On a Generalization of Quasi-metric Space

Abstract

We find an extension of the quasi-metric (to be called g-quasi metric) such that the induced generalized topology may fail to form a topology. We show that g-quasi metrizability is a g-topologically invariant property of generalized topological spaces. Extending metric product and uniform continuity for g-quasi metric spaces, we note that a g-quasi metric may fail to be uniformly continuous in the extended sense unlike usual metric. Finally, we extend the study of completeness, Lebesgue property and weak G-completeness for g-quasi metric spaces.