Ruled and Rotational Surfaces Generated by Non-Null Curves with Zero Weighted Curvature in (L-3, ax(2)
Date
2020Author
Altin, Mustafa and Kazan, Ahmet and Karada, H. Bayram
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In this study, firstly we give the weighted curvatures of non-null
planar curves in Lorentz-Minkowski space with density eax(2)+by(2) and
obtain the planar curves whose weighted curvatures vanish in this space
under the condition that the constants a and b are not zero at the same
time. After giving the Frenet vectors of the non-null planar curves with
zero weighted curvature in Lorentz-Minkowski space with density eax(2),
we create the Smarandache curves of them. With the aid of these curves
and their Smarandache curves, we get the ruled surfaces whose base
curves are non-null curves of which vanishing weighted curvature and
ruling curves are Smarandache curves of them. Followingly, we give some
characterizations for these ruled surfaces by obtaining the mean and
Gaussian curvatures, distribution parameters and striction curves of
them. Also, rotational surfaces which are generated by non-null planar
curves with zero weighted curvatures in Lorentz-Minkowski space E-1(3)
with density eax(2) +by(2) are studied under the condition that the
constants a and b are not zero at the same time. We draw the graphics of
the obtained surfaces.
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