Questions tagged [abstract-algebra]

For questions about monoids, groups, rings, modules, fields, vector spaces, algebras over fields, various types of lattices, and other such algebraic objects. Associate with related tags like [group-theory], [ring-theory], [modules], etc. as necessary to clarify which topic of abstract algebra is most related to your question and help other users when searching.

Abstract algebra is the study of algebraic objects, i.e. sets endowed with one or more operations on the elements of those sets. In particular, the study of abstract algebra considers the algebraic structures and properties of which such operations induce. It can be considered as the generalization of the study of the algebraic structure of the integers and real numbers (arithmetic), or the study of matrices and vector spaces (linear algebra).

Some algebraic objects are monoids, groups, rings, fields, vector spaces, modules, algebras, and categories, among many other less prominent objects.

Examples

  1. The set of non-negative integers $\mathbb{N} = \{0,1,2,3,\dotsc\}$ is a monoid under the operation $+$.

  2. The integers $\mathbb{Z} = \{\dotsc,-1,0,1,\dotsc\}$ under the binary operation of $+$ form a group.

  3. Furthermore, $\mathbb{Z}$ has the structure of a ring when you consider it as being equipped with both addition and multiplication.

  4. The real numbers $\mathbb{R}$ with their usual addition and multiplication form a field.

  5. The set of $n\times n$ matrices with entries in $\mathbb{R}$ with matrix addition and multiplication form a ring.

  6. The set of $1\times n$ vectors over the real numbers, with vector addition, and multiplication by elements of the $n\times n$ real matrices on the right are an example of a module for the ring of matrices.

In addition to studying the objects themselves, abstract algebra considers homomorphisms between the objects and various constructions and tools, which are useful for studying the objects.

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A question about Non-Abelian Tensor Product

Recently, I read an old paper "Some computations of Non-Abelian Tensor Products of Groups" By R. Brown, D.L Johnson and E.F Robertson. There are some assumptions to construct this structure. They pointed that : "Let $G$ and $H$ be groups which acts…
Mikasa
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Can I derive $i^2 \neq 1$ from a presentation $\langle i, j \mid i^4 = j^4 = 1, ij = j^3 i\rangle$ of Quaternion group $Q$?

(This question is related to the previous post I've posted few hours ago: (Dummit's AA, 1.5, P3) Are these presentations of the Quarternion group equivalent?) I was trying to prove that the presentation $$\langle i, j \mid i^4 = j^4 = 1, ij = j^3…
le4m
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Since the radical of the ideal $I=(x, y^2)$ in $\mathbb{Q}[x, y]$ is $(x, y)$, then $I$ is a primary ideal that is not a power of a prime ideal.

I've been doing the exercises from Section 9.1 of Dummit and Foote and got stuck on the following problem: Show that the radical of the ideal $I=(x, y^2)$ in $\mathbb{Q}[x, y]$ is $(x, y)$. Deduce that $I$ is a primary ideal that is not a power of…
Will199
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The form of maximal ideal in the real polynomial ring $\mathbb R[x,y]$

Every maximal ideal of the real polynomial ring $\mathbb R[x,y]$ is of the form $(x-a, y-b)$ for some $a,b \in \mathbb R$. True or false? Any suggestions?
Yeyeye
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Is it possible to construct Euclidean function from a Euclidean Domain?

Suppose that we have a Euclidean Domain as a ring, but we are not given a Euclidean function. We know that the ring is a Euclidean Domain. We have an oracle for +, . and whether a/b. Can we construct a computable function v, that will satisfy the…
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What exactly do elements of $F[x] / (f(x))$ look like?

For the field $F$, integral domain $F[x]$, some element $c$ which is not contained in $F$ and the minimal polynomial of $c$, $f(x)$ I know that we have the isomorphism $$ F(c) \cong F[x] / (f(x)) $$ where $(f(x))$ is the ideal generated by the…
Billy Bob
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The number of zero divisors

I'm interested whether there are (i'm sure there are!) some facts about how many zero-divisors might be in rings with certain properties. For example is there any connection between the cardinality of the ring and the cardinality of the set of its…
Igor
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which of the following statements are true in ring theory

which of the following statements are true in ring theory? (a) Let $R$ is a commutative ring with unity and $I$ be an ideal. Then $R/I$ is an integral domain. (b) If $R$ is a commutative ring with unity the units of $R[x]$ are the units in…
kable
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Normal subgroups and cosets

Let $N$ be a subgroup of a group $G$. Suppose that, for each $a$ in $G$, there exists $a, b$ in $G$ such that $Na=bN$. Prove that $N$ is a normal subgroup. Attack: I found $b^{-1}N$ = $Na^{-1}$ but I am stuck! Any help will be appreciated
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Normal subgroup of a normal subgroup

Let $F,G,H$ be groups such that $F\trianglelefteq G \trianglelefteq H$. I am asked whether we necessarily have $F\trianglelefteq H$. I think the answer is no but I cannot find any counterexample with usual groups. Is there a simple case where this…
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Are two polynomials which take the same values when evaluated equal?

Two polynomials are considered equal if they have equal coefficients of corresponding powers of the independent variable, after like terms are combined. If two polynomials are equal in this sense, then they are equal as functions; i.e., they give…
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Show the G is not simple group for $\vert G \vert =160$

As I said in the title, the question requires $G$ is not simple with the $\vert G \vert =160$. But All the the solution I've looked, it only considered the case for the Sylow 2 group case. So I tried different ways to show not simple taking the…
se-hyuck yang
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let $f (x) = x^p - a \in F[x]$. Show that $f (x)$ is irreducible over $F$ or $f (x)$ splits in $F$.

Let $F $ be a field of characteristic $p$ and let $f (x) = x^p - a \in F[x]$. Show that $f (x)$ is irreducible over $F$ or $f (x)$ splits in $F$. I am completely stuck on it.can someone help me please .thanks for your help
ubuntu
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show that $\phi(x) = 1$ if $x$ is a unit in an integral domain

Suppose $D$ is an integral domain and that $\phi$ is a nonconstant function from $D$ to the nonnegative integers such that $\phi(xy) = \phi(x)\phi(y)$. If $x$ is a unit in $D$, show that $\phi(x) = 1$.
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Determine all subgroups of $\mathbb{R}^*$ that have finite index.

Determine all subgroups of $\mathbb{R}^*$ that have finite index. How can I able to solve this? Can anybody help me please? Thanks for your time.
haltui
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