LUP Student Papers

Description of Single Cluster Subalgebras

• Mark

Abstract

For unital and commutative algebras over an algebraically closed field, any inclusion of finite codimension can be characterised as a chain of inclusions of codimension 1. We investigate the behaviour of such chains when the said algebras are ideal subalgebras. That is, when they are sums of the base field with an ideal. So called single clustered polynomial subalgebras can be guaranteed to be contained in a particular type of ideal subalgebra and we provide a means to determine their structure. This characterisation is a direct generalisation of previous results on so called almost monomial subalgebras.

Popular Abstract

A polynomial subalgebra consists of polynomials which can be added and multiplied. Often, the structure of a subalgebra is difficult to understand, but many times it is possible to find a list of easily described conditions to determine whether a polynomial is part of an algebra or not. We propose a method of finding these conditions for a special type called single clustered subalgebras. The method is a generalisation of solving the same problem on so called zero spectrum subalgebras.