AbstractAn algorithm is introduced and shown to lead to various unique series expansions of p-adic numbers, as sums of rational numbers. The degrees of approximation by the partial sums of these series are investigated
Abstract: We consider summation of some finite and infinite functional p-adic series with factorials...
Abstract. We describe an algorithmic approach to prove or disprove several recent conjectures for ep...
AbstractApproximation lattices occur in a natural way in the study of rational approximations to p-a...
AbstractA general algorithm is considered and shown to lead to various unusual and unique series exp...
AbstractAn algorithm is introduced and shown to lead to various unique series expansions of p-adic n...
AbstractAn algorithm is considered, and shown to lead to various unusual and unique series expansion...
AbstractThe approximation of p-adic numbers by algebraic numbers of bounded degree is studied. Resul...
Metric properties of some special p-adic series expansions by Arnold Knopfmacher and John Knopfmache...
In this paper we investigate lower bounds for the numbers of nonzero digits of p=adic algebraic numb...
AbstractDuring the last 10 years the classical Khintchine theorem on approximation of real numbers b...
This introduction to recent work in p-adic analysis and number theory will make accessible to a rela...
In this paper, we prove that some power series with rational coefficients take either values of rati...
AbstractWe give an explicit p-adic expansion of ∑∗j=1npqj/[j]r as a power series in n which generali...
The field of real numbers is usually constructed using Dedekind cuts. In these thesis we focus on th...
The p-adic numbers were introduced by K. Hensel [1] in connection with number theory. The absolute ...
Abstract: We consider summation of some finite and infinite functional p-adic series with factorials...
Abstract. We describe an algorithmic approach to prove or disprove several recent conjectures for ep...
AbstractApproximation lattices occur in a natural way in the study of rational approximations to p-a...
AbstractA general algorithm is considered and shown to lead to various unusual and unique series exp...
AbstractAn algorithm is introduced and shown to lead to various unique series expansions of p-adic n...
AbstractAn algorithm is considered, and shown to lead to various unusual and unique series expansion...
AbstractThe approximation of p-adic numbers by algebraic numbers of bounded degree is studied. Resul...
Metric properties of some special p-adic series expansions by Arnold Knopfmacher and John Knopfmache...
In this paper we investigate lower bounds for the numbers of nonzero digits of p=adic algebraic numb...
AbstractDuring the last 10 years the classical Khintchine theorem on approximation of real numbers b...
This introduction to recent work in p-adic analysis and number theory will make accessible to a rela...
In this paper, we prove that some power series with rational coefficients take either values of rati...
AbstractWe give an explicit p-adic expansion of ∑∗j=1npqj/[j]r as a power series in n which generali...
The field of real numbers is usually constructed using Dedekind cuts. In these thesis we focus on th...
The p-adic numbers were introduced by K. Hensel [1] in connection with number theory. The absolute ...
Abstract: We consider summation of some finite and infinite functional p-adic series with factorials...
Abstract. We describe an algorithmic approach to prove or disprove several recent conjectures for ep...
AbstractApproximation lattices occur in a natural way in the study of rational approximations to p-a...
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