On L R2-best rational approximants to Markov functions on several intervals
Abstract
Let f(z)=∫(z-x)-1dμ(x) , where μ is a Borel measure supported on several subintervals of (-1,1) with smooth Radon-Nikodym derivative. We study strong asymptotic behavior of the error of approximation (f-rn)(z) , where rn(z) is the L R2-best rational approximant to f(z) on the unit circle with n poles inside the unit disk.
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