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Solvability in the sense of sequences for some fourth order non-Fredholm operators.
J. Differ. Equations 271, 280-300 (2021)
We study solvability of some linear nonhomogeneous elliptic problems and establish that under reasonable technical conditions the convergence in L2(Rd) of their right sides implies the existence and the convergence in H4(Rd) of the solutions. The problems contain the squares of the sums of second order non-Fredholm differential operators and we use the methods of the spectral and scattering theory for Schrödinger type operators. We especially emphasize that here we deal with the fourth order operators in contrast to the second order operators in [29] and investigate the dependence of the solvability conditions on the dimension of our problem when the constant a=0. We also consider the case of solvability with a single potential in an arbitrary dimension.
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Publikationstyp
Artikel: Journalartikel
Dokumenttyp
Wissenschaftlicher Artikel
Schlagwörter
Non-fredholm Operators ; Sobolev Spaces ; Solvability Conditions
ISSN (print) / ISBN
0022-0396
e-ISSN
1090-2732
Zeitschrift
Journal of Differential Equations
Quellenangaben
Band: 271,
Seiten: 280-300
Verlag
Elsevier
Verlagsort
525 B St, Ste 1900, San Diego, Ca 92101-4495 Usa
Nichtpatentliteratur
Publikationen
Begutachtungsstatus
Peer reviewed
Institut(e)
Institute of Computational Biology (ICB)
Förderungen
NSERC