On some nonlinear spaces of approximating functions

In this paper we study weighted function spaces of type \(B_{p, q}^{r}\left(\mathbb{R}^{n}, w(x)\right)\) and \(F_{p, 4}^{s}\left(\mathbb{R}^{\prime \prime}, w(x)\right)\) where \(w(x)\) is a weight function of at most polynomial growth. preferably \(w(x)=\left(1+|x|^{2}\right)^{x^{2}}\) with \(\alp

Let H be a real or complex Hilbert space, and let ) 0. A functional f on H is < Ž . Ž . Ž .< called an -approximately linear functional if f x q y y f x y f y F Ž< < 5 5 < < 5 5. x q y for all scalars , and all vectors x, y g H. If such a functional f is bounded then there exists a continuous linea

The aim of this paper is to show that there exist infinite dimensional Banach spaces of functions that, except for 0, satisfy properties that apparently should be destroyed by the linear combination of two of them. Three of these spaces are: a Banach space of differentiable functions on R n failing