The Computation of Powers of Symbolic Polynomials

. . . , X n ] be an ideal in a polynomial ring over the field k. We define the essential symbolic module of I to be the R/I -module -ı) and I (m) stands for the mth symbolic power of I. We will mainly focus on the case where I is generated by square-free monomials of degree two. Among our main resu

A symbolic computation scheme, based on the Lanczos τ -method, is proposed for obtaining exact polynomial solutions to some perturbed differential equations with suitable boundary conditions. The automated τ -method uses symbolic Faber polynomials as the perturbation terms for arbitrary circular sec

Suppose we are given a polynomial P (xl ,..., x~) in r ~> 1 variables, let m bound the degree of P in all variables x~, 1 < i < r, and we wish to raise P to the nth power, n > 1. In a recent paper which compared the iterative versus the binary method it was shown that their respective computing time