Polynomial identity ring

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1INTRODUCTION TO ALGEBRAIC GEOMETRY STEVEN DALE CUTKOSKY Throughout these notes all rings will be commutative with identity. k will be an algebraically closed field. 1. Preliminaries on Ring Homomorphisms Lemma 1.1. Suppo

INTRODUCTION TO ALGEBRAIC GEOMETRY STEVEN DALE CUTKOSKY Throughout these notes all rings will be commutative with identity. k will be an algebraically closed field. 1. Preliminaries on Ring Homomorphisms Lemma 1.1. Suppo

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Source URL: www.math.missouri.edu

Language: English - Date: 2012-05-02 14:27:36
2Course 311, Part III: Commutative Algebra Problems Michaelmas Term[removed]Let R be a unital commutative ring (i.e., a commutative ring with a non-zero multiplicative identity element, denoted by 1, which satisfies 1x =

Course 311, Part III: Commutative Algebra Problems Michaelmas Term[removed]Let R be a unital commutative ring (i.e., a commutative ring with a non-zero multiplicative identity element, denoted by 1, which satisfies 1x =

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Source URL: www.maths.tcd.ie

Language: English - Date: 2006-03-16 12:03:53
3RINGS WITH A POLYNOMIAL IDENTITY IRVING KAPLANSKY 1. Introduction. In connection with his investigation of projective planes, M. Hall [2, Theorem 6.2]* proved the following theorem: a division ring D in which the identit

RINGS WITH A POLYNOMIAL IDENTITY IRVING KAPLANSKY 1. Introduction. In connection with his investigation of projective planes, M. Hall [2, Theorem 6.2]* proved the following theorem: a division ring D in which the identit

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Source URL: www.ams.org

Language: English - Date: 2010-01-14 12:04:18
4R-Algebras of Linear Recurrent Sequences Umberto Cerruti and Francesco Vaccarino* Introduction Given any commutative ring R, with identity, we prove that the set of all the linear recurrent sequences in R is an R-algebra

R-Algebras of Linear Recurrent Sequences Umberto Cerruti and Francesco Vaccarino* Introduction Given any commutative ring R, with identity, we prove that the set of all the linear recurrent sequences in R is an R-algebra

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Source URL: alpha01.dm.unito.it

Language: English - Date: 2007-06-04 11:58:42
5 Serdica Math. J[removed]), [removed] ¨

Serdica Math. J[removed]), [removed] ¨

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Source URL: www.math.bas.bg

Language: English - Date: 2009-11-15 10:27:52