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Silverman–Toeplitz theorem

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In mathematics, the Silverman–Toeplitz theorem, first proved by Otto Toeplitz, is a result in series summability theory characterizing matrix summability methods that are regular. A regular matrix summability method is a linear sequence transformation that preserves the limits of convergent sequences.[1] The linear sequence transformation can be applied to the divergent sequences of partial sums of divergent series to give those series generalized sums.

An infinite matrix with complex-valued entries defines a regular matrix summability method if and only if it satisfies all of the following properties:

An example is Cesàro summation, a matrix summability method with

Formal statement

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Let the aforementioned inifinite matrix of complex elements satisfy the following conditions:

  1. for every fixed .
  2. ;

and be a sequence of complex numbers that converges to . We denote as the weighted sum sequence: .

Then the following results hold:

  1. If , then .
  2. If and , then .[2]

Proof

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Proving 1.

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For the fixed the complex sequences , and approach zero if and only if the real-values sequences , and approach zero respectively. We also introduce .

Since , for prematurely chosen there exists , so for every we have . Next, for some it's true, that for every and . Therefore, for every

which means, that both sequences and converge zero.[3]

Proving 2.

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. Applying the already proven statement yields . Finally,

, which completes the proof.

References

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Citations

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  1. ^ Silverman–Toeplitz theorem, by Ruder, Brian, Published 1966, Call number LD2668 .R4 1966 R915, Publisher Kansas State University, Internet Archive
  2. ^ Linero, Antonio; Rosalsky, Andrew (2013-07-01). "On the Toeplitz Lemma, Convergence in Probability, and Mean Convergence" (PDF). Stochastic Analysis and Applications. 31 (4): 684–694. doi:10.1080/07362994.2013.799406. ISSN 0736-2994. Retrieved 2024-11-17.
  3. ^ Ljashko, Ivan Ivanovich; Bojarchuk, Alexey Klimetjevich; Gaj, Jakov Gavrilovich; Golovach, Grigory Petrovich (2001). Математический анализ: введение в анализ, производная, интеграл. Справочное пособие по высшей математике [Mathematical analysis: the introduction into analysis, derivatives, integrals. The handbook to mathematical analysis.] (in Russian). Vol. 1 (1st ed.). Moskva: Editorial URSS. p. 58. ISBN 978-5-354-00018-0.

Further reading

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