On Asanov's Finsleroid-Finsler metrics as the solutions of a conformal rigidity problem

TL;DR

This paper characterizes Finsleroid-Finsler metrics as solutions to a conformal rigidity problem, showing they are conformal to metrics with invariant mixed curvature tensor under specific conformal changes.

Contribution

It provides a characterization of Finsleroid-Finsler metrics as solutions to a conformal rigidity problem, linking them to invariance of the mixed curvature tensor under conformal transformations.

Findings

Finsleroid-Finsler metrics are solutions to a conformal rigidity problem.

Solutions are conformal to Finsleroid-Finsler metrics with invariant mixed curvature tensor.

Characterization applies to metrics of class at least C^2 outside the zero section.

Abstract

Finsleroid-Finsler metrics form an important class of singular (y-local) Finsler metrics. They were introduced by G. S. Asanov [2] in 2006. As the special case of the general construction Asanov produced singular (y - local) examples of Landsberg spaces of dimension at least three that are not of Berwald type. The existence of regular (y - global) Landsberg metrics that are not of Berwald type is an open problem up to this day; for a detailed exposition of the so-called unicorn problem in Finsler geometry see D. Bao [3]. In this paper we are going to characterize the Finsleroid-Finsler metrics as the solutions of a conformal rigidity problem. We are looking for (non-Riemannian) Finsler metrics admitting a (non-homothetic) conformal change such that the mixed curvature tensor of the Berwald connection contracted by the derivatives of the logarithmic scale function is invariant. We prove that the solutions of class at least $\mathcal{C}^2$ on the complement of the zero section are conformal to Finsleroid-Finsler metrics.