Differential lipschitzianness tests on abstract quasi-metric spaces

## Local and Global Lmscmzian Mappings on Ordered Metric Spaces By M ~R A I TURINICI in Iagi (Romania) (Eingegangen am 19. 5. 1980) 0. Introduction An important problem concerning a wide class of mappings acting on a metric space is that of finding sufficient conditions in order that a "local" LIP

In this paper we present fixed point theorem for nonlinear quasi-contractive mappings defined on TVS-cone metric space, which generalizes earlier results obtained by Ilić and Rakočević [D.

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.

This paper deals with spectral assertions of Riesz potentials in some classes of quasimetric spaces. In addition we survey briefly a few related subjects: integral operators, local means and function spaces, euclidean charts of quasi-metric spaces, relations to fractal geometry.