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Critical $\mathrm{L}^p$-differentiability of $\mathrm{BV}^{\mathbb{A}}$-maps and canceling operators. (arXiv:1712.01251v2 [math.AP] UPDATED)
来源于:arXiv
We give a generalization of Dorronsoro's Theorem on critical
$\mathrm{L}^p$-Taylor expansions for $\mathrm{BV}^k$-maps on $\mathrm{R}^n$,
i.e., we characterize homogeneous linear differential operators $\mathbb{A}$ of
$k$-th order such that $D^{k-j}u$ has $j$-th order
$\mathrm{L}^{n/(n-j)}$-Taylor expansion a.e. for all
$u\in\mathrm{BV}^\mathbb{A}_{\text{loc}}$ (here $j=1,\ldots, k$, with an
appropriate convention if $j\geq n$). The space
$\mathrm{BV}^\mathbb{A}_{\text{loc}}$ consists of those locally integrable maps
$u$ such that $\mathbb{A} u$ is a Radon measure on $\mathbb{R}^n$. A new
$\mathrm{L}^\infty$-Sobolev inequality is established to cover higher order
expansions. Lorentz refinements are also considered. The main results can be
seen as pointwise regularity statements for linear elliptic systems with
measure-data. 查看全文>>