Translation-invariant generalized topologies induced by probabilistic norms
Abstract
En
One considers probabilistic normed spaces as defined by Alsina, Sklar, and Schweizer, but with non necessarily continuous triangle functions. Such spaces are endowed with a generalized opology that is Fr´echet-separated, translation-invariant and countably generated by radial and circled 0-neighborhoods. Conversely, we show that such generalized topologies are probabilistically normable
One considers probabilistic normed spaces as defined by Alsina, Sklar, and Schweizer, but with non necessarily continuous triangle functions. Such spaces are endowed with a generalized opology that is Fr´echet-separated, translation-invariant and countably generated by radial and circled 0-neighborhoods. Conversely, we show that such generalized topologies are probabilistically normable
DOI Code:
10.1285/i15900932v29n1p157
Keywords:
46S50; 54E70
46S50; 54E70
Full Text: PDF
