Parallel factorizations of matrix polynomials over an arbitrary field

Let f and g be polynomials over some field, thought of as elements of the ring of one-sided Laurent series, and suppose that deg f<deg g. The quotient fÂg is badly approximable if all the partial quotients of the continued fraction expansion of fÂg have degree 1. We investigate the set of polynomial

The purpose of this paper is to give a complete effective solution to the problem of computing radicals of polynomial ideals over general fields of arbitrary characteristic. We prove that Seidenberg's "Condition P" is both a necessary and sufficient property of the coefficient field in order to be a

Let T n (x, a) ʦ GF(q)[x] be a Dickson polynomial over the finite field GF(q) of either the first kind or the second kind of degree n in the indeterminate x and with parameter a. We give a complete description of the factorization of T n (x, a) over GF(q).