AbstractPower series with rational exponents on the real numbers field and the Levi-Civita field are studied. We derive a radius of convergence for power series with rational exponents over the field of real numbers that depends on the coefficients and on the density of the exponents in the series. Then we generalize that result and study power series with rational exponents on the Levi-Civita field. A radius of convergence is established that asserts convergence under a weak topology and reduces to the conventional radius of convergence for real power series. It also asserts strong (order) convergence for points whose distance from the center is infinitely smaller than the radius of convergence. Then we study a class of functions that are ...
This diploma thesis will mostly focus on the problem of convergence of the complex power series. The...
This thesis looks at power series, particularly in the areas of: radius of convergence, properties o...
A sufficient condition for the convergence of a generalized formal power series solution to an alge...
AbstractPower series with rational exponents on the real numbers field and the Levi-Civita field are...
In this talk, we will give an overview of our work on non-Archimedean ordered field extensions of th...
The paper investigates general properties of the power series over a non- Archimedean ordered field,...
In the present paper we investigate the convergence of a double series over a complete non-Archimede...
AbstractThis is a sequel to my previous papers on generalized power series. For the convenience of t...
Abstract: Here we prove the theorem on sufficient condition of the convergence near zero o...
textMotivated by [5], we develop an analogy with a similar problem in p-adic power series over a fi...
Abstract: In this preprint we study some properties of generalized power series that are f...
In this paper, we prove that some power series with rational coefficients take either values of rati...
We consider the problem of local linearization of power series defined over complete valued fields. ...
Generalized power series extend the notion of formal power series by considering exponents ofeach va...
The aim is to investigate the growth in a series of the exponents near regularity field in the terms...
This diploma thesis will mostly focus on the problem of convergence of the complex power series. The...
This thesis looks at power series, particularly in the areas of: radius of convergence, properties o...
A sufficient condition for the convergence of a generalized formal power series solution to an alge...
AbstractPower series with rational exponents on the real numbers field and the Levi-Civita field are...
In this talk, we will give an overview of our work on non-Archimedean ordered field extensions of th...
The paper investigates general properties of the power series over a non- Archimedean ordered field,...
In the present paper we investigate the convergence of a double series over a complete non-Archimede...
AbstractThis is a sequel to my previous papers on generalized power series. For the convenience of t...
Abstract: Here we prove the theorem on sufficient condition of the convergence near zero o...
textMotivated by [5], we develop an analogy with a similar problem in p-adic power series over a fi...
Abstract: In this preprint we study some properties of generalized power series that are f...
In this paper, we prove that some power series with rational coefficients take either values of rati...
We consider the problem of local linearization of power series defined over complete valued fields. ...
Generalized power series extend the notion of formal power series by considering exponents ofeach va...
The aim is to investigate the growth in a series of the exponents near regularity field in the terms...
This diploma thesis will mostly focus on the problem of convergence of the complex power series. The...
This thesis looks at power series, particularly in the areas of: radius of convergence, properties o...
A sufficient condition for the convergence of a generalized formal power series solution to an alge...