Smooth norms in dense subspaces of p() and operator ranges

Abstract

For 1≤ p<∞, we prove that the dense subspace Yp of p() comprising all elements y such that y ∈ q() for some q ∈ (0,p) admits a C∞-smooth norm which locally depends on finitely many coordinates. Moreover, such a norm can be chosen as to approximate the · p -norm. This provides examples of dense subspaces of p() with a smooth norm which have the maximal possible linear dimension and are not obtained as the linear span of a biorthogonal system. Moreover, when p>1 or is countable, such subspaces additionally contain dense operator ranges; on the other hand, no non-separable operator range in 1() admits a C1-smooth norm.

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