas W; Jaakkola, Tommi (2015). "Principal Differences Analysis: Interpretable Characterization of Differences between Distributions". Advances in Neural Information Processing Systems. 28. Curran Associates, Inc.
  4. Berger, David; Lindner, Alexander (2022-05-01). "A Cramér–Wold device for infinite divisibility of Zd-valued distributions". Bernoulli. 28 (2). doi:10.3150/21-BEJ1386. ISSN 1350-7265.
  5. "Cramér-Wold theorem". planetmath.org.
  6. Billingsley, Patrick (1995). Probability and Measure (3 ed.). John Wiley & Sons. ISBN 978-0-471-00710-4.
  7. Bélisle, Claude; Massé, Jean-Claude; Ransford, Thomas (1997). "When is a probability measure determined by infinitely many projections?". The Annals of Probability. 25 (2). doi:10.1214/aop/1024404418. ISSN 0091-1798.
  8. Cramér, H.; Wold, H. (1936). "Some Theorems on Distribution Functions". Journal of the London Mathematical Society. s1-11 (4): 290–294. doi:10.1112/jlms/s1-11.4.290.
  9. Billingsley 1995, p. 383
  10. Kallenberg, Olav (2002). Foundations of modern probability (2nd ed.). New York: Springer. ISBN 0-387-94957-7. OCLC 46937587.
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