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Irreducible component
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#	Item
1	Lectures on Zariski-type structures Part I Boris Zilber 1 Add to Reading List Source URL: people.maths.ox.ac.uk Language: English - Date: 2005-04-13 15:23:37 Algebra Abstract algebra Mathematics Algebraic geometry Zariski geometry Algebraic variety Sheaf Irreducible component Ample line bundle Valuation Type Krull dimension
2	PROPERTIES OF SCHEMES Contents 1. Introduction 2. Constructible sets 3. Integral, irreducible, and reduced schemes Add to Reading List Source URL: stacks.math.columbia.edu Language: English - Date: 2015-04-15 15:08:50 Scheme theory Commutative algebra General topology Ring theory Noetherian topological space Spectrum of a ring Zariski topology Coherent sheaf Irreducible component Abstract algebra Algebraic geometry Algebra
3	EXERCISES Contents[removed]. Add to Reading List Source URL: stacks.math.columbia.edu Language: English - Date: 2015-04-15 15:09:34 Ring theory Spectrum of a ring Ring Noetherian ring Polynomial ring Irreducible component Ideal Algebraic number field Completion Abstract algebra Algebra Commutative algebra
4	TOPOLOGY Contents 1. Introduction 2. Basic notions 3. Hausdorff spaces Add to Reading List Source URL: stacks.math.columbia.edu Language: English - Date: 2015-04-15 15:08:27 Locally connected space Irreducible component Connected space Hausdorff space Hyperconnected space Uniform space Disjoint union Product topology Continuous function Topology General topology Spectral space
5	ALGEBRAIC GEOMETRY CAUCHER BIRKAR Contents 1. Introduction 2. Affine varieties Add to Reading List Source URL: www.dpmms.cam.ac.uk Language: English - Date: 2009-06-15 09:22:43 Algebraic varieties Zariski topology Function field of an algebraic variety Regular function Projective space Rational mapping Irreducible component Projective plane Rational function Geometry Algebraic geometry Abstract algebra
6	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 Add to Reading List Source URL: www.staff.science.uu.nl Language: English - Date: 2013-12-26 23:18:31 Irreducible component Ideal Unique factorization domain Prime ideal Ring Algebraic variety Noetherian topological space Zariski topology Polynomial ring Abstract algebra Algebra Ring theory
7	IRREDUCIBILITY AND DIMENSION DRAGOS OPREA Add to Reading List Source URL: math.ucsd.edu Language: English - Date: 2008-10-10 18:28:28 Algebraic geometry Ring theory Commutative algebra Scheme theory General topology Irreducible component Algebraic variety Zariski topology Noetherian topological space Abstract algebra Algebra Mathematics
8	Generic Point. Eric Brussel, Emory University We define and prove the existence of generic points of schemes, and prove that the Add to Reading List Source URL: www.mathcs.emory.edu Language: English - Date: 2011-06-23 14:22:51 General topology Algebraic geometry Scheme theory Prime ideals Commutative algebra Irreducible component Generic point Spectrum of a ring Sober space Abstract algebra Topology Algebra

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