Relative Asymptotic of Multiple Orthogonal Polynomials for Nikishin Systems

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García, Abey López
Lagomasino, Guillermo López
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Abstract
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We prove relative asymptotic for the ratio of two sequences of multiple orthogonal polynomials with respect to Nikishin system of measures. The first Nikishin system ${\mathcal{N}}(\sigma_1,...,\sigma_m)$ is such that for each $k$, $\sigma_k$ has constant sign on its compact support $\supp {\sigma_k} \subset \mathbb{R}$ consisting of an interval $\widetilde{\Delta}_k$, on which $|\sigma_k^{\prime}| > 0$ almost everywhere, and a discrete set without accumulation points in $\mathbb{R} \setminus \widetilde{\Delta}_k$. If ${Co}(\supp {\sigma_k}) = \Delta_k$ denotes the smallest interval containing $\supp {\sigma_k}$, we assume that $\Delta_k \cap \Delta_{k+1} = \emptyset$, $k=1,...,m-1$. The second Nikishin system ${\mathcal{N}}(r_1\sigma_1,...,r_m\sigma_m)$ is a perturbation of the first by means of rational functions $r_k$, $k=1,...,m,$ whose zeros and poles lie in $\mathbb{C} \setminus \cup_{k=1}^m \Delta_k$.
Comment: 30 pages
Keywords
Mathematics - Complex Variables, 42C05, 41A20 (Primary), 30E10 (Secondary)
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