Smoothing of weights in the Bernstein approximation problem

Abstract

In 1924 S.Bernstein asked for conditions on a uniformly bounded on R Borel function (weight) w: R [0, +∞ ) which imply the denseness of algebraic polynomials P in the seminormed space C0w defined as the linear set \f ∈ C (R) \ | \ w (x) f (x) 0 \ as \ |x| +∞\ equipped with the seminorm \|f\|w := x ∈ R w(x)| f( x )|. In 1998 A.Borichev and M.Sodin completely solved this problem for all those weights w for which P is dense in C0w but there exists a positive integer n=n(w) such that P is not dense in C0(1+x2)n w. In the present paper we establish that if P is dense in C0(1+x2)n w for all n ≥ 0 then for arbitrary > 0 there exists a weight W ∈ C∞ (R) such that P is dense in C\,0(1+x2)n W for every n ≥ 0 and W (x) ≥ w (x) + e- |x| for all x∈ R.