A Haar-type theory of best 𝐿₁-approximation with constraints

Abstract: Abstract.A general setting for constrained Z,1-approximation is presented. Let Un be a finite dimensional subspace of C [a, b] and L be a linear operator from Un to C(K) (r = 0, 1) where K is a finite union of disjoint, closed, bounded intervals. For v , u e C(K) with v < u, the approximating set is Univ, u) = {p e Un : v < Lp < u on K} and the norm is \\f\\w = Xf \f\wdx where w a positive continuous function on [a, b]. We obtain necessary and sufficient conditions for Un (v, u) to admit unique best || • ||w-… Show more