Ruled surfaces of finite type in 3-dimensional Heisenberg group
Abstract
In this paper, on the first, we prove r=2H where is the Laplacian operator, r=( r1,r2,r3) the position vector field and H is the mean curvature vector field of a surface S in the 3-dimensional Heisenberg group H3. In the second, we classify the ruled surfaces by straight geodesic lines, which are of finite type in H3. The straight geodesic lines belong to ω , where ω is the Darboux form.
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