Quantified Legendreness and the regularity of minima
<p>We introduce a new quantification of nonuniform ellipticity in variational problems via convex duality, and prove higher differentiability and 2<em>d</em>-smoothness results for vector valued minimizers of possibly degenerate functionals. Our framework covers convex, anisotropic...
Auteurs principaux: | De Filippis, C, Koch, L, Kristensen, J |
---|---|
Format: | Journal article |
Langue: | English |
Publié: |
Springer
2024
|
Documents similaires
Documents similaires
-
Quantified Legendreness and the Regularity of Minima
par: De Filippis, C, et autres
Publié: (2024) -
Boundary regularity of minima
par: Kristensen, J, et autres
Publié: (2008) -
On the regularity of the ω-minima of φ-functionals
par: De Filippis, C
Publié: (2019) -
On the regularity of minima of non-autonomous functionals
par: De Filippis, C, et autres
Publié: (2019) -
Calculus of variations. - Boundary regularity of minima
par: Kristensen, J, et autres
Publié: (2008)