Filip Rindler
Published 2010-10-01, updated 2011-03-19Version 3
We give a new proof of sequential weak* lower semicontinuity in $\BV(\Omega;\R^m)$ for integral functionals with a quasiconvex Carath\'{e}odory integrand with linear growth at infinity and such that the recession function $f^\infty$ exists in a strong sense and is (jointly) continuous. In contrast to the classical proofs by Ambrosio & Dal Maso [J. Funct. Anal. 109 (1992), 76-97] and Fonseca & M\"{u}ller [Arch. Ration. Mech. Anal. 123 (1993), 1-49], we do not use Alberti's Rank-One Theorem [Proc. Roy. Soc. Edinburgh Sect. A} 123 (1993), 239-274], but a rigidity result for gradients. The proof is set in the framework of generalized Young measures and proceeds via establishing Jensen-type inequalities for regular and singular points of $Du$.
Comments: this is not a new version, just a fix for the previously wrongly compiled arXiv version
Generalized $\mathbf{W^{1,1}}$-Young measures and relaxation of problems with linear growth
Lower semicontinuity of nonlocal $L^\infty$ energies on $SBV_0(I)$
Dimensional reduction for energies with linear growth involving the bending moment
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