Uniformity of Strong Asymptotics in Angelesco Systems

Abstract: Let $\mu_1$ and $\mu_2$ be two complex-valued Borel measures on the real line such that $\operatorname{supp} \mu_1 =[\alpha_1,\beta_1] < \operatorname{supp} \mu_2 =[\alpha_2,\beta_2]$ and ${\rm d}\mu_i(x) = -\rho_i(x){\rm d}x/2\pi {\rm i}$, where $\rho_i(x)$ is the restriction to $[\alpha_i,\beta_i]$ of a function non-vanishing and holomorphic in some neighborhood of $[\alpha_i,\beta_i]$. Strong asymptotics of multiple orthogonal polynomials is considered as their multi-indices $(n_1,n_2)$ tend to infinity in both coordinates. The main goal of this work is to show that the error terms in the asymptotic formulae are uniform with respect to $\min{n_1,n_2}$.