On a class of equilibrium problems in the real axis

In a series of seminal papers, Thomas J. Stieltjes (1856–1894) gave an elegant electrostatic interpretation for the zeros of classical families of orthogonal polynomials, such as Jacobi, Hermite and Laguerre polynomials. More generally, he extended this approach to the zeros of polynomial solutions of certain second-order linear differential equations (Lamé equations), the so-called Heine–Stieltjes polynomials. s paper, a class of electrostatic equilibrium problems in R , where the free unit charges x 1 , … , x n ∈ R are in presence of a finite family of “attractors” (i.e., negative charges) z 1 , … , z m ∈ C ∖ R , is considered and its connection with certain class of Lamé-type equations is shown. In addition, we study the situation when both n → ∞ and m → ∞ , by analyzing the corresponding (continuous) equilibrium problem in presence of a certain class of external fields.