Skip to main content
SpringerLink
Log in

On central multipliers for compact Lie groups

  • Published:
Archiv der Mathematik 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

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

Instant access to the full article PDF.

Institutional subscriptions

References

  1. A. Bonami etJ. L. Clerc, Sommes de Cesaro et multiplicateurs des developpements en harmoniques spheriques. Trans. Amer. Math. Soc.183, 423–463 (1973).

    Google Scholar 

  2. R. Coifman andC. Fefferman, Weighted norm inequalities for maximal functions and singular integral operators. Studia Math.51, 241–250 (1974).

    Google Scholar 

  3. R. Coifman andG. Weiss, Central multiplier theorems for compact Lie groups. Bull. Amer. Math. Soc.80, 124–126 (1974).

    Google Scholar 

  4. L. Colzani, S. Giulini andG. Travaglini, Sharp results for the mean summability of Fourier series on compact Lie groups. Math. Ann.285, 75–84 (1989).

    Google Scholar 

  5. B.Dreseler, Lebesgue constants for certain partial sums of Fourier series on compact Lie groups. In: Linear spaces and approximation (P. L. Butzer and B. Sz-Nagy, Eds), Basel 1978.

  6. P.Eymard, AlgébresA p et convoloteurs deL p. Sém. Bourbaki367, 1969.

  7. C. Fefferman, The multiplier problem for the ball. Ann. Math. (2)94, 330–336 (1971).

    Google Scholar 

  8. S. Giulini, Cohen type inequalities and divergence of Fourier series on compact Lie groups. Boll. Un. Mat. Ital. (6)3-B, 75–85 (1984).

    Google Scholar 

  9. R. Hunt, B. Muckenhoupt andR. Wheeden, Weighted norm inequalities for the conjugate function and the Hilbert transform. Trans. Amer. Math. Soc.176, 227–251 (1973).

    Google Scholar 

  10. D. Kurtz, Littlewood-Paley and multiplier theorems on WeightedL p spaces. Trans. Amer. Math. Soc.259, 235–254 (1980).

    Google Scholar 

  11. J. Marcinkiewicz, Sur les multiplicateurs dés series de Fourier. Studia Math.8, 78–91 (1939).

    Google Scholar 

  12. C. Meaney, Radial functions and invariant convolution operators. Trans. Amer. Math. Soc.266, 665–674 (1984).

    Google Scholar 

  13. B. Muckenhoupt, Weighted norm inequalities for the Hardy maximal function. Trans Amer. Math. Soc.165, 207–226 (1972).

    Google Scholar 

  14. R. J. Stanton, On mean convergence of Fourier series on compact Lie groups. Trans. Amer. Math. Soc.218, 61–87 (1976).

    Google Scholar 

  15. R. J. Stanton andP. Tomas, Polyhedral summability of Fourier series on compact Lie groups. Amer. J. Math.100, 477–493 (1978).

    Google Scholar 

  16. E. M.Stein and G.Weiss, Introduction to Fourier Analysis on Euclidean Spaces. Princeton 1971.

  17. G. Travaglini, Weyl functions and theA p condition on compact Lie groups. J. Austr. Math. Soc. (Ser. A)33, 185–192 (1982).

    Google Scholar 

  18. V. S.Varadarajan, Lie groups, Lie algebras and their representations. Englewood Cliffs 1974.

  19. N. Weiss,L p estimates for bi-invariant operators on compact Lie groups. Amer. J. Math.94, 103–118 (1972).

    Google Scholar 

Download references

Author information

Author notes

  1. Giancarlo Travaglini

    Present address: Dipartimento Di Matematica “Federigo Enriques”, Università di Milano, Via C. Saldini, 50, 20133, Milano, Italia

Authors and Affiliations

    Authors
    1. Giancarlo Travaglini
      View author publications

      You can also search for this author in PubMed Google Scholar

    Rights and permissions

    Reprints and permissions

    About this article

    Cite this article

    Travaglini, G. On central multipliers for compact Lie groups. Arch. Math 55, 394–399 (1990). https://doi.org/10.1007/BF01198480

    Download citation

    • Received:

    • Issue Date:

    • DOI: https://doi.org/10.1007/BF01198480

    Keywords

    Search

    Navigation