Valuation ring

Results: 104



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51Module Theory, Seattle 1977, Lecture Notes in Math. No. 700, Springer-Verlag (1979), 46–56. ON UNIVERSAL LOCALIZATION1 John A. Beachy Northern Illinois University

Module Theory, Seattle 1977, Lecture Notes in Math. No. 700, Springer-Verlag (1979), 46–56. ON UNIVERSAL LOCALIZATION1 John A. Beachy Northern Illinois University

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Source URL: www.math.niu.edu

Language: English - Date: 2014-09-29 17:50:39
52Chapter 6 Dedekind Schemes In this chapter we introduce the main protagonists of the following two chapters, namely Dedekind schemes. These will be schemes characterised by certain special properties that are common to

Chapter 6 Dedekind Schemes In this chapter we introduce the main protagonists of the following two chapters, namely Dedekind schemes. These will be schemes characterised by certain special properties that are common to

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Source URL: www.renyi.hu

Language: English - Date: 2007-09-28 04:05:10
53DEAR READERS, Wilhelm von Humboldt once said, “To have a future, one must know the past.” This quote could not ring more true for our association. Our story began in March 2005 with the formation of the Association o

DEAR READERS, Wilhelm von Humboldt once said, “To have a future, one must know the past.” This quote could not ring more true for our association. Our story began in March 2005 with the formation of the Association o

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Source URL: www.vgf-online.de

Language: English - Date: 2013-12-13 09:42:56
54DEAR READERS, Wilhelm von Humboldt once said, “To have a future, one must know the past.” This quote could not ring more true for our association. Our story began in March 2005 with the formation of the Association o

DEAR READERS, Wilhelm von Humboldt once said, “To have a future, one must know the past.” This quote could not ring more true for our association. Our story began in March 2005 with the formation of the Association o

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Source URL: www.sachwerteverband.de

Language: English - Date: 2014-03-26 10:09:12
55Chapter 10 Orderings and valuations 10.1 Ordered fields and their natural valuations

Chapter 10 Orderings and valuations 10.1 Ordered fields and their natural valuations

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Source URL: math.usask.ca

Language: English - Date: 2011-07-14 03:23:21
56Various Facets of Rings between D[X] and K[X] Muhammad Zafrullah Department of Mathematics, Idaho State University, Pocatello, ID[removed]E-mail: [removed]

Various Facets of Rings between D[X] and K[X] Muhammad Zafrullah Department of Mathematics, Idaho State University, Pocatello, ID[removed]E-mail: [removed]

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Source URL: www.lohar.com

Language: English - Date: 2005-12-29 21:29:43
57ZIEGLER SPECTRA OF VALUATION RINGS A thesis submitted to the University of Manchester for the degree of Doctor of Philosophy in the Faculty of Engineering and Physical Sciences

ZIEGLER SPECTRA OF VALUATION RINGS A thesis submitted to the University of Manchester for the degree of Doctor of Philosophy in the Faculty of Engineering and Physical Sciences

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Source URL: www.maths.manchester.ac.uk

Language: English - Date: 2011-08-02 09:30:46
58Solutions to Problems Chapter 1 1. The primary ideals are (0) and (pn ), p prime[removed]R/Q ∼ = k[y]/(y 2 ), and zero-divisors in this ring

Solutions to Problems Chapter 1 1. The primary ideals are (0) and (pn ), p prime[removed]R/Q ∼ = k[y]/(y 2 ), and zero-divisors in this ring

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Source URL: www.math.uiuc.edu

Language: English - Date: 2007-06-09 00:11:02
59Contents[removed]January 1, 2, 3: More on p-groups. January 12: K-groups for a curve over a finite field. January 15: Cohomology of GLn (Λ) where Λ is a discrete valuation ring with [Λ : Zp ] < ∞. January 17: Sp

Contents[removed]January 1, 2, 3: More on p-groups. January 12: K-groups for a curve over a finite field. January 15: Cohomology of GLn (Λ) where Λ is a discrete valuation ring with [Λ : Zp ] < ∞. January 17: Sp

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Source URL: www.claymath.org

Language: English - Date: 2014-04-29 09:26:15
60Contents[removed]January 3: Gersten’s conjecture: If A is a discrete valuation ring with residue field k, then the transfer map K∗ (k) → K∗ (A) is zero. January 6: Exact categories with a resolving full exact

Contents[removed]January 3: Gersten’s conjecture: If A is a discrete valuation ring with residue field k, then the transfer map K∗ (k) → K∗ (A) is zero. January 6: Exact categories with a resolving full exact

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Source URL: www.claymath.org

Language: English - Date: 2014-04-29 09:27:06