A quasi-metric space without complete quasi-uniformity

## Abstract Regular left __K__‐sequentially complete quasi‐metric spaces are characterized. We deduce that these spaces are complete Aronszajn and that every metrizable space admitting a left __K__‐sequentially complete quasi‐metric is completely metrizable. We also characterize quasi‐metric spaces

In computable analysis recursive metric spaces play an important role, since these are, roughly speaking, spaces with computable metric and limit operation. Unfortunately, the concept of a metric space is not powerful enough to capture all interesting phenomena which occur in computable analysis. So

In this work we define and study quasi-contraction on a cone metric space. For such a mapping we prove a fixed point theorem. Among other things, we generalize a recent result of H. L. Guang and Z. Xian, and the main result of Ćirić is also recovered.

## a b s t r a c t In this paper, we introduce the notions of stratified (L, M)-fuzzy quasi-uniform spaces and (L, M)-fuzzy quasi-uniform bases, where L and M are completely distributive lattice and complete residuated lattice, respectively. We investigate the images and preimages of (L, M)-fuzzy u