Locally nilpotent derivations of polynomial rings.

dc.contributor.advisorDaigle, Daniel,
dc.contributor.authorWang, Zhiqing.
dc.date.accessioned2009-03-23T17:25:47Z
dc.date.available2009-03-23T17:25:47Z
dc.date.created1999
dc.date.issued1999
dc.degree.levelDoctoral
dc.description.abstractLet k be a field of characteristic 0. We classify locally nilpotent derivations D : k[ X, Y, Z] → k[X, Y, Z] satisfying D2X = D2 Y = 0; in particular, it is proved that every k-derivation D satisfying D 2X = D2Y = D2Z = 0 is essentially a partial derivative. Then we study three classes of k-derivations D : k [X1,..., Xn] → k [X 1,...Xn], namely the elementary , constructible and nice derivations. We note the simple fact that elementary ⇒ constructible ⇒ nice, and we investigate under which conditions the converses hold. We find that if n = 3 then all three notions are the same; in dimension 4, if D is irreducible then constructible is equivalent to elementary; in dimension 5, there is an example which is constructible, irreducible but not elementary. Another result states that rank D ≤ n -- 2 holds for all constructible derivations and all n ≥ 3.
dc.format.extent60 p.
dc.identifier.citationSource: Dissertation Abstracts International, Volume: 61-04, Section: B, page: 1988.
dc.identifier.isbn9780612481190
dc.identifier.urihttp://hdl.handle.net/10393/8474
dc.identifier.urihttp://dx.doi.org/10.20381/ruor-7327
dc.publisherUniversity of Ottawa (Canada)
dc.subject.classificationMathematics.
dc.titleLocally nilpotent derivations of polynomial rings.
dc.typeThesis

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