Effect of local fractional derivatives on Riemann curvature tensor
Abstract
In this short note, we investigate the effect of the local fractional derivatives on the Riemann curvature tensor that is a common tool in calculating curvature of a Riemannian manifold. For this, first we introduce a general local fractional derivative operator that involves the mostly used ones in the literature as conformable, alternative, truncated M- and V-fractional derivatives. Then, according to this general operator, a particular Riemannian metric tensor field on the real affine space Rn that is different than Euclidean one is defined. In conlusion, we obtain that the Riemann curvature tensor of Rn endowed with this particular metric is identically 0, namely, locally isometric to Euclidean space.
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