On Minimal Generating Sets of Splitting Field and Cluster Towers
Abstract
The concept of cluster towers was introduced by the second author and Krithika in [4] along with a question which was answered by the first author and Bhagwat in [1]. In this article we introduce the concept of minimal generating sets of splitting field and connect it to the concept of cluster towers. We establish that there exist infinitely many irreducible polynomials over rationals for which the splitting field has two extreme minimal generating sets (one of given cardinality and other of minimum cardinality) and for which we have two extreme cluster towers (one of given length and other of minimum length). We prove interesting properties of cluster tower associated with minimal generating set that we constructed in proof of the theorem and as a consequence get that degree sequence depends on the ordering even when we work with minimal generating set. We also establish an equivalent condition for a set to be minimum minimal generating set for a certain family of polynomials over rationals and count the total number of minimum minimal generating sets.