Skip to main content
Springer Nature Link
Log in

Riesz means and self-neglecting functions

  • Published:
Mathematische Zeitschrift Aims and scope Submit manuscript

This is a preview of subscription content, log in via an institution to check access.

Access this article

Log in via an institution

Subscribe and save

Springer+ Basic
$34.99 /Month
  • Get 10 units per month
  • Download Article/Chapter or eBook
  • 1 Unit = 1 Article or 1 Chapter
  • Cancel anytime
Subscribe now

Buy Now

Price excludes VAT (USA)
Tax calculation will be finalised during checkout.

Instant access to the full article PDF.

Institutional subscriptions

References

  1. Asmussen, S., Kurtz, T.G.: Necessary and sufficient conditions for complete convergence in the law of large numbers Ann. Probab.8, 176–182 (1980)

    Google Scholar 

  2. Bartoszyński, R., Puri, P.S.: On the rate of convergence for the weak law of large numbers. Probab. Math. Statist.5, 91–97 (1985)

    Google Scholar 

  3. Baum, L.E., Katz, M., Read, R.: Exponential convergence rates for the law of large numbers. Trans. Am. Math. Soc.102, 187–199 (1962)

    Google Scholar 

  4. Bingham, N.H.: Tauberian theorems and the central limit theorem. Ann. Probab.9, 221–231 (1981)

    Google Scholar 

  5. Bingham, N.H.: On Euler and Borel summability. J. Lond. Math. Soc. (2)29, 141–146 (1984)

    Google Scholar 

  6. Bingham, N.H.: On Valiron and circle convergence. Math. Z.186, 273–286 (1984)

    Google Scholar 

  7. Bingham, N.H.: Extensions of the strong law. Analytic and Geometric Stochastics: Adv. Appl. Probab. Supplement (1986), 27–36

  8. Bingham, N.H., Goldie, C.M.: Extensions of regular variation. I: Uniformity and quantifiers. II: Representations and indices. Proc. Lond. Math. Soc. (3)44, 472–496, 497–534 (1982)

    Google Scholar 

  9. Bingham, N.H., Goldie, C.M.: On one-sided Tauberian conditions. Analysis3, 159–188 (1983)

    Google Scholar 

  10. Bingham, N.H., Goldie, C.M., Teugels, J.L.: Regular variation. Encycl. Math. Appl.27. Cambridge Univ. Press 1987

  11. Bingham, N.H., Tenenbaum, G.: Riesz and Valiron means and fractional moments. Math. Proc. Cambridge Phil. Soc.99, 143–149 (1986)

    Google Scholar 

  12. Bloom, S.: A characterisation ofB-slowly varying functions. Proc. Am. Math. Soc.54, 243–250 (1976)

    Google Scholar 

  13. Chandrasekharan, M., Minakshisundaram, S.: Typical means. Oxford Univ. Press 1952

  14. Chow, Y.S.: Delayed sums and Borel summability of independent identically distributed random variables. Bull. Inst. Math. Acad. Sinica1, 207–220 (1973)

    Google Scholar 

  15. Chow, Y.S., Teicher, H.: Probability theory: independence, interchangeability and martingales. Berlin Heidelberg New York: Springer 1978

    Google Scholar 

  16. Csörgő, M., Révész, P.: Strong approximations in probability and statistics. New York: Academic Press 1981

    Google Scholar 

  17. Erdős, P., Rényi, A.: On a new law of large numbers. J. Anal. Math.23, 103–111 (1970)

    Google Scholar 

  18. Gafurov, M.U.: On the estimate of the rates of convergence in the law of the iterated logarithm. Probability and Mathematical Statistics (Proc. 4th Japan-USSR Symp., Tbilisi 1982), 137–144. Lecture Notes in Math. 1021. Berlin Heidelberg New York: Springer 1983

    Google Scholar 

  19. Haan, L. de: On regular variation and its application to the weak convergence of sample extremes. Math. Cent. Tracts32 (1970)

