Topics in algebraic geometry

Taylor, Thomas P.M (1966) Topics in algebraic geometry. MSc(R) thesis, University of Glasgow.

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Abstract

The dissertation begins in Chapter I with the basic properties of an algebral variety. The Hilbort Nulletellenesiz and its important consequenses are than given; the proofs of the results on dimension are greatly simplified by appealing to a result of the next chepter. In chapter II, the longth of a primary ideal is first discussed, preparatory to the ideas of height and depth of prime ideals. The fundamental equivalence between height and depth, and rans and dimension in a finite integral domain, is the last main theorem of this chapter. The simple point on a varlety is discussed in Chapter III form a local-algebraic point of view. It is shown that simplicity corresponds to regularity of the local ring, as defined by W. Krull. Finally the Jacobisn Oriterion for a simple point of a variety is established, and we montion the extension to algebraic subvarieties.

Item Type: Thesis (MSc(R))
Qualification Level: Masters
Additional Information: Adviser: A Geddes
Keywords: Mathematics
Date of Award: 1966
Depositing User: Enlighten Team
Unique ID: glathesis:1966-72416
Copyright: Copyright of this thesis is held by the author.
Date Deposited: 24 May 2019 15:12
Last Modified: 24 May 2019 15:12
URI: https://theses.gla.ac.uk/id/eprint/72416

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