Akademik Veri Yönetim Sistemi
Honam Mathematical Journal, cilt.47, sa.4, ss.498-512, 2025 (Hakemli Dergi)
In this study, the components of the Darboux frame associated with a Legendre curve lying on a surface in the BCV-Sasakian space are derived for the first time. The geometric invariants of the curve, namely its normal curvature, geodesic curvature, and geodesic torsion, are explicitly computed. A canal surface is then constructed around the Darboux-framed BCV-Legendre curve, leading to the formulation of Darboux-framed BCV-Legendre tubes. The intrinsic and extrinsic geometry of these tubular surfaces is investigated by calculating their Gaussian and mean curvatures. Moreover, the relationships between the parameter curves and geodesics, asymptotic curves, and curvature lines on the Darboux-framed BCV-Legendre tubes are analyzed in detail. All of these results are obtained for the first time in the context of BCV-Sasakian geometry, thus providing an original and significant contribution to the differential geometry of contact manifolds