A Maple Package for Symmetric Functions

Symmetric functions can be considered as operators acting on the ring of polynomials with coefficients in R. We present the package SFA, an implementation of this action for the computer algebra system Maple. As an example, we show how to recover different classical expressions of Lagrange inversion

We describe a MAPLE implementation, MultInt, of the continuous version of the WZ method. We also give various examples of how this package can be used to systematically generate proofs of identities (or recurrences) which involve multiple integrals of properhyperexponential functions. Moreover, by e

AG is a set of packages for manipulating finite state automata and finite semigroups. This software includes on the one hand the AUTOMAP package which affords the usual operations on automata (union, concatenation, Kleene closure, : : : ) as well as the usual transformations (trimming, minimization,

We obtain an interpolation formula for symmetric functions and applications to some identities on symmetric functions, including the one obtained by Gustafson and Milne on Schur functions.

Recent theoretical advances in elimination theory use straight-line programs as a data structure to represent multivariate polynomials. We present here the Projective Noether Package which is a Maple implementation of one of these new algorithms, yielding as a byproduct a computation of the dimensio