On the complexity of invariant polynomials under the action of finite reflection groups
Abstract
Let K[x1, …, xn] be a multivariate polynomial ring over a field K. Let (u1, …, un) be a sequence of n algebraically independent elements in K[x1, …, xn]. Given a polynomial f in K[u1, …, un], a subring of K[x1, …, xn] generated by the ui's, we are interested infinding the unique polynomial f new in K[e1,…, en], where e1, …, en are new variables, such that fnew(u1, …, un) = f(x1, …, xn). We provide an algorithm and analyze its arithmetic complexity to compute fnew knowing f and (u1, …, un).
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