Unboundedness of horn with finite positive part of curvature in the Euclidean space

Recent results in fully nonlinear pde's single out smooth bounded domains in the euclidean 3-space whose boundary has non-vanishing mean curvature. The literature provides no example of such domains when the genus of the boundary is strictly larger than 1. This note fills the gap with an elementary

In this note we show that the total curvature of a geodesic in the manifoldwith-boundary consisting of Euclidean 3-space with a boundary of the form z = f(x, y) has a bound of at most 2p iff satisfies a Lipschitz condition with the Lipschitz constant at most p. This global result immediately yields

## Abstract It is shown that the classes of discrete parts, __A__ ∩ ℕ^__k__^, of approximately resp. weakly decidable subsets of Euclidean spaces, __A__ ⊆ ℝ^__k__^, coincide and are equal to the class of __ω__‐r. e. sets which is well‐known as the first transfinite level in Ershov's hierarchy exhau