A new interpolation method for metric spaces based on bi-infinite sequences: The R-Method

Abstract

We introduce a new interpolation method for metric spaces, termed the R-method, based on bi-infinite linking sequences. Although the construction is inspired by the classical metric functional JM, the resulting interpolated space is generated by a distinct object that behaves as a multiscale energy functional. This functional measures the minimal discrete action required to connect two points through Z-indexed sequences, leading to a new intrinsic metric on X0 X1. The associated interpolated space is obtained as the relative completion of this metric inside X0 X1 and is genuinely different from those produced by the JM- and KM-methods. A fundamental structural property of the R-method is that the resulting space embeds continuously into the corresponding KM-interpolated space, situating the construction naturally within the existing theory of metric interpolation. When the method is restricted to a normed setting, the R-method induces a genuine interpolation functor. In this framework, it preserves the Lipschitz property of operators with closed graphs, even in the absence of linearity, thereby extending the classical scope of interpolation theory, which is traditionally confined to linear continuous operators. As a consequence, standard compactness properties are also preserved under mild assumptions. The R-method thus provides a new interpolation framework whose foundations rely exclusively on intrinsic metric properties and the summability of discrete orbits, bridging metric interpolation, nonlinear analysis, and classical interpolation theory.

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