The Euler theorem and Dupin indicatrix for surfaces at a constant distance from edge of regression on a surface in \(E_1^3\) (Q6486677)

The authors consider a surface \(M^f\) at a constant distance from the edge of regression on a surface \(M\) in the Minkowski \(3\)-space \(E^3_1\). Using the notions of hyperbolic angle and normal curvature, they give the Euler theorem for the surface \(M^f\) in \(E^3_1\). They show that the Dupin indicatrix of \(M^f\) can be an ellipse, two conjugate hyperbolas, or two parallel lines.