Zariski topology

Results: 41



#Item
21Zariski Geometries Geometry from the logician’s point of view Boris Zilber 20 March 2009

Zariski Geometries Geometry from the logician’s point of view Boris Zilber 20 March 2009

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Source URL: people.maths.ox.ac.uk

Language: English - Date: 2009-04-06 06:28:36
22Index absolutely convergent, 119 affine change of coordinates, 11 affine space, 197 affine variety, 213

Index absolutely convergent, 119 affine change of coordinates, 11 affine space, 197 affine variety, 213

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Source URL: www.ams.org

Language: English - Date: 2013-01-02 12:00:08
23Introduction to projective varieties by Enrique Arrondo(*) Version of September 5, 2007 This is still probably far from being a final version, especially since I had no time yet to complete the second part (which is so

Introduction to projective varieties by Enrique Arrondo(*) Version of September 5, 2007 This is still probably far from being a final version, especially since I had no time yet to complete the second part (which is so

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Source URL: www.mat.ucm.es

Language: English - Date: 2011-11-04 16:04:46
24ALGEBRAIC GEOMETRY CAUCHER BIRKAR Contents 1. Introduction 2. Affine varieties

ALGEBRAIC GEOMETRY CAUCHER BIRKAR Contents 1. Introduction 2. Affine varieties

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Source URL: www.dpmms.cam.ac.uk

Language: English - Date: 2009-06-15 09:22:43
25Algebraic Geometry I Fall 2013 Eduard Looijenga Rings are always supposed to possess a unit element 1 and a ring homomorphism will always take unit to unit. We allow that 1 = 0, but in that case we get of course the zer

Algebraic Geometry I Fall 2013 Eduard Looijenga Rings are always supposed to possess a unit element 1 and a ring homomorphism will always take unit to unit. We allow that 1 = 0, but in that case we get of course the zer

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Source URL: www.staff.science.uu.nl

Language: English - Date: 2013-12-26 23:18:31
26WEIL AND GROTHENDIECK APPROACHES TO ADELIC POINTS BRIAN CONRAD 1. Introduction In [We, Ch. 1], Weil defines a process of “adelization” of algebraic varieties over global fields. There is an alternative procedure, due

WEIL AND GROTHENDIECK APPROACHES TO ADELIC POINTS BRIAN CONRAD 1. Introduction In [We, Ch. 1], Weil defines a process of “adelization” of algebraic varieties over global fields. There is an alternative procedure, due

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Source URL: math.stanford.edu

Language: English - Date: 2012-01-01 00:29:29
27BULLETIN (New Series) OF THE AMERICANMATHEMATICALSOCIETY Volume 28, Number 2, April 1993 ZARISKI GEOMETRIES EHUD HRUSHOVSKI AND BORIS ZILBER

BULLETIN (New Series) OF THE AMERICANMATHEMATICALSOCIETY Volume 28, Number 2, April 1993 ZARISKI GEOMETRIES EHUD HRUSHOVSKI AND BORIS ZILBER

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Source URL: www.ams.org

Language: English - Date: 2010-03-29 15:28:13
28Morphism of Varieties Morphism of Varieties Nagaraj, D. S. (IMSc, Chennai) Institute of Mathematical Sciences

Morphism of Varieties Morphism of Varieties Nagaraj, D. S. (IMSc, Chennai) Institute of Mathematical Sciences

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Source URL: www.ias.ac.in

Language: English - Date: 2011-12-13 09:58:11
29Lectures on Algebraic Groups Dipendra Prasad Notes by Shripad M. Garge 1. Basic Affine Algebraic Geometry We begin these lectures with a review of affine algebraic geometry.

Lectures on Algebraic Groups Dipendra Prasad Notes by Shripad M. Garge 1. Basic Affine Algebraic Geometry We begin these lectures with a review of affine algebraic geometry.

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Source URL: www.math.tifr.res.in

Language: English - Date: 2007-02-23 14:08:03
30Course 311: Commutative Algebra and Algebraic Geometry Problems Academic year 2007–8 1. (a) Show that the cubic curve {(t, t2 , t3 ) ∈ A3 (R) : t ∈ R} is an algebraic set. (b) Show that the cone {(s cos t, s sin t,

Course 311: Commutative Algebra and Algebraic Geometry Problems Academic year 2007–8 1. (a) Show that the cubic curve {(t, t2 , t3 ) ∈ A3 (R) : t ∈ R} is an algebraic set. (b) Show that the cone {(s cos t, s sin t,

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Source URL: www.maths.tcd.ie

Language: English - Date: 2008-01-31 11:03:39