2023
DOI: 10.1007/978-3-031-39916-9_10
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An Account on Links Between Finsler and Lorentz Geometries for Riemannian Geometers

Miguel Ángel Javaloyes,
Enrique Pendás-Recondo,
Miguel Sánchez
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Cited by 3 publications
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“…In the past decade these curves and transformations have been used successfully to model of a wide variety of natural shapes, from plant leaves and tree rings to starfish and avian eggs [5]. Further applications of Finsler geometry in the natural sciences involving superellipses or Gielis curves, are found in forest ecology [6,7], seismic ray paths in anisotropic media [8], and the spreading of wildfires [9]. This has inspired various researchers to study various geometrical transformations, including inversions [10], whereby the inversion occurs with Lamé-Gielis curves as inversion circles.…”
Section: Introductionmentioning
confidence: 99%
“…In the past decade these curves and transformations have been used successfully to model of a wide variety of natural shapes, from plant leaves and tree rings to starfish and avian eggs [5]. Further applications of Finsler geometry in the natural sciences involving superellipses or Gielis curves, are found in forest ecology [6,7], seismic ray paths in anisotropic media [8], and the spreading of wildfires [9]. This has inspired various researchers to study various geometrical transformations, including inversions [10], whereby the inversion occurs with Lamé-Gielis curves as inversion circles.…”
Section: Introductionmentioning
confidence: 99%