A GENERALIZATION OF MULTIPLIER THEOREM TO THE BALL

Cited 0 time in webofscience Cited 0 time in scopus
  • Hit : 331
  • Download : 0
In this paper, we study the multipliers of A(q)p into L(p') when 0 < p' < p and when the domain is a ball in C(n). The case of disk with q = 1 was done by Luecking3. For this purpose, we study the conditions on the measure mu-satisfying A(q)p subset-of A(p') (d-mu). It turns out, as in the case of disk, that the quotient k(q) = mu/nu-q over hyperbolic ball of radius less than 1 belongs to L(q)p where 1/s + p'/p = 1.
Publisher
INDIAN NAT SCI ACAD
Issue Date
1991-07
Language
English
Article Type
Article
Keywords

BERGMAN SPACES; INTERPOLATION

Citation

INDIAN JOURNAL OF PURE APPLIED MATHEMATICS, v.22, no.7, pp.547 - 552

ISSN
0019-5588
URI
http://hdl.handle.net/10203/59329
Appears in Collection
MA-Journal Papers(저널논문)
Files in This Item
There are no files associated with this item.

qr_code

  • mendeley

    citeulike


rss_1.0 rss_2.0 atom_1.0