AbstractThe first purpose of this work is to prove a convergence theorem for vector valued continued fractions which is an exact extension of a well-known theorem of Šleszyňski–Pringsheim, and our proof is based on the truncation error analysis for such continued fractions. The second purpose is to give refined error bounds for such continued fractions. These bounds are also improvements of the scalar results and the numerical example given explains the effect of our results
AbstractIn this paper we present a convergence theorem for continued fractions of the form Kn=1∞an/1...
We show that the spectral seminorm is useful to study convergence or divergence of vectorial continu...
43 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2003.Finally, this thesis uses dyna...
AbstractLet F be the family of continued fractionsK(ap/1), wherea1=−g1,ap=(1−gp−1)gpxp,p=2,3,…, with...
AbstractThe first purpose of this work is to prove a convergence theorem for vector valued continued...
AbstractGeneralizations of Śleszyński–Pringheim's convergence criteria for ordinary continued fracti...
AbstractGeneralizations of Worpitzky's convergence theorem for ordinary continued fractions are prov...
AbstractBy exploiting an isomorphism between vectors and certain matrices, the theory of vector-valu...
In this paper we recall some results and some criteria on the convergence of matrix continued fracti...
AbstractIt is well known that for convergent pure periodic continued fractions (i.e.: |r|=|x1/x2|<1)...
AbstractIt is known that under the hypotheses in Worpitzky's Theorem on continued fractions, the app...
In Chapter I of this paper, fundamental definitions in the theory of continued fractions are set for...
AbstractWe discuss the properties of matrix-valued continued fractions based on Samelson inverse. We...
The purpose of this paper is to study convergence of certain continued fractions
AbstractThe aim of this work is to give some criteria on the convergence of matrix continued fractio...
AbstractIn this paper we present a convergence theorem for continued fractions of the form Kn=1∞an/1...
We show that the spectral seminorm is useful to study convergence or divergence of vectorial continu...
43 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2003.Finally, this thesis uses dyna...
AbstractLet F be the family of continued fractionsK(ap/1), wherea1=−g1,ap=(1−gp−1)gpxp,p=2,3,…, with...
AbstractThe first purpose of this work is to prove a convergence theorem for vector valued continued...
AbstractGeneralizations of Śleszyński–Pringheim's convergence criteria for ordinary continued fracti...
AbstractGeneralizations of Worpitzky's convergence theorem for ordinary continued fractions are prov...
AbstractBy exploiting an isomorphism between vectors and certain matrices, the theory of vector-valu...
In this paper we recall some results and some criteria on the convergence of matrix continued fracti...
AbstractIt is well known that for convergent pure periodic continued fractions (i.e.: |r|=|x1/x2|<1)...
AbstractIt is known that under the hypotheses in Worpitzky's Theorem on continued fractions, the app...
In Chapter I of this paper, fundamental definitions in the theory of continued fractions are set for...
AbstractWe discuss the properties of matrix-valued continued fractions based on Samelson inverse. We...
The purpose of this paper is to study convergence of certain continued fractions
AbstractThe aim of this work is to give some criteria on the convergence of matrix continued fractio...
AbstractIn this paper we present a convergence theorem for continued fractions of the form Kn=1∞an/1...
We show that the spectral seminorm is useful to study convergence or divergence of vectorial continu...
43 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2003.Finally, this thesis uses dyna...