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Existence of solutions to the (rot, div)-system in $L_p$-weighted spaces

Tom 37 / 2010

Wojciech M. Zajączkowski Applicationes Mathematicae 37 (2010), 127-142 MSC: Primary 35J55. DOI: 10.4064/am37-2-1

Streszczenie

The existence of solutions to the elliptic problem $\mathop{\rm rot} v=w$, $\mathop{\rm div} v=0$ in a bounded domain ${\mit\Omega}\subset\Bbb R^3$, $v\cdot\bar n|_S=0$, $S=\partial{\mit\Omega}$ in weighted $L_p$-Sobolev spaces is proved. It is assumed that an axis $L$ crosses $\mit\Omega$ and the weight is a negative power function of the distance to the axis. The main part of the proof is devoted to examining solutions of the problem in a neighbourhood of $L$. The existence in $\mit\Omega$ follows from the technique of regularization.

Autorzy

  • Wojciech M. ZajączkowskiInstitute of Mathematics
    Polish Academy of Sciences
    Śniadeckich 8
    00-956 Warszawa, Poland
    and
    Institute of Mathematics and Cryptology
    Cybernetics Faculty
    Military University of Technology
    Kaliskiego 2
    00-908 Warszawa, Poland
    e-mail

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