On $L_{\mathbb R}^2$-best rational approximants to Markov functions on several intervals

Let $f(z)=\int(z-x)^{-1}d\mu(x)$, where $\mu$ is a Borel measure supported on several subintervals of $(-1,1)$ with smooth Radon–Nikodym derivative. In this talk strong asymptotic behavior of the error of approximation $(f-r_n)(z)$ will be described, where $r_n(z)$ is the $L_{\mathbb R}^2$-best rational approximant to $f(z)$ on the unit circle with $n$ poles inside the unit disk.