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The Global ETD Search service is a free service for researchers
to find electronic theses and dissertations. This service is
provided by the
Networked Digital Library of Theses and Dissertations.
Our metadata is collected from universities around the world. If you manage a university/consortium/country archive and want to be added, details can be found on the NDLTD website.
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Showing 21 to 30 of 85 (0.014 seconds)| 21 |
A functional analytic approach to the power series solutions of an HIVmodelXu, Liang, 许亮 January 2010 (has links)
published_or_final_version / Mathematics / Master / Master of Philosophy
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ALGEBRAIC PROPERTIES OF FORMAL POWER SERIES COMPOSITIONBrewer, Thomas S 01 January 2014 (has links)
The study of formal power series is an area of interest that spans many areas of mathematics. We begin by looking at single-variable formal power series with coefficients from a field. By restricting to those series which are invertible with respect to formal composition we form a group. Our focus on this group focuses on the classification of elements having finite order. The notion of a semi-cyclic group comes up in this context, leading to several interesting results about torsion subgroups of the group. We then expand our focus to the composition of multivariate formal power series, looking at similar questions about classifying elements of finite order. We end by defining a natural automorphism on this group induced by a group action of the symmetric group.
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Das Koeffizientenproblem der in der mehrdimensionalen Einheitsvollsphäre unimodular beschränkten FunktionenGross, Ekkehard. January 1974 (has links)
Thesis--Bonn. / Cover title. Vita. Includes bibliographical references (p. 106-111).
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Das Koeffizientenproblem der in der mehrdimensionalen Einheitsvollsphäre unimodular beschränkten FunktionenGross, Ekkehard. January 1974 (has links)
Thesis--Bonn. / Cover title. Vita. Includes bibliographical references (p. 106-111).
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Optimally Clean RingsShifflet, Daniel R. 29 June 2011 (has links)
No description available.
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Transcendence degree in power series ringsBoyd, David Watts 13 May 2010 (has links)
Let D[[X]] be the ring of formal power series over the commutative integral domain D. Gilmer has shown that if K is the quotient field of D, then D[[X]] and K[[X]] have the same quotient field if and only if K[[X]] ~ D[[X]]D_(O). Further, if a is any nonzero element of D, Sheldon has shown that either D[l/a][[X]] and D[[X]] have the same quotient field, or the quotient field of D[l/a][[X]] has infinite transcendence degree over the quotient field of D[[X]]. In this paper, the relationship between D[[X]] and J[[X]] is investigated for an arbitrary overring J of D. If D is integrally closed, it is shown that either J[[X]] and D[[X]] have the same quotient field, or the quotient field of J[[X]] has infinite transcendence degree over the quotient field of D[[X]]. It is shown further, that D is completely integrally closed if and only if the quotient field of J[[X]] has infinite transcendence degree over the quotient field of D[[X]] for each proper overring J of D. Several related results are given; for example, if D is Noetherian, and if J is a finite ring extension of D, then either J[[X]] and D[[X]] have the same quotient field or the quotient field of J[[X]] has infinite transcendence degree over the quotient field of D[[X]]. An example is given to show that if D is not integrally closed, J[[X]] may be algebraic over D[[X]] while J[[X]] and ~[[X]] have dif~erent quotient fields. / Ph. D.
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An Investigation of Points About the Circle of ConvergenceGray, Brucy Clothus 08 1900 (has links)
This paper will be concerned with the convergence of complex power series.
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Parametrizing finite order automorphisms of power series ringsBasson, Dirk (Dirk Johannes) 12 1900 (has links)
Thesis (MSc (Mathematics))--University of Stellenboswch, 2010. / ENGLISH ABSTRACT: In the work of Green and Matignon it was shown that the Oort-Sekiguchi
conjecture is equivalent to a local question of lifting automorphisms of power
series rings. The Oort-Sekiguchi conjecture asks when an algebraic curve
in characteristic p can be lifted to a relative curve in characteristic 0, while
keeping the same automorphism group. The local formulation asks when an
automorphism of a power series ring over a field k of characteristic p can be
lifted to an automorphism of a power series ring over a discrete valuation
ring with residue field k of the same order as the original automorphism.
This thesis looks at the local formulation and surveys many of the results
for this case. At the end it presents a new theorem giving a Hensel's Lemma
type sufficient condition under which lifting is possible. / AFRIKAANSE OPSOMMING: Green en Matignon het bewys dat die Oort-Sekiguchi vermoede ekwivalent
is aan `n lokale vraag oor of outomorfismes van magsreeksringe gelig kan
word. Die Oort-Sekiguchi vermoede vra of `n algebra ese kromme in karakteristiek
p gelig kan word na `n relatiewe kromme in karakteristiek 0, terwyl
dit dieselfde outomorfisme groep behou. Die lokale vraag vra wanneer
`n outomorfisme van `n magsreeksring oor `n liggaam k van karakteristiek
p gelig kan word na `n outomorfisme van `n magsreeksring oor `n diskrete
waarderingsring met residuliggaam k, terwyl dit dieselfde orde behou as die
aanvanklike outomorfisme.
Hierdie tesis fokus op die lokale vraag en bied `n opsomming van baie
bekende resultate vir hierdie geval. Aan die einde word `n nuwe stelling
aangebied wat voorwaardes stel waaronder hierdie vraag positief beantwoord
kan word.
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Weighted Finite Automata over Strong BimonoidsDroste, Manfred, Stüber, Torsten, Vogler, Heiko 13 December 2018 (has links)
We investigate weighted finite automata over strings and strong bimonoids. Such algebraic structures satisfy the same laws as semirings except that no distributivity laws need to hold. We define two different behaviors and prove precise characterizations for them if the underlying strong bimonoid satisfies local finiteness conditions. Moreover, we show that in this case the given weighted automata can be determinized.
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Continuation of Real Functions Defined by Power SeriesStrickland, Warren, G. 08 1900 (has links)
This thesis looks at power series, particularly in the areas of: radius of convergence, properties of functions represented by power series, algebra of power series, and Taylor's Theorem and continuation by means of power series.
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