AbstractWe explicitly construct the general multivariate Padé approximants to the functionGq(x,y)≔∑j=1∞1xy+qjx+q2j,|q|>1,q∈Cby using the residue theorem and the functional equation method. Then we prove some convergence properties of the approximants
AbstractIn this journal (1990) we proved a multivariate version of the de Montessus de Ballore theor...
AbstractA new class of multivariate Padé approximants is introduced. When dealing with two variables...
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 both homogeneous and nonhomogeneous multivariate Padé approximants t...
AbstractWe explicitly construct non-homogeneous multivariate Padé approximants to some functions lik...
AbstractWe explicitly construct the non-homogeneous multivariate Padé approximants to a two variable...
AbstractWe explicitly construct both homogeneous and nonhomogeneous multivariate Padé approximants t...
AbstractIn a previous paper, the author introduced a new class of multivariate rational interpolants...
AbstractIt is proved that the [N, N + J] Padé approximants to any meromorphic function converge in m...
AbstractWe study the question of convergence of Padé and Padé-type approximants to functions meromor...
AbstractDuring the last few years several authors have tried to generalize the concept of Padé appro...
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...
AbstractWe state and prove a de Montessus like theorem for vector-valued meromorphic functions using...
AbstractIn this journal (1990) we proved a multivariate version of the de Montessus de Ballore theor...
AbstractA new class of multivariate Padé approximants is introduced. When dealing with two variables...
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 both homogeneous and nonhomogeneous multivariate Padé approximants t...
AbstractWe explicitly construct non-homogeneous multivariate Padé approximants to some functions lik...
AbstractWe explicitly construct the non-homogeneous multivariate Padé approximants to a two variable...
AbstractWe explicitly construct both homogeneous and nonhomogeneous multivariate Padé approximants t...
AbstractIn a previous paper, the author introduced a new class of multivariate rational interpolants...
AbstractIt is proved that the [N, N + J] Padé approximants to any meromorphic function converge in m...
AbstractWe study the question of convergence of Padé and Padé-type approximants to functions meromor...
AbstractDuring the last few years several authors have tried to generalize the concept of Padé appro...
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...
AbstractWe state and prove a de Montessus like theorem for vector-valued meromorphic functions using...
AbstractIn this journal (1990) we proved a multivariate version of the de Montessus de Ballore theor...
AbstractA new class of multivariate Padé approximants is introduced. When dealing with two variables...
AbstractThe univariate theorem of “de Montessus de Ballore” proves the convergence of column sequenc...
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