Ideals (ring theory) | Ring theory
In mathematics, especially ring theory, a regular ideal can refer to multiple concepts. In operator theory, a right ideal in a (possibly) non-unital ring A is said to be regular (or modular) if there exists an element e in A such that for every . In commutative algebra a regular ideal refers to an ideal containing a non-zero divisor. This article will use "regular element ideal" to help distinguish this type of ideal. A two-sided ideal of a ring R can also be called a (von Neumann) regular ideal if for each element x of there exists a y in such that xyx=x. Finally, regular ideal has been used to refer to an ideal J of a ring R such that the quotient ring R/J is von Neumann regular ring. This article will use "quotient von Neumann regular" to refer to this type of regular ideal. Since the adjective regular has been overloaded, this article adopts the alternative adjectives modular, regular element, von Neumann regular, and quotient von Neumann regular to distinguish between concepts. (Wikipedia).
Ideals in Ring Theory (Abstract Algebra)
An ideal of a ring is the similar to a normal subgroup of a group. Using an ideal, you can partition a ring into cosets, and these cosets form a new ring - a "factor ring." (Also called a "quotient ring.") After reviewing normal subgroups, we will show you *why* the definition of an ide
From playlist Abstract Algebra
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We give the definition of a normal subgroup and give some examples. http://www.michael-penn.net http://www.randolphcollege.edu/mathematics/
From playlist Abstract Algebra
Linear Algebra for Computer Scientists. 10. The Standard Basis
This computer science video is one of a series on linear algebra for computer scientists. In this video you will learn about the standard basis, otherwise known as the natural basis. The standard basis is an orthonormal set of vectors which can be used in linear combination to easily cre
From playlist Linear Algebra for Computer Scientists
Every vector is a linear combination of the same n simple vectors!
Learning Objectives: 1) Identify the so called "standard basis" vectors 2) Geometrically express a vector as linear combination of the standard basis vectors 3) Algebraically express a vector as a linear combination of the standard basis vectors 4) Express a vector as a matrix-vector produ
From playlist Linear Algebra (Full Course)
RNT1.4. Ideals and Quotient Rings
Ring Theory: We define ideals in rings as an analogue of normal subgroups in group theory. We give a correspondence between (two-sided) ideals and kernels of homomorphisms using quotient rings. We also state the First Isomorphism Theorem for Rings and give examples.
From playlist Abstract Algebra
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From playlist Linear Algebra Ch 6
Math 060 Linear Algebra 31 112614: Normal Matrices
Normal matrices: characterization of unitarily diagonalizable matrices.
From playlist Course 4: Linear Algebra
R. Lazarsfeld: The Equations Defining Projective Varieties. Part 2
The lecture was held within the framework of the Junior Hausdorff Trimester Program Algebraic Geometry. (9.1.2014)
From playlist HIM Lectures: Junior Trimester Program "Algebraic Geometry"
Commutative algebra 61: Examples of regular local rings
This lecture is part of an online course on commutative algebra, following the book "Commutative algebra with a view toward algebraic geometry" by David Eisenbud. We give some examples of regular local rings. We first give an example of a regular local ring that is not geometrically regul
From playlist Commutative algebra
Sarah Reznikoff: Regular ideals and regular inclusions
Talk in Global Noncommutative Geometry Seminar (Europe) on April 20, 2022
From playlist Global Noncommutative Geometry Seminar (Europe)
Commutative algebra 60: Regular local rings
This lecture is part of an online course on commutative algebra, following the book "Commutative algebra with a view toward algebraic geometry" by David Eisenbud. We define regular local rings as the local rings whose dimension is equal to the dimension of their cotangent space. We give s
From playlist Commutative algebra
Commutative algebra 66: Local complete intersection rings
This lecture is part of an online course on commutative algebra, following the book "Commutative algebra with a view toward algebraic geometry" by David Eisenbud. We define local complete intersection rings as regular local rings divided by a regular sequence. We give a few examples to il
From playlist Commutative algebra
R. Lazarsfeld: The Equations Defining Projective Varieties. Part 1
The lecture was held within the framework of the Junior Hausdorff Trimester Program Algebraic Geometry. (7.1.2014)
From playlist HIM Lectures: Junior Trimester Program "Algebraic Geometry"
algebraic geometry 24 Regular functions
This lecture is part of an online algebraic geometry course, based on chapter I of "Algebraic geometry" by Hartshorne. It covers regular functions on affine and quasiprojective varieties.
From playlist Algebraic geometry I: Varieties
Commutative algebra 62: Cohen Macaulay local rings
This lecture is part of an online course on commutative algebra, following the book "Commutative algebra with a view toward algebraic geometry" by David Eisenbud. We define Cohen-Macaulay local rings, and give some examples of local rings that are Cohen-Macaualy and some examples that are
From playlist Commutative algebra
Chi-Keung Ng: Ortho-sets and Gelfand spectra
Talk by Chi-Keung Ng in Global Noncommutative Geometry Seminar (Europe) http://www.noncommutativegeometry.nl/ncgseminar/ on June 9, 2021
From playlist Global Noncommutative Geometry Seminar (Europe)
Duality in Algebraic Geometry by Suresh Nayak
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From playlist Dualities in Topology and Algebra (Online)
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http://www.freemathvideos.com In this video playlist I show you how to solve different math problems for Algebra, Geometry, Algebra 2 and Pre-Calculus. The video will provide you with math help using step by step instruction. Math help tutorials is just what you need for completing your
From playlist Vectors