On R0 and R1 fuzzy topological spaces: A counterexample

The purpose of this paper is to show regularity of \((0,1, \ldots, r-2, r)\) and \((0,1, \ldots, r-2, r)^{*}\) interpolations on the sets obtained by projecting vertically the zeros of \(\left.\left(1-x^{2}\right) P_{n}^{(\alpha, \beta)}(x)(-1)<\alpha, \beta \leqslant \frac{1}{2}\right),(1-x) P_{n}^

Two types of fundamental spaces of differential forms on infinite dimensional topological vector spaces are considered; one is a fundamental space of Hida's type and the other is one of Malliavin's. It is proven that the former space is smaller than the latter. Moreover, it is shown that, under some

In this note we construct a non-separable Frtchet space E with the following properties: (i) No subspace of E is isomorphic to el. (ii) There is a linear form on E' which is bounded on bounded sets but is not continuous (i.e., the Mackey topology p(E, E ) is not bornological). This is a negative ans