Surjective isometries on function spaces with derivatives

Abstract

Let A be a complex Banach space with a norm \|f\|=\|f\|X+\|d(f)\|Y for f∈ A, where d is a complex linear map from A onto a Banach space B, and \|·\|K represents the supremum norm on a compact Hausdorff space K. In this paper, we characterize surjective isometries on (A,\|·\|), which may be nonlinear. This unifies former results on surjective isometries between specific function spaces.

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