Nonlinear Lebesgue spaces: Curves and geometry

Abstract

This paper is the second in a series by the author and collaborators devoted to the study of geometric and analytic properties of nonlinear Lebesgue spaces, that is, Lp spaces of mappings taking values in arbitrary metric spaces. The present article formalizes the pointwise description of their geometric properties -- their length structure, bounds on their Alexandrov curvature as well as the definition of a speed for absolutely continuous curves despite the lack of differential structure. To obtain this pointwise description, we first prove a nonlinear analogue of the Fubini--Lebesgue theorem, which yields an identification of Lp curves in nonlinear Lebesgue spaces to mappings taking values in the space of Lp curves. This identification of Lp curves then enables a similar identification for absolutely continuous curves, from which the pointwise description of the geometric properties of nonlinear Lebesgue spaces follows.

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