IDEAS home Printed from https://ideas.repec.org/h/spr/sprchp/978-3-642-61810-9_20.html
   My bibliography  Save this book chapter

Ein Kriterium für den positiv definiten Charakter von Fourierintegralen und die Darstellung solcher als Summe von Quadraten

In: Festschrift

Author

Listed:
  • F. Bernstein

Abstract

Zusammenfassung Gestattet eine für alle reellen Argumente reguläre Funktion β(x) eine beständig konvergente Entwicklung der Form $$\beta (x + y) = \sum\limits_{\mu = 0}^\infty {\frac{{{\beta _\mu }(x){\beta _\mu }(y)}}{{{\lambda _\mu }}}} $$ wo die gleichfalls für alle reellen x regulären Funktionen β μ (x) durch konvergente Reihen der Form $${\beta _\mu }(x)={x^\mu}(1+{\alpha _{\mu 1}}x + {\alpha _{\mu 2}}{x^2} + \ldots){\text{}}(\mu=0,1,2, \ldots )$$ in der Umgebung der Stelle x = 0 definiert sind, so läßt sich leicht zeigen, daß die Entwicklung nur eindeutig möglich ist. Es ist nämlich, wenn für n = 0 der Ausdruck $$\mathop \sum \limits_{\mu = 0}^{n - 1} $$ Null bedeutet: $$\beta (x + y) - \sum\limits_{\mu = 0}^{n - 1} {\frac{{{\beta _\mu }(x){\beta _\mu }(y)}}{{{\lambda _\mu }}}} = \frac{{{\beta _n}(x)}}{{{\lambda _n}}}{y^n}(1 + {\alpha _{n1}}y + \ldots ) + {x^{n + 1}}{y^{n + 1}}(\frac{1}{{{\lambda _{n + 1}}}} + \ldots )$$ $$\frac{{\beta (x + y) - \sum\limits_{\mu = 0}^{n - 1} {\frac{{{\beta _\mu }(x){\beta _\mu }(y)}}{{{\lambda _\mu }}}} }}{{{y^n}}} = \frac{{{\beta _\mu }(x)}}{{{\lambda _\mu }}}(1 + {\alpha _{n1}}y + \ldots ) + {x^{n + 1}}y(\frac{1}{{{\lambda _n} + 1}} + \ldots )$$ also $$\mathop {\lim }\limits_{y = 0} \frac{{\beta (x + y) - \sum\limits_{\mu = 0}^{n - 1} {\frac{{{\beta _\mu }(x){\beta _\mu }(y)}}{{{\lambda _\mu }}}} }}{{{y^n}}} = \frac{{{\beta _n}(x)}}{{{\lambda _n}}}$$

Suggested Citation

  • F. Bernstein, 1982. "Ein Kriterium für den positiv definiten Charakter von Fourierintegralen und die Darstellung solcher als Summe von Quadraten," Springer Books, in: Festschrift, pages 155-159, Springer.
    • Handle: RePEc:spr:sprchp:978-3-642-61810-9_20
    DOI: 10.1007/978-3-642-61810-9_20
    as

    Download full text from publisher

    To our knowledge, this item is not available for download. To find whether it is available, there are three options:
    1. Check below whether another version of this item is available online.
    2. Check on the provider's web page whether it is in fact available.
    3. Perform a
    for a similarly titled item that would be available.

    More about this item

    Statistics

    Access and download statistics

    Corrections

    All material on this site has been provided by the respective publishers and authors. You can help correct errors and omissions. When requesting a correction, please mention this item's handle: RePEc:spr:sprchp:978-3-642-61810-9_20. See general information about how to correct material in RePEc.

    If you have authored this item and are not yet registered with RePEc, we encourage you to do it here. This allows to link your profile to this item. It also allows you to accept potential citations to this item that we are uncertain about.

    We have no bibliographic references for this item. You can help adding them by using this form .

    If you know of missing items citing this one, you can help us creating those links by adding the relevant references in the same way as above, for each refering item. If you are a registered author of this item, you may also want to check the "citations" tab in your RePEc Author Service profile, as there may be some citations waiting for confirmation.

    For technical questions regarding this item, or to correct its authors, title, abstract, bibliographic or download information, contact: Sonal Shukla or Springer Nature Abstracting and Indexing (email available below). General contact details of provider: http://www.springer.com .

    Please note that corrections may take a couple of weeks to filter through the various RePEc services.

    IDEAS is a RePEc service. RePEc uses bibliographic data supplied by the respective publishers.