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dc.contributor.authorBogdan, Raiţă-
dc.contributor.authorAngkana, Rüland-
dc.contributor.authorCamillo, Tissot-
dc.date.accessioned2023-04-06T04:16:29Z-
dc.date.available2023-04-06T04:16:29Z-
dc.date.issued2023-
dc.identifier.urihttps://link.springer.com/article/10.1007/s10440-023-00557-7-
dc.identifier.urihttps://dlib.phenikaa-uni.edu.vn/handle/PNK/7632-
dc.descriptionCC BYvi
dc.description.abstractIn this article we study quantitative rigidity properties for the compatible and incompatible two-state problems for suitable classes of A-free differential inclusions and for a singularly perturbed T3 structure for the divergence operator. In particular, in the compatible setting of the two-state problem we prove that all homogeneous, first order, linear operators with affine boundary data which enforce oscillations yield the typical ϵ23-lower scaling bounds. As observed in Chan and Conti (Math. Models Methods Appl. Sci. 25(06):1091–1124, 2015) for higher order operators this may no longer be the case. Revisiting the example from Chan and Contivi
dc.language.isoenvi
dc.publisherSpringervi
dc.subjectperturbed T3 structurevi
dc.subjecttypical ϵ23-lower scaling boundsvi
dc.titleOn Scaling Properties for Two-State Problems and for a Singularly Perturbed T3 Structurevi
dc.typeBookvi
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