On some results of analysis in metric spaces and fuzzy metric spaces

Aphane, Maggie

12 1900

The notion of a fuzzy metric space due to George and Veeramani has many advantages in analysis since many notions and results from classical metric space theory can be extended and generalized to the setting of fuzzy metric spaces, for instance: the notion of completeness, completion of spaces as well as extension of maps. The layout of the dissertation is as follows: Chapter 1 provide the necessary background in the context of metric spaces, while chapter 2 presents some concepts and results from classical metric spaces in the setting of fuzzy metric spaces. In chapter 3 we continue with the study of fuzzy metric spaces, among others we show that: the product of two complete fuzzy metric spaces is also a complete fuzzy metric space. Our main contribution is in chapter 4. We introduce the concept of a standard fuzzy pseudo metric space and present some results on fuzzy metric identification. Furthermore, we discuss some properties of t-nonexpansive maps. / Mathematical Sciences / M. Sc. (Mathematics)

Metric space

Cauchy sequence

Compactness

Precompactness

Completeness

Continuity

Uniform continuity

Isometry

Uniform convergence

Seperable

Nested

Closed sets

Diameter

Pseudo metric space

Fuzzy metric space

Standard fuzzy metric space

Fuzzy pseudo metric space

Metric identification

Fuzzy metric identification

Nonexpansive map

t-nonexpansive map

t-uniformly continuous map

t-isometry map

Quotient map

Quotient topology

Quotient space

Natural map

Topological space

514.325

Metric spaces

Fuzzy topology

On some results of analysis in metric spaces and fuzzy metric spaces

Aphane, Maggie

12 1900

The notion of a fuzzy metric space due to George and Veeramani has many advantages in analysis since many notions and results from classical metric space theory can be extended and generalized to the setting of fuzzy metric spaces, for instance: the notion of completeness, completion of spaces as well as extension of maps. The layout of the dissertation is as follows: Chapter 1 provide the necessary background in the context of metric spaces, while chapter 2 presents some concepts and results from classical metric spaces in the setting of fuzzy metric spaces. In chapter 3 we continue with the study of fuzzy metric spaces, among others we show that: the product of two complete fuzzy metric spaces is also a complete fuzzy metric space. Our main contribution is in chapter 4. We introduce the concept of a standard fuzzy pseudo metric space and present some results on fuzzy metric identification. Furthermore, we discuss some properties of t-nonexpansive maps. / Mathematical Sciences / M. Sc. (Mathematics)

Metric space

Cauchy sequence

Compactness

Precompactness

Completeness

Continuity

Uniform continuity

Isometry

Uniform convergence

Seperable

Nested

Closed sets

Diameter

Pseudo metric space

Fuzzy metric space

Standard fuzzy metric space

Fuzzy pseudo metric space

Metric identification

Fuzzy metric identification

Nonexpansive map

t-nonexpansive map

t-uniformly continuous map

t-isometry map

Quotient map

Quotient topology

Quotient space

Natural map

Topological space

514.325

Metric spaces

Fuzzy topology