Removable singular sets of \(m\)-subharmonic functions (Q1711193)

The authors discuss various results on removable singularities for certain classes of $m$-subharmonic functions. For a compact $E\subset\mathbb{C}^n$ they introduce capacities $C_{n-s,q}(E)$, $1<q<\frac{n}s$, defined as the supremum of $\mu(E)$, where $\mu$ is a positive Borel measure supported by $E$ such that $$\int\Big|\int K_s(x-y)d\mu(y)\Big|^{\frac{q}{q-1}}dx\leq1,$$ where $K_s(x):=|x|^{s-n}$ for $0<s<n$ and $K_n(x)=\log|x|$. The main result is the following one: Let $F$ be a compact subset of a domain $D\subset\mathbb{C}^n$ ($n\geq2$) such that $C_{2n-2,q}(F)=0$ (resp. $C_{2n-1,q}(F)=0$) with $q:=\frac{p}{p-1}$ for some $p>1$. Let $m\in\mathbb{N}$, $m>1$ (resp. $m\geq1$), be such that $\frac{2m}{2m-2}\leq p$ (resp. $\frac{2m}{2m-1}\leq p$). Then $F$ is removable for the space $\mathcal{SH}_m(D\setminus F)\cap L_{p,\text{loc}}(D)$ (resp. $\mathcal{SH}_m(D\setminus F)\cap\{u: D\longrightarrow\mathbb{R}: u$ is differentiable and all partial derivatives of $u$ belong to $L_{p,\text{loc}}(D)\}$). For the entire collection see [Zbl 1401.30002].