Describing Finite Codimensional Polynomial Subalgebras Using Partial Derivatives
(2022) In Master's Theses in Mathematical Sciences FMAM05 20221Mathematics (Faculty of Engineering)
- Abstract
- In this text we continue the work of describing subalgebras of K[x] of finite codimension that was started in Describing subalgebras of K[x] using derivatives. In the referenced paper, the authors present how univariate subalgebras can be described by conditions based on evaluations in certain scalars, and proceed to develop a large theoretical framework to understand the nature of such conditions. The purpose of this thesis is to generalize as many of their results as possible to the multivariate setting K[x]. We include generalized definitions of the type, spectrum, clusters, α-derivations, and α, β-evaluation subtractions. We also state and prove generalizations of most of the theorems relating to the spectrum, clusters, α-derivation... (More)
- In this text we continue the work of describing subalgebras of K[x] of finite codimension that was started in Describing subalgebras of K[x] using derivatives. In the referenced paper, the authors present how univariate subalgebras can be described by conditions based on evaluations in certain scalars, and proceed to develop a large theoretical framework to understand the nature of such conditions. The purpose of this thesis is to generalize as many of their results as possible to the multivariate setting K[x]. We include generalized definitions of the type, spectrum, clusters, α-derivations, and α, β-evaluation subtractions. We also state and prove generalizations of most of the theorems relating to the spectrum, clusters, α-derivation spaces, as well as the Main Theorem. We also give a couple of new results pertaining to how α-derivation spaces behave when we apply subalgebra conditions on clusters not containing α. (Less)
- Popular Abstract
- Mathematicians like to study different kinds of structures, and this thesis is concerned with one structure in particular, Polynomial Algebras. The main purpose of the thesis is to develop a new method for describing such algebras; by using of conditions.
Please use this url to cite or link to this publication:
http://lup.lub.lu.se/student-papers/record/9093857
- author
- Leffler, Erik LU
- supervisor
- organization
- course
- FMAM05 20221
- year
- 2022
- type
- H2 - Master's Degree (Two Years)
- subject
- keywords
- Algebra Polynomial Derivations alpha-Derivations SAGBI Basis
- publication/series
- Master's Theses in Mathematical Sciences
- report number
- LUTFMA-3484-2022
- ISSN
- 1404-6342
- other publication id
- 2022:E42
- language
- English
- id
- 9093857
- date added to LUP
- 2022-08-15 13:00:33
- date last changed
- 2022-08-15 13:00:33
@misc{9093857,
abstract = {{In this text we continue the work of describing subalgebras of K[x] of finite codimension that was started in Describing subalgebras of K[x] using derivatives. In the referenced paper, the authors present how univariate subalgebras can be described by conditions based on evaluations in certain scalars, and proceed to develop a large theoretical framework to understand the nature of such conditions. The purpose of this thesis is to generalize as many of their results as possible to the multivariate setting K[x]. We include generalized definitions of the type, spectrum, clusters, α-derivations, and α, β-evaluation subtractions. We also state and prove generalizations of most of the theorems relating to the spectrum, clusters, α-derivation spaces, as well as the Main Theorem. We also give a couple of new results pertaining to how α-derivation spaces behave when we apply subalgebra conditions on clusters not containing α.}},
author = {{Leffler, Erik}},
issn = {{1404-6342}},
language = {{eng}},
note = {{Student Paper}},
series = {{Master's Theses in Mathematical Sciences}},
title = {{Describing Finite Codimensional Polynomial Subalgebras Using Partial Derivatives}},
year = {{2022}},
}