International audienceWe extend Zeilberger's approach to special function identities to cases that are not holonomic. The method of creative telescoping is thus applied to definite sums or integrals involving Stirling or Bernoulli numbers, incomplete Gamma function or polylogarithms, which are not covered by the holonomic framework. The basic idea is to take into account the dimension of appropriate ideals in Ore algebras. This unifies several earlier extensions and provides algorithms for summation and integration in classes that had not been accessible to computer algebra before
Creative telescoping is an algorithmic principle that has been developed since the 1990s in combinat...
This thesis is codirected between Ecole Polytechnique and Chinese Academy of SciencesSince the 1990'...
Holonomic functions and sequences have the property that they can be represented by a finite amount ...
Version journal de l'article de conférence FPSAC'97International audienceWe extend Zeilberger's fast...
This thesis shows how computer algebra makes it possible to manipulate a large class of sequences an...
AbstractWe extend Zeilberger's fast algorithm for definite hypergeometric summation to non-hypergeom...
We present the Mathematica package HolonomicFunctions which provides a powerful frame-work for the a...
The Holonomic Systems Approach was proposed in the early 1990s by Doron Zeilberger and has turned ou...
AbstractWe observe that many special functions are solutions of so-called holonomic systems. Bernste...
AbstractThe class of “holonomic function” is considered. We present a quasi-algorithm that recognize...
AbstractLet k be a field of characteristic 0. Based on the Gelfand–Kirillov dimension computation of...
The celebrated Zeilberger algorithm which finds holonomic recurrence equations for definite sums of ...
This manual describes the functionality of the Mathematica package Holo-nomicFunctions. It is a very...
Holonomic functions play an essential role in Computer Algebra since they allow the application of m...
AbstractZeilberger's algorithm which finds holonomic recurrence equations for definite sums of hyper...
Creative telescoping is an algorithmic principle that has been developed since the 1990s in combinat...
This thesis is codirected between Ecole Polytechnique and Chinese Academy of SciencesSince the 1990'...
Holonomic functions and sequences have the property that they can be represented by a finite amount ...
Version journal de l'article de conférence FPSAC'97International audienceWe extend Zeilberger's fast...
This thesis shows how computer algebra makes it possible to manipulate a large class of sequences an...
AbstractWe extend Zeilberger's fast algorithm for definite hypergeometric summation to non-hypergeom...
We present the Mathematica package HolonomicFunctions which provides a powerful frame-work for the a...
The Holonomic Systems Approach was proposed in the early 1990s by Doron Zeilberger and has turned ou...
AbstractWe observe that many special functions are solutions of so-called holonomic systems. Bernste...
AbstractThe class of “holonomic function” is considered. We present a quasi-algorithm that recognize...
AbstractLet k be a field of characteristic 0. Based on the Gelfand–Kirillov dimension computation of...
The celebrated Zeilberger algorithm which finds holonomic recurrence equations for definite sums of ...
This manual describes the functionality of the Mathematica package Holo-nomicFunctions. It is a very...
Holonomic functions play an essential role in Computer Algebra since they allow the application of m...
AbstractZeilberger's algorithm which finds holonomic recurrence equations for definite sums of hyper...
Creative telescoping is an algorithmic principle that has been developed since the 1990s in combinat...
This thesis is codirected between Ecole Polytechnique and Chinese Academy of SciencesSince the 1990'...
Holonomic functions and sequences have the property that they can be represented by a finite amount ...