dc.contributor.author | Milakis, E. | en |
dc.creator | Milakis, E. | en |
dc.date.accessioned | 2019-12-02T10:37:02Z | |
dc.date.available | 2019-12-02T10:37:02Z | |
dc.date.issued | 2005 | |
dc.identifier.uri | http://gnosis.library.ucy.ac.cy/handle/7/57305 | |
dc.description.abstract | In this paper we study an extension of a regularity theory presented by I. Athanasopoulos, L. Caffarelli and S. Salsa in [3], [4], to some fully nonlinear parabolic equations of second order. We investigate a two-phase free boundary problem in which a fully nonlinear parabolic equation is verified by the solution in the positive and the negative domain. We prove that the solution is Lipschitz up to the Lipschitz free boundary and that Lipschitz free boundaries are C1. | en |
dc.source | Indiana University Mathematics Journal | en |
dc.source.uri | https://www.scopus.com/inward/record.uri?eid=2-s2.0-31644447817&partnerID=40&md5=6c497d5f876d2d9315253bfacef3422a | |
dc.subject | Free boundary problems | en |
dc.subject | Fully nonlinear equations | en |
dc.subject | Non-cylindrical domains | en |
dc.title | Two-phase transition problems for fully nonlinear parabolic equations of second order | en |
dc.type | info:eu-repo/semantics/article | |
dc.description.volume | 54 | |
dc.description.issue | 6 | |
dc.description.startingpage | 1751 | |
dc.description.endingpage | 1768 | |
dc.author.faculty | Σχολή Θετικών και Εφαρμοσμένων Επιστημών / Faculty of Pure and Applied Sciences | |
dc.author.department | Τμήμα Μαθηματικών και Στατιστικής / Department of Mathematics and Statistics | |
dc.type.uhtype | Article | en |
dc.description.notes | <p>Cited By :1</p> | en |
dc.source.abbreviation | Indiana Univ.Math.J. | en |
dc.contributor.orcid | Milakis, E. [0000-0001-8538-1129] | |
dc.gnosis.orcid | 0000-0001-8538-1129 | |