Geometrical Aspects of the Level of Curves

Let X be a closed subspace of a Banach space Y and J be the inclusion map. We say that the pair (X, Y) has the Daugavet property if for every rank one bounded linear operator T from X to Y the equality ## &J+T&=1+&T& (1) holds. A new characterization of the Daugavet property in terms of weak open

We investigate some geometrical aspects of the discriminant functions of the kind for suitable constants a k , c k where { is a sigmoidal transformation. This function is realized by a multilayer perceptron with one hidden layer. These results are applied in the analysis of the discriminating power

We consider a class of nonlocal geometric equations for expanding curves in the plane, arising in the study of evolutions governed by Monge-Kantorovich mass transfer. We construct convex solutions, given convex initial data. In order to obtain such solutions, we develop a new version of Perron's met

Let ⊆ r K be a non-degenerate projective curve of degree r + 2, where r ≥ 3. By means of the Hartshorne-Rao module of we distinguish 4 different possible cases (and an exceptional case which only appears if r = 3). In any case is obtained either by means of an embedding of an arbitrary smooth curve