Add to ORKG1. A determination of the number of real & imaginary roots of the hypergeometric series.--2. On an extension of the 1894 memoir of Stieltjes.--3. On certain differential equations of the second order allied to Hermite's equation.--4. On linear criteria for the determination of the radius of convergence of a power series.--5. On the convergence & character of the continued fraction.--6. On the convergence of algebraic continued fractions whose coefficients have limiting values.--7. On the convergence of continued fractions with complex elements.--8. On the convergence of the continued fraction of Gauss & other continued fractions.--9. On the determination of a series of Sturm's functions ... --10. On the polynomials of Stieltjes.--11. On the...
The problem of analytic continuation is considered for the Lauricella function F(N) D , a generalize...
This master thesis is consisted of two parts. In the first part we study T.-J. Stieltjes' last paper...
This master thesis is consisted of two parts. In the first part we study T.-J. Stieltjes' last paper...
Binder's title.1. On partial differential equations of the third order.--2. Sur une classe particuli...
roots in algebräik equations.I. Halley, E. A new, exact, and easie method of finding th roots of any...
The purpose of this paper is to study convergence of certain continued fractions
Robert de Montessus de Ballore proved in 1902 his famous theorem on the convergence of Padé approxim...
The paper considers the problem of establishing the convergence criteria of the branched continued f...
der dynamischen differentialgleichungen und ihre verwerthung durch die methoden von Lie.--Zur Pfaff'...
Robert de Montessus de Ballore proved in 1902 his famous theorem on the convergence of Padé approxim...
The intention of this diploma is to present the concept of continued fractions, their conection with...
We describe various properties of continued fraction expansions of complex numbers in terms of Gauss...
Stieltjes' work on continued fractions and the orthogonal polynomials related to continued fraction ...
Extracted from various mathematical publications.Note on the automorphic linear transformation of a ...
AbstractIn the recent new edition of the collected works of T.J. Stieltjes, one of us gave an impres...
The problem of analytic continuation is considered for the Lauricella function F(N) D , a generalize...
This master thesis is consisted of two parts. In the first part we study T.-J. Stieltjes' last paper...
This master thesis is consisted of two parts. In the first part we study T.-J. Stieltjes' last paper...
Binder's title.1. On partial differential equations of the third order.--2. Sur une classe particuli...
roots in algebräik equations.I. Halley, E. A new, exact, and easie method of finding th roots of any...
The purpose of this paper is to study convergence of certain continued fractions
Robert de Montessus de Ballore proved in 1902 his famous theorem on the convergence of Padé approxim...
The paper considers the problem of establishing the convergence criteria of the branched continued f...
der dynamischen differentialgleichungen und ihre verwerthung durch die methoden von Lie.--Zur Pfaff'...
Robert de Montessus de Ballore proved in 1902 his famous theorem on the convergence of Padé approxim...
The intention of this diploma is to present the concept of continued fractions, their conection with...
We describe various properties of continued fraction expansions of complex numbers in terms of Gauss...
Stieltjes' work on continued fractions and the orthogonal polynomials related to continued fraction ...
Extracted from various mathematical publications.Note on the automorphic linear transformation of a ...
AbstractIn the recent new edition of the collected works of T.J. Stieltjes, one of us gave an impres...
The problem of analytic continuation is considered for the Lauricella function F(N) D , a generalize...
This master thesis is consisted of two parts. In the first part we study T.-J. Stieltjes' last paper...
This master thesis is consisted of two parts. In the first part we study T.-J. Stieltjes' last paper...