IV.18 Rings and Fields 1

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Date: 2013-08-02 14:07:56 Algebraic structures Ring Field Pseudo-ring Additive identity Subring Commutative ring Homomorphism Quaternion Abstract algebra Algebra Ring theory		IV.18 Rings and Fields 1 Add to Reading List Source URL: faculty.etsu.edu Download Document from Source Website File Size: 54,41 KB Share Document on Facebook

	Sean Sather-Wagstaff and Richard Wicklein* (). Codualizing Complexes. Preliminary report. Let R be a commutative, noetherian ring. A finitely generated R-module C is said to be semd DocID: 1vpxd - View Document
	Tensor products Let R be a commutative ring. Given R-modules M1 , M2 and N we say that a map b: M1 × M2 → N is R-bilinear if for all r, r0 ∈ R and module elements mi , m0i ∈ Mi we have b(r · m1 + r0 · m01 , m2 DocID: 1vhvC - View Document
	Pye Phyo Aung* (). Gorenstein Dimensions, Amalgamated Duplication of a Ring, and Pseudocanonical Covers. When E is a semidualizing module over a commutative ring, Holm and Jørgensen studie DocID: 1uVgg - View Document
	EXTERIOR POWERS KEITH CONRAD 1. Introduction Let R be a commutative ring. Unless indicated otherwise, all modules are R-modules and all tensor products are taken over R, so we abbreviate ⊗R to ⊗. A bilinear function DocID: 1u3yh - View Document
	Marcel Dekker Lecture Notes in Pure and Applied Mathematics), pagesCONTROLLING THE ZERO DIVISORS OF A COMMUTATIVE RING SARAH GLAZ DocID: 1u1Lp - View Document