Isometries between spaces of vector-valued differentiable functions (Q2046594)

Motivated by some recent work of [\textit{L. Li} et al., Ann. Funct. Anal. 9, No. 3, 334--343 (2018; Zbl 1407.46009)], the author describes surjective isometries of the space of vector-valued continuously differentiable functions \(C^1([0,1],V)\) where \(V\) is a strictly convex Banach space and the norm is \(\|f\|= \max_{t \in [0,1]}\{\|f(t)\|+\|f'(t)\|\}\). The proof follows the familiar route of first showing that a surjective isometry \(T\) preserves the constant functions (Theorem~7), thereby inducing a surjective isometry \(J\) of the underlying Banach spaces, and then concluding that \(T(f)(t)= J(f(t))\) or \(J(f(1-t))\), for \(f \in C^1([0,1]),V)\), \(t \in [0,1]\).