Mean and almost everywhere convergence of Fourier-Neumann series

  1. Ciaurri, O. 1
  2. Guadalupe, J.J. 1
  3. Pérez, M. 2
  4. Varona, J.L. 1
  1. 1 Universidad de La Rioja
    info

    Universidad de La Rioja

    Logroño, España

    ROR https://ror.org/0553yr311

  2. 2 Universidad de Zaragoza
    info

    Universidad de Zaragoza

    Zaragoza, España

    ROR https://ror.org/012a91z28

Aldizkaria:
Journal of Mathematical Analysis and Applications

ISSN: 0022-247X

Argitalpen urtea: 1999

Alea: 236

Zenbakia: 1

Orrialdeak: 125-147

Mota: Artikulua

DOI: 10.1006/JMAA.1999.6442 SCOPUS: 2-s2.0-0000995361 WoS: WOS:000081963000008 GOOGLE SCHOLAR lock_openSarbide irekia editor

Beste argitalpen batzuk: Journal of Mathematical Analysis and Applications

Gordailu instituzionala: lock_openSarbide irekia Editor lock_openSarbide irekia Postprint

Laburpena

Let Jμ denote the Bessel function of order μ. The functions x-α/2-β/2-1/2Jα+β+2n+1(x 1/2), n=0,1,2,..., form an orthogonal system in L2((0,∞),xα+βdx) when α+β-1. In this paper we analyze the range of p, α, and β for which the Fourier series with respect to this system converges in the Lp((0,∞),xαdx)-norm. Also, we describe the space in which the span of the system is dense and we show some of its properties. Finally, we study the almost everywhere convergence of the Fourier series for functions in such spaces. © 1999 Academic Press.