Mollaogullari, AhmetGumus, MehmetCamci, Didem KaralarliogluIlarslan, KazimCamci, Cetin2026-02-032026-02-0320252473-6988https://doi.org/10.3934/math.2025701https://hdl.handle.net/20.500.12428/34411In this paper, we first define an equivalence relation for curves in En. Based on this equivalence relation, we investigate the relationships between the Frenet frame and curvatures of equivalent curves. Next, we introduce the concept of linearly dependent curvatures in Enand examine its implications for equivalent curves. Building on this concept and the proposed equivalence relation, we present a method to construct (1,3)-Bertrand curves in E4. Additionally, we derive the relationships between the harmonic curvatures of equivalent curves and use these relationships to establish several properties of equivalent helical curves. These results enable systematic construction of curves with prescribed geometric properties.eninfo:eu-repo/semantics/openAccesscombescure transformationcurve theoryequivalent curveshelixBertrand curveArticle107156531566210.3934/math.2025701Q1WOS:0015296355000032-s2.0-105011186322Q1