Creat membership Creat membership
Sign in

Forgot password?

Confirm
  • Forgot password?
    Sign Up
  • Confirm
    Sign In
Creat membership Creat membership
Sign in

Forgot password?

Confirm
  • Forgot password?
    Sign Up
  • Confirm
    Sign In
Collection

toTop

If you have any feedback, Please follow the official account to submit feedback.

Turn on your phone and scan

home > search >

A Note on Campanato Spaces and Their Applications

Author:
Wang, D. H.  Zhou, J.  Teng, Z. D.  


Journal:
MATHEMATICAL NOTES


Issue Date:
2018


Abstract(summary):

In this paper, we obtain a version of the John-Nirenberg inequality suitable for Campanato spaces C (p,beta) with 0 < p < 1 and show that the spaces C (p,beta) are independent of the scale p a (0,a) in sense of norm when 0 < beta < 1. As an application, we characterize these spaces by the boundedness of the commutators [b,B (alpha) ] (j) (j =3D 1, 2) generated by bilinear fractional integral operators B (alpha) and the symbol b acting from L (p1) x L (p2) to L (q) for p1, p2 a (1,a), q a (0,a) and 1/q =3D 1/p1 + 1/p2 - (alpha + beta)/n.


Page:
483---489


Similar Literature

Submit Feedback

This function is a member function, members do not limit the number of downloads