Spherical orthotomic curve-germs
Abstract
In this paper, it is shown that for an n-dimensional spherical unit speed curve γ: I Sn, a given point P ∈ Sn and a point s0 of the open interval I, the spherical orthotomic curve-germ ortγ, P: (I, s0) Sn of γ relative to P is L-equivalent to the spherical pedal curve-germ pedγ, P: (I, s0) Sn of γ relative to P (resp., the spherical dual curve-germ un: (I, s0) Sn of γ) if and only if P un(s0) (resp., if P= un(s0)).
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