On some properties of the metric subalgebras ofℓ∞

The space of Lorentz metrics on a compact manifold is very different from its Riemannian analogue. There are usually many connected components. We show that some of them turn out to be not simply connected. We also show that, in dimension greater than 2, the distance between two components is always

We prove that the topology induced by any (complete) fuzzy metric space (in the sense of George and Veeramani) is (completely) metrizable. We also show that every separable fuzzy metric space admits a precompact fuzzy metric and that a fuzzy metric space is compact if and only if it is precompact an

This paper deals with some properties of a new metric (here called "the Hausdor -Skorokhod metric") previously introduced by Joo and Kim on the space of fuzzy numbers in the Euclidean space R k . We ÿrst prove that convergence in the Hausdor -Skorokhod metric implies convergence in the sendograph me