Best polynomial approximation on the triangle

Abstract

Let En(f)α,β,γ denote the error of best approximation by polynomials of degree at most n in the space L2(α,β,γ) on the triangle \(x,y): x, y 0, x+y 1\, where α,β,γ(x,y) := xα y β (1-x-y)γ for α,β,γ > -1. Our main result gives a sharp estimate of En(f)α,β,γ in terms of the error of best approximation for higher order derivatives of f in appropriate Sobolev spaces. The result also leads to a characterization of En(f)α,β,γ by a weighted K-functional.