AbstractIntroduced by Knuth and subsequently developed by Banderier et al., Prodinger, and others, the kernel method is a powerful tool for solving power series equations in the form of F(z,t)=A(z,t)F(z0,t)+B(z,t) and several variations. Recently, Hou and Mansour [Q.-H. Hou, T. Mansour, Kernel Method and Linear Recurrence System, J. Comput. Appl. Math. (2007), (in press).] presented a systematic method to solve equation systems of two variables F(z,t)=A(z,t)F(z0,t)+B(z,t), where A is a matrix, and F and B are vectors of rational functions in z and t. In this paper we generalize this method to another type of rational function matrices, i.e., systems of functional equations. Since the types of equation systems we are interested in arise freq...
Numerical algebraic geometry studies methods to approach problems in algebraic geometry numerically....
AbstractIn this paper, we prove a conjecture on a common region of a convergence of Padé iterations ...
AbstractWe discuss two algorithms which, given a linear difference equation with rational function c...
Introduced by Knuth and subsequently developed by Banderier et al., Prodinger, and others, the kerne...
AbstractIntroduced by Knuth and subsequently developed by Banderier et al., Prodinger, and others, t...
AbstractBased on the kernel method, we present systematic methods to solve equation systems on gener...
AbstractSchröder’s methods of the first and second kind for solving a nonlinear equation f(x)=0, ori...
In this work, Laurent series expansion compared with definition of rational function is used to find...
Abstract. The kernel method has recently become quite popular. Roughy speak-ing, in certain cases on...
AbstractIf f = Σn=−∞∞ antn is a formal Laurent series with certain restrictions on the an, then f = ...
AbstractWe present an efficient algorithm for obtaining a canonical system of Jordan chains for an n...
AbstractA terminating condition of the well-known Zeilberger's algorithm for a given hypergeometric ...
The Hadamard product (denoted by∗) of two power series A(x) =a0+a1x+a2x2+···and B(x) =b0+b1x+b2x2+··...
AbstractFor each natural number m greater than one, and each natural number k less than or equal to ...
AbstractRelations between rational interpolants and Hankel matrices are investigated. A modification...
Numerical algebraic geometry studies methods to approach problems in algebraic geometry numerically....
AbstractIn this paper, we prove a conjecture on a common region of a convergence of Padé iterations ...
AbstractWe discuss two algorithms which, given a linear difference equation with rational function c...
Introduced by Knuth and subsequently developed by Banderier et al., Prodinger, and others, the kerne...
AbstractIntroduced by Knuth and subsequently developed by Banderier et al., Prodinger, and others, t...
AbstractBased on the kernel method, we present systematic methods to solve equation systems on gener...
AbstractSchröder’s methods of the first and second kind for solving a nonlinear equation f(x)=0, ori...
In this work, Laurent series expansion compared with definition of rational function is used to find...
Abstract. The kernel method has recently become quite popular. Roughy speak-ing, in certain cases on...
AbstractIf f = Σn=−∞∞ antn is a formal Laurent series with certain restrictions on the an, then f = ...
AbstractWe present an efficient algorithm for obtaining a canonical system of Jordan chains for an n...
AbstractA terminating condition of the well-known Zeilberger's algorithm for a given hypergeometric ...
The Hadamard product (denoted by∗) of two power series A(x) =a0+a1x+a2x2+···and B(x) =b0+b1x+b2x2+··...
AbstractFor each natural number m greater than one, and each natural number k less than or equal to ...
AbstractRelations between rational interpolants and Hankel matrices are investigated. A modification...
Numerical algebraic geometry studies methods to approach problems in algebraic geometry numerically....
AbstractIn this paper, we prove a conjecture on a common region of a convergence of Padé iterations ...
AbstractWe discuss two algorithms which, given a linear difference equation with rational function c...