A stability result for \(p\)-harmonic systems with discontinuous coefficients
Electronic journal of differential equations, Tome 2001 (2001)
The present paper is concerned with p-harmonic systems
where $A(x)$ is a positive definite matrix whose entries have bounded mean oscillation (BMO), $p$ is a real number greater than 1 and $F\in L^{r\over {p-1}}$ is a given matrix field. We find a-priori estimates for a very weak solution of class $W^{1,r}$, provided $r$ is close to 2, depending on the BMO norm of $\sqrt{A}$, and $p$ close to $r$. This result is achieved using the corresponding existence and uniqueness result for linear systems with BMO coefficients [St], combined with nonlinear commutators.
| $ \mathop{\rm div} (\langle A(x) Du(x), Du(x) \rangle ^{{p-2}\over 2} A(x) Du(x))=\mathop{\rm div} ( \sqrt{A(x)} F(x)),$ |
Classification :
35J60, 47B47
Keywords: bounded mean oscillation, linear and nonlinear commutators, Hodge decomposition
Keywords: bounded mean oscillation, linear and nonlinear commutators, Hodge decomposition
@article{EJDE_2001__2001__a5,
author = {Stroffolini, Bianca},
title = {A stability result for \(p\)-harmonic systems with discontinuous coefficients},
journal = {Electronic journal of differential equations},
year = {2001},
volume = {2001},
zbl = {0965.35044},
language = {en},
url = {http://geodesic.mathdoc.fr/item/EJDE_2001__2001__a5/}
}
Stroffolini, Bianca. A stability result for \(p\)-harmonic systems with discontinuous coefficients. Electronic journal of differential equations, Tome 2001 (2001). http://geodesic.mathdoc.fr/item/EJDE_2001__2001__a5/