On the Distribution of Zeros and Poles of Rational Approximants on Intervals

The distribution of zeros and poles of best rational approximants is well understood for the functions f(x) = vertical bar x vertical bar(alpha), alpha > 0. If f is an element of C[-1, 1] is not holomorphic on [-1, 1], the distribution of the zeros of best rational approximants is governed by the equilibrium measure of [-1, 1] under the additional assumption that the rational approximants are restricted to a bounded degree of the denominator. This phenomenon was discovered first for polynomial approximation. In this paper, we investigate the asymptotic distribution of zeros, respectively, a-values, and poles of best real rational approximants of degree at most n to a function f is an element of C[-1, 1] that is real-valued, but not holomorphic on [-1, 1]. Generalizations to the lower half of the Walsh table are indicated.