dc.identifier.uri |
http://dx.doi.org/10.15488/17151 |
|
dc.identifier.uri |
https://www.repo.uni-hannover.de/handle/123456789/17279 |
|
dc.contributor.author |
Escher, Joachim
|
|
dc.contributor.author |
Matioc, Anca‐Voichita
|
|
dc.contributor.author |
Matioc, Bogdan‐Vasile
|
|
dc.date.accessioned |
2024-04-18T07:30:32Z |
|
dc.date.available |
2024-04-18T07:30:32Z |
|
dc.date.issued |
2024 |
|
dc.identifier.citation |
Escher, J.; Matioc, A.-V.; Matioc, B.-V.: The Mullins–Sekerka problem via the method of potentials. In: Mathematische Nachrichten 297 (2024), Nr. 5, S. 1960-1977. DOI: https://doi.org/10.1002/mana.202300350 |
|
dc.description.abstract |
It is shown that the two-dimensional Mullins–Sekerka problem is well-posed in all subcritical Sobolev spaces Hr (R) with r ϵ (3/2,2). This is the first result, where this issue is established in an unbounded geometry. The novelty of our approach is the use of the potential theory to formulate the model as an evolution problem with nonlinearities expressed by singular integral operators. |
eng |
dc.language.iso |
eng |
|
dc.publisher |
Weinheim : Wiley-VCH |
|
dc.relation.ispartofseries |
Mathematische Nachrichten (2024), online first |
|
dc.rights |
CC BY 4.0 Unported |
|
dc.rights.uri |
https://creativecommons.org/licenses/by/4.0 |
|
dc.subject |
Mullins–Sekerka |
eng |
dc.subject |
parabolic smoothing |
eng |
dc.subject |
singular integrals |
eng |
dc.subject |
well-posedness |
eng |
dc.subject.ddc |
510 | Mathematik
|
|
dc.title |
The Mullins–Sekerka problem via the method of potentials |
eng |
dc.type |
Article |
|
dc.type |
Text |
|
dc.relation.essn |
1522-2616 |
|
dc.relation.issn |
0025-584X |
|
dc.relation.doi |
https://doi.org/10.1002/mana.202300350 |
|
dc.bibliographicCitation.issue |
5 |
|
dc.bibliographicCitation.volume |
297 |
|
dc.bibliographicCitation.firstPage |
1960 |
|
dc.bibliographicCitation.lastPage |
1977 |
|
dc.description.version |
publishedVersion |
|
tib.accessRights |
frei zug�nglich |
|