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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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		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 Download Document from Source Website File Size: 777,24 KB Share Document on Facebook

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