AbstractThis paper is a survey on the multivariate Padé approximation. Two types of approximants are considered: those which can approximate general meromorphic functions f=h/g where both h and g are holomorphic, and those which are specialized to the approximation of functions of the same form where g is a polynomial. Algorithms are described, together with the different techniques used for proving convergence
AbstractIt is proved that the [N, N + J] Padé approximants to any meromorphic function converge in m...
AbstractWe explicitly construct both homogeneous and nonhomogeneous multivariate Padé approximants t...
AbstractThe univariate theorem of “de Montessus de Ballore” proves the convergence of column sequenc...
AbstractThis paper is a survey on the multivariate Padé approximation. Two types of approximants are...
AbstractWe explicitly construct the general multivariate Padé approximants to the functionGq(x,y)≔∑j...
AbstractIn a previous paper, the author introduced a new class of multivariate rational interpolants...
AbstractA new class of multivariate Padé approximants is introduced. When dealing with two variables...
AbstractIn previous papers the convergence of sequences of “rectangular” multivariate Padé-type appr...
AbstractDuring the last few years several authors have tried to generalize the concept of Padé appro...
AbstractIn Fitzpatrick and Flynn (J. Symbolic Comput. 13 (1992) 133), a Gröbner basis technique for ...
AbstractFor an operator F: Rn → R, analytic in the origin, the notion of (abstract multivariate Padé...
Abstract. It is shown how to find general multivariate Padé approximation using Gröbner basis techni...
AbstractThe notion of partial Padé approximant is generalized to that of general order multivariate ...
AbstractA new definition of multivariate Padé approximation is introduced, which is a natural genera...
AbstractWe explicitly construct both homogeneous and nonhomogeneous multivariate Padé approximants t...
AbstractIt is proved that the [N, N + J] Padé approximants to any meromorphic function converge in m...
AbstractWe explicitly construct both homogeneous and nonhomogeneous multivariate Padé approximants t...
AbstractThe univariate theorem of “de Montessus de Ballore” proves the convergence of column sequenc...
AbstractThis paper is a survey on the multivariate Padé approximation. Two types of approximants are...
AbstractWe explicitly construct the general multivariate Padé approximants to the functionGq(x,y)≔∑j...
AbstractIn a previous paper, the author introduced a new class of multivariate rational interpolants...
AbstractA new class of multivariate Padé approximants is introduced. When dealing with two variables...
AbstractIn previous papers the convergence of sequences of “rectangular” multivariate Padé-type appr...
AbstractDuring the last few years several authors have tried to generalize the concept of Padé appro...
AbstractIn Fitzpatrick and Flynn (J. Symbolic Comput. 13 (1992) 133), a Gröbner basis technique for ...
AbstractFor an operator F: Rn → R, analytic in the origin, the notion of (abstract multivariate Padé...
Abstract. It is shown how to find general multivariate Padé approximation using Gröbner basis techni...
AbstractThe notion of partial Padé approximant is generalized to that of general order multivariate ...
AbstractA new definition of multivariate Padé approximation is introduced, which is a natural genera...
AbstractWe explicitly construct both homogeneous and nonhomogeneous multivariate Padé approximants t...
AbstractIt is proved that the [N, N + J] Padé approximants to any meromorphic function converge in m...
AbstractWe explicitly construct both homogeneous and nonhomogeneous multivariate Padé approximants t...
AbstractThe univariate theorem of “de Montessus de Ballore” proves the convergence of column sequenc...
DOI
Add to ORKG