Triangular Factorizations of Special Polynomial Automorphisms

We exhibit a deterministic algorithm for factoring polynomials in one variable over "nite "elds. It is e$cient only if a positive integer k is known for which I (p) is built up from small prime factors; here I denotes the kth cyclotomic polynomial, and p is the characteristic of the "eld. In the cas

Let K X Y = K x 1 x n y 1 y m be the polynomial algebra in m + n variables over a field K of characteristic 0. Let δ be a locally nilpotent derivation of K X Y such that δ y i = 0, i = 1 m, and let δ act as a K Y -affine transformation over the free K Y -module freely generated by x 1 x n . We pro

In this paper we consider test polynomials in the polynomial algebra and the free associative algebra. A test polynomial is defined by the following property: every endomorphism which fixes the polynomial is an automorphism. We construct families of test polynomials for the polynomial algebra and th

Let T be the generic trace algebra generated by the algebra R of two generic 2 = 2 matrices and by all traces of the matrices from R over a field K. We construct new automorphisms of T and R. They induce automorphisms of the polynomial algebra in five variables which fix two of the variables. Our au