  20. Hardy, G.H.: Divergent series. Oxford: University Press 1949

    Google Scholar 

  21. Hardy, G.H., Riesz, M.: The general theory of Dirichlet series. Cambridge: University Press 1952

    Google Scholar 

  22. Heathcote, C.R.: Complete exponential convergence and some related topics. J. Appl. Probab.4, 217–256 (1967)

    Google Scholar 

  23. Jain, N.C.: Tail probabilities of sums of independent Banach space valued random variables. Z. Wahrscheinlichkeitsther. Verw. Geb.33, 155–166 (1975)

    Google Scholar 

  24. Jurkat, W.B..: Über Rieszsche Mittel mit unstetigem Parameter. Math. Z.55, 8–12 (1951)

    Google Scholar 

  25. Kurtz, T.G.: Inequalities for the law of large numbers. Ann. Math. Statist.43, 1874–1883 (1972)

    Google Scholar 

  26. Kuttner, B.: Note on the ‘second consistency theorem’ for Riesz summability. I, II. J. Lond. Math. Soc.26, 104–111 (1951),27, 207–217 (1952)

    Google Scholar 

  27. Lai, T.L.: Limit theorems for delayed sums. Ann. Probab.2, 432–446 (1974)

    Google Scholar 

  28. Moh, T.T.: On a general Tauberian theorem. Proc. Am. Math. Soc.36, 167–172 (1972)

    Google Scholar 

  29. Peterson, G.E.: Tauberian theorems for integrals II. J. Lond. Math. Soc. (2)5, 182–190 (1972)

    Google Scholar 

  30. Seneta, E.: Regularly varying functions. Lecture Notes in Math 508. Berlin Heidelberg New York: Springer 1976

    Google Scholar 

  31. Skovoroda, B.F.: Convergence rates in the law of large numbers in Banach spaces. Soviet Math. (Iz. VUZ)26, 74–78 (1982)

    Google Scholar 

  32. Steinebach, J.: Between invariance principles and Erdős-Rényi laws. Colloq. Math. Soc. János Bolyai36, 981–1005 (1982)

    Google Scholar 

  33. Steinebach, J.: Improved Erdős-Rényi and strong approximation laws for increments of renewal processes. Ann. Probab.14, 547–559 (1986)

    Google Scholar 

  34. Tenenbaum, G.: Sur le procédé de sommation de Borel et la répartition du nombre de facteurs premiers des entiers. Enseign. Math.26, 225–245 (1980)

    Google Scholar 

  35. Woyczyński, W.A.: Tail probabilities of sums of random vectors in Banach spaces, and related mixed norms, Measure Theory (Proc. Conf. Oberwolfach 1979), ed. D. Kolzöw, 455–469. Lecture Notes in Math. 794. Berlin Heidelberg New York: Springer 1980

    Google Scholar 

  36. Gafurov, M.U., Slastnikov, A.D.: Some problems of the exit of a random walk beyond a curvilinear boundary and large deviations. Theory Probab. Appl.32, 299–321 (1987)

    Google Scholar 

  37. Gut, A.: On complete convergence in the law of large numbers for subsequences. Ann. Probab.13, 1286–1291 (1985)

    Google Scholar 

Download references

Author information

Authors and Affiliations

  1. Mathematics Department Royal Holloway and Bedford New College, University of London, Egham Hill, TW20 OEX, Egham, Surrey, England

    Nicholas H. Bingham

  2. Mathematics Division, University of Sussex, Falmer, BN1 9QH, Brighton, Sussex, England

    Charles M. Goldie

Authors
  1. Nicholas H. Bingham
    View author publications

    You can also search for this author in PubMed Google Scholar

  2. Charles M. Goldie
    View author publications

    You can also search for this author in PubMed Google Scholar

Additional information

To Werner Meyer-König on his 75th birthday, May 26, 1987

Rights and permissions

Reprints and permissions

About this article

Cite this article

Bingham, N.H., Goldie, C.M. Riesz means and self-neglecting functions. Math Z 199, 443–454 (1988). https://doi.org/10.1007/BF01159790

Download citation

  • Received:

  • Issue Date:

  • DOI: https://doi.org/10.1007/BF01159790

Search

Navigation