Abstract
Let 1≤p<∞. We show that ‘positive polynomial approximation property’ holds in the space Lp(R,dμ) (or Cw0) if and only if the algebraic polynomials are dense in L2p(R,dμ) (or Cw0). If μ is not a 2p-singular measure (or w is not a singular weight), this also implies the more general ‘oscillation-diminishing polynomial approximation property’.
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