Constant curvature curves in dual affine and dual Lorentz-Minkowski planes

Abstract

In this paper, we first study invariants of curves parametrized by a real variable in the dual plane D2 under equiaffine transformations. We then obtain explicit equations for all curves in D2 whose equiaffine curvature is a dual constant. In particular, we prove that when the equiaffine curvature is a pure real constant, both the real and dual parts of the curve in D2 are quadratic curves. In addition, we provide a complete classification of spacelike and timelike curves parametrized by a real variable in the dual Lorentz--Minkowski plane D21 whose curvature is a dual constant.

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