On Marcinkiewicz-Zygmund inequalities and Ap-weights for L-shape arcs

Abstract

Let be an L-shape arc consisting of 2 line segments that meet at an angle different from π in the complex z-plane . This paper is to investigate the behavior of the polynomial interpolants at the Fej\'er points, defined by \zn,k = (ei(2kπ + θ)/(n+1))\ for any choice of θ. In this regard, we recall that for the interval [-1, 1], the Fej\'er points \zn,k = *(ei(2k+1)π/(n+1))\ agree with the Chebyshev points and that the Chebyshev points are most commonly used as nodes for Lagrange polynomial interpolation. On the other hand, numerical experimentation demonstrates that for a typical open L-shape arc , the Lebesgue constants tend to ∞ at the rate of O((log(n))2), as the polynomial degree n increases, while the Ap-weight conditions for the Fej\'er points \zn,k\ do not carry over from [-1, 1] to a truly L-shape arc. Further numerical experiments also demonstrate that the least upper bounds of the Marcinkiewicz-Zygmund inequalities for the canonical Lagrange interpolation polynomials at \zn,k\ seem to grow at the rate of nβ, for some β >0 that depends on p >1.