Approximation by simple partial fractions with constraints on the poles. II

Chui's conjecture in Bergman spaces ⋮ Greedy approximation by arbitrary sets ⋮ Rate of interpolation of analytic functions with regularly decreasing coefficients by simple partial fractions ⋮ A Newman type bound for \(L_p[-1,1\)-means of the logarithmic derivative of polynomials having all zeros on the unit Circle] ⋮ Approximation by sums of shifts of a single function on the circle ⋮ Approximation by special differences of simplest fractions ⋮ On the rate of approximation in the unit disc of -functions by logarithmic derivatives of polynomials with zeros on the boundary ⋮ Extremal and approximative properties of simple partial fractions ⋮ Approximation by sums of the form \(\sigma_k\lambda_k h(\lambda_kz)\) in the disk ⋮ Approximation to constant functions by electrostatic fields due to electrons and positrons ⋮ Density of quantized approximations ⋮ Convergence to zero of exponential sums with positive integer coefficients and approximation by sums of shifts of a single function on the line ⋮ A lower bound for the L_2[-1,1-norm of the logarithmic derivative of polynomials with zeros on the unit circle] ⋮ Approximation by simple partial fractions in unbounded domains ⋮ Approximation by simple partial fractions: universal sets of poles