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Research Article | Open Access

Caputo fractional curvature of curves in the Lorentzian plane

Meltem Ogrenmis1Handan Oztekin1Y. S. Hamed2Muhammad Bilal Riaz3,4( )Muhammad Abbas5( )
Department of Mathematics, Faculty of Science, Firat University, Turkey
Department of Mathematics and Statistics College of Science, Taif University P. O. Box 11099, Taif 21944, Saudi Arabia
IT4Innovations, VSB–Technical University of Ostrava, Ostrava, Czech Republic
Applied Science Research Center, Applied Science Private University, Amman, Jordan
Department of Mathematics, University of Sargodha, 40100 Sargodha, Pakistan
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Abstract

We present a new concept of fractional curvature invariant for regular curves in the Lorentz plane by generalizing the Caputo‐fractional curvature from Euclidean geometry to the pseudo‐Riemannian setting. Our construction projects the integer-order derivative of the Caputo vector of fractional-order derivatives onto the Lorentzian normal direction, yielding a curvature measure that naturally distinguishes timelike and spacelike curves. Explicit formulas for representative model curves are derived, and we illustrate how the Lorentzian metric signature fundamentally changes fractional curvature behavior. This framework extends fractional‐order geometric analysis into relativity, providing new tools for studying memory effects and nonlocal dynamics along curves in relativistic contexts.

CLC number: 26A33, 53A04, 53B30

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AIMS Mathematics
Pages 20670-20688

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Cite this article:
Ogrenmis M, Oztekin H, Hamed YS, et al. Caputo fractional curvature of curves in the Lorentzian plane. AIMS Mathematics, 2025, 10(9): 20670-20688. https://doi.org/10.3934/math.2025923

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Received: 03 June 2025
Revised: 21 July 2025
Accepted: 28 July 2025
Published: 09 September 2025
©2025 the Author(s), licensee AIMS Press.

This is an open access article distributed under the terms of the Creative Commons Attribution License (https://creativecommons.org/licenses/by/4.0)