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
For ¥0.57 per day, unlimited downloads CREATE MEMBERSHIP Download

toTop

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

Turn on your phone and scan

home > search >

AN EXTENSION OF A THEOREM OF V. SVERAK TO VARIABLE EXPONENT SPACES

Author:
Baroncini, Carla  Fernandez Bonder, Julian  


Journal:
COMMUNICATIONS ON PURE AND APPLIED ANALYSIS


Issue Date:
2015


Abstract(summary):

In 1993, V. Sverak proved that if a sequence of uniformly bounded domains Omega(n) subset of R-2 such that Omega(n) -> Omega in the sense of the Hausdorff complementary topology, verify that the number of connected components of its complements are bounded, then the solutions of the Dirichlet problem for the Laplacian with source f is an element of L-2 (R-2) converges to the solution of the limit domain with same source. In this paper, we extend Sverak result to variable exponent spaces.


Page:
1987---2007


VIEW PDF

The preview is over

If you wish to continue, please create your membership or download this.

Create Membership

Similar Literature

Submit Feedback

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