TY  - GEN
T1  - Partial regularity for a class of anisotropic variational integrals with convex hull property
A1  - Bildhauer,Michael
A1  - Fuchs,Martin
Y1  - 2011/11/25
N2  - We consider integrands f:\mathbb{R}^{nN}\rightarrow\mathbb{R}  which are of lower (upper) growth rate s\geq2(q>s) and which satisfy an additional structural condition implying the convex hull property, i.e. if the boundary data of a minimizer u:\Omega\rightarrow\mathbb{R}^{N}  of the energy \int_{\Omega}f(\nabla u)dx respect a closed convex set K\subset\mathbb{R}^{N}, then so does u on the whole domain. We show partial C^{1,\alpha}-regularity of bounded local minimizers if q<min\{s+\frac{2}{3},s\frac{n}{n-2}\} and discuss cases in which the latter condition on the exponents can be improved. Moreover, we give examples of integrands which fit into our category and to which the results of Acerbi and Fusco [AF2] do not apply, in particular, we give some extensions to the subquadratic case.
CY  - Saarbrücken
PB  - Universitäts- und Landesbibliothek
AD  - Postfach 151141, 66041 Saarbrücken
UR  - http://scidok.sulb.uni-saarland.de/volltexte/2011/4357
ER  -