On Clifford A-algebras and a framework for localization of A-modules
Nowadays, Clifford A-algebras are hot areas of research due to their applicability to di erent disci- plines; capacity to create relationship between quadratic and linear A-morphisms; and relation to tensor A-algebras. In this work, we investigate the commutative property of the Cli ord functor on...
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| Language: | en |
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2015
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| Online Access: | http://hdl.handle.net/2263/45954 Yizengaw, BY 2015, On Clifford A-algebras and a framework for localization of A-modules, PhD Thesis, University of Pretoria, Pretoria, viewed yymmdd <http://hdl.handle.net/2263/45954> |
| Summary: | Nowadays, Clifford A-algebras are hot areas of research due to their applicability to di erent disci-
plines; capacity to create relationship between quadratic and linear A-morphisms; and relation to
tensor A-algebras. In this work, we investigate the commutative property of the Cli ord functor on
sheaves of Cli ord algebras, the natural ltration of Cli ord A-algebras, and localization of vector
sheaves; out of which two papers are extracted for publication [43], [44]. To present the thesis in a
coherent way, we organize the thesis in ve chapters.
Chapter 1 is a part where relevant classical results are reviewed. Chapter 2 covers basic results
on Cli ord A-algebras of quadratic A-modules (which are of course results obtained by Prof. PP
Ntumba [42]).
In Chapter 3, we discuss the commutativity of the Cli ord functor Cl and the algebra extension
functor (through the tensor product) of the ground algebra sheaf A of a quadratic A-module (E; q).
We also observe the existence of an isomorphism between the functors S1 and (S1A)
{. As
a particular case, we show the commutativity of the Cli ord functor Cl and the localization functor
S1. A discussion about the localization of A-modules at prime ideal subsheaves and at subsheaves
induced by maximal ideals is also included.
In Chapter 4, we study two main A-isomorphisms of Cli ord A-algebras: the main involution and
the anti-involution A-isomorphisms, which split Cli ord A-algebras into even sub-A-algebras and
sub-A-modules of odd products. Next, we give a de nition for the natural ltration of Cli ord A-
algebras and show that for every A-algebra sheaf E, endowed with a regular ltration, one obtains
a new graded A-algebra sheaf, denoted Gr(E), which turns out to be A-isomorphic to E. A conclusive remark and list of research topics that can be addressed in connection with this research
do appear in Chapter 5. === Thesis (PhD)--University of Pretoria, 2015. === tm2015 === Mathematics and Applied Mathematics === PhD === Unrestricted |
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