Add to ORKGThe field of real numbers is usually constructed using Dedekind cuts. In these thesis we focus on the construction of the field of real numbers using metric completion of rational numbers using Cauchy sequences. In a similar manner we construct the field of p-adic numbers, describe some of their basic and topological properties. We follow by a construction of complex p-adic numbers and we compare them with the ordinary complex numbers. We conclude the thesis by giving a motivation for the introduction of p-adic numbers and give an example of their use in geometry
Metric properties of some special p-adic series expansions by Arnold Knopfmacher and John Knopfmache...
Proceedings of the 8th General Meeting (EWM’97) held in Trieste, December 12–17, 1997.This is an exp...
This introduction to recent work in p-adic analysis and number theory will make accessible to a rela...
Univerzita Karlova v Praze Matematicko-fyzikální fakulta BAKALÁŘSKÁ PRÁCE Richard Dubiel p-adická čí...
When considering the usual absolute value, rational numbers can be extended to real numbers. If we w...
The book gives an introduction to p-adic numbers from the point of view of number theory, topology, ...
There are numbers of all kinds: rational, real, complex, p-adic, and more. The p-adic numbers are no...
The p-adic numbers were introduced by K. Hensel [1] in connection with number theory. The absolute ...
Here we will derive the structure of the p-adic complex numbers, that is, an algebraically closed, t...
One way to construct the real numbers involves creating equivalence classes of Cauchy sequences of r...
Abstract. In this short paper we give a popular intro-duction to the theory of p-adic numbers. We gi...
We can construct rational numbers Q as a quotient set of pairs (a, b) where a and b are integers or ...
Abstract. A topology on Z, which gives a nice proof that the set of prime integers is infinite, is c...
We introduce and de ne the p-adics integer numbers as a result of a search for solutions, for a con...
We introduce and de ne the p-adics integer numbers as a result of a search for solutions, for a con...
Metric properties of some special p-adic series expansions by Arnold Knopfmacher and John Knopfmache...
Proceedings of the 8th General Meeting (EWM’97) held in Trieste, December 12–17, 1997.This is an exp...
This introduction to recent work in p-adic analysis and number theory will make accessible to a rela...
Univerzita Karlova v Praze Matematicko-fyzikální fakulta BAKALÁŘSKÁ PRÁCE Richard Dubiel p-adická čí...
When considering the usual absolute value, rational numbers can be extended to real numbers. If we w...
The book gives an introduction to p-adic numbers from the point of view of number theory, topology, ...
There are numbers of all kinds: rational, real, complex, p-adic, and more. The p-adic numbers are no...
The p-adic numbers were introduced by K. Hensel [1] in connection with number theory. The absolute ...
Here we will derive the structure of the p-adic complex numbers, that is, an algebraically closed, t...
One way to construct the real numbers involves creating equivalence classes of Cauchy sequences of r...
Abstract. In this short paper we give a popular intro-duction to the theory of p-adic numbers. We gi...
We can construct rational numbers Q as a quotient set of pairs (a, b) where a and b are integers or ...
Abstract. A topology on Z, which gives a nice proof that the set of prime integers is infinite, is c...
We introduce and de ne the p-adics integer numbers as a result of a search for solutions, for a con...
We introduce and de ne the p-adics integer numbers as a result of a search for solutions, for a con...
Metric properties of some special p-adic series expansions by Arnold Knopfmacher and John Knopfmache...
Proceedings of the 8th General Meeting (EWM’97) held in Trieste, December 12–17, 1997.This is an exp...
This introduction to recent work in p-adic analysis and number theory will make accessible to a rela...