L-fuzzy weak local compactness

Two notions of local precompactness in the realm of fuzzy convergence spaces are investigated. It is shown that the property of local precompactness possesses a ''good extension.'' Moreover, for each given fuzzy convergence space, there exists a coarsest locally precompact space which is finer than

For a finite and positive measure space \((\Omega, \Sigma, \mu)\) characterization of relatively weakly compact sets in \(L_{\infty}(\mu, X)\) the space of \(\mu\)-essentially bounded vector valued functions \(f: \Omega \rightarrow X\) are presented. Application to Banach space theory is given. C 19

In this paper, taking fuzziness with respect to a fuzzy lattice, we present good extensions of two of the current deÿnitions of relative compactness in general topology. Fuzzy versions of some properties are obtained.