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Abstract
Recently, the notion of a classical k-metric, which make the triangle inequality to a more general axiom: d(x,z)≤k(d(x,y)+d(y,z)), has been presented and is applied in many fields. In this paper, the definitions of an (L,M)-fuzzy k-pseudo metric and an (L,M)-fuzzy k-remote neighborhood ball system are introduced. It is proved that the category of (L,M)-fuzzy k-pseudo metric spaces is isomorphic to the category of (L,M)-fuzzy k-remote neighborhood ball spaces. Besides, (L,M)-fuzzy topological structures induced by an (L,M)-fuzzy k-pseudo metric are presented and their properties are investigated. Finally, the concept of a nest of pointwise k-pseudo metrics is proposed and it is shown that there is a one-to-one correspondence between (L,M)-fuzzy k-pseudo metrics and nests of pointwise k-pseudo metrics.
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