A weighted extremal function and equilibrium measure (1505.07749v1)
Abstract: Let $K={\bf R}n\subset {\bf C}n$ and $Q(x):=\frac{1}{2}\log (1+x2)$ where $x=(x_1,...,x_n)$ and $x2 = x_12+\cdots +x_n2$. Utilizing extremal functions for convex bodies in ${\bf R}n\subset {\bf C}n$ and Sadullaev's characterization of algebraicity for complex analytic subvarieties of ${\bf C}n$ we prove the following explicit formula for the weighted extremal function $V_{K,Q}$: $$V_{K,Q}(z)=\frac{1}{2}\log \bigl( [1+|z|2] + { [1+|z|2]2-|1+z2|2}{1/2})$$ where $z=(z_1,...,z_n)$ and $z2 = z_12+\cdots +z_n2$. As a corollary, we find that the Alexander capacity $T_{\omega}({\bf R} {\bf P}n)$ of ${\bf R} {\bf P}n$ is $1/\sqrt 2$. We also compute the Monge-Amp`ere measure of $V_{K,Q}$: $$(ddcV_{K,Q})n = n!\frac{1}{(1+x2){\frac{n+1}{2}}}dx.$$