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.

85022 questions
3
votes
0 answers

Composition inverse of multivariate formal power series

Whenever a formal series $\textstyle f(X)=\sum_k f_k X^k \in R[[X]]$ has $f_0 = 0$ and $f_1$ being an invertible element of $R$, there exists a series $\textstyle g(X)=\sum_k g_k X^k$ that is the composition inverse of $f$, meaning that composing…
kswim
  • 433
3
votes
2 answers

Exact sequence and homology isomorphisms

For an exact sequence $A\rightarrow B\rightarrow C\rightarrow D\rightarrow E$ show that $C=0$ iff the map $A\rightarrow B$ is surjective and $D\rightarrow E$ is injective. For $(C=0)$ implies ($A\rightarrow B$ is surjective and $D\rightarrow E$ is…
3
votes
0 answers

When the tensor produst of modules isomorphic to the ring of homomorphisms from one to another?

As we know $\mathbb Z/n \mathbb Z \otimes_{\mathbb Z} \mathbb Z/m\mathbb Z \cong Hom(\mathbb Z/n \mathbb Z, \mathbb Z/m\mathbb Z)$. Can we generalize this result, for example, is it true that $A\otimes_{K}B \cong Hom(A,B)$, where A and B are finite…
3
votes
1 answer

Prove that a group of order $7p^n$ is not simple ($p$ is prime and $n>0$)

I have already shown that, by Sylow's third theorem, $p = 2$ or $p = 3$. I also believe that the number of $7$-Sylow subgroups should be $2^{3k}$ for $k = 0,1,2,\dots$ if $p = 2$ or $3^{6k}$ for $k = 0,1,2,\dots$ if $p = 3$. However, I don't know…
John
  • 107
3
votes
0 answers

Finding all groups with this property. (Elementary Algebra)

Suppose G is a finitely generated group and for any 3 subgroups of G at least 2 of them are comparable. Find all Groups with this property. I was found this problem on web today and It seems nice to me to think about. I know that the only finite…
A.F.23
  • 708
3
votes
2 answers

Proof that the ideal of set of polynomials is generated by its gcd

Theorem: Given $\{f_i\}_{1 \leq i \leq n}$, $f_i \in \mathbb{K}[x]$. Then the monic generator $f$ of the ideal $\langle \{f_i\} \rangle$ is $f = \gcd \{ f_i \}$. In other words: $\langle \{f_i\} \rangle = \langle \gcd \{f_i\} \rangle$ My try at a…
dami
  • 486
3
votes
1 answer

When $K[x]$ is a field?

If $K$ is a ring consisting only of zero, then $K[x]$ is a field (edit: from the comments below I learned that it's not). Are there another rings with this property? I think no. If $R$ contains $1 \neq 0$, then $1 \cdot x \in R[x]$ has no inverse…
3
votes
2 answers

Find all irreducible monic polynomials of degree 3 in $\mathbb Z/3\mathbb Z[x].$

This question gives me a good way to count them: Determine the number of irreducible monic polynomials of degree 3 in $\mathbb F_p[x]$ This question gives me a way to find them that I don't understand, since I haven't yet studied splitting fields:…
justin
  • 4,751
3
votes
1 answer

A question about the first isomorphism theorem

I tried to solve this question by the First Isomorphism Theorem but without a success. Let $m,n$ be natural numbers such that $m \mid n$. Letting $d=n/m$, prove that $m\mathbb{Z}/n\mathbb{Z}$ isomorphic to $\mathbb{Z}/d\mathbb{Z}$. I tried to find…
Ben
  • 31
3
votes
1 answer

Subgroup of procyclic group

Let $\hat{\mathbb{Z}}$ the projective limit of $\mathbb{Z}/n\mathbb{Z}$ and $H$ a subgroup of finite index. Let $K=\hat{\mathbb{Z}}/H$ (we can do it because $\hat{\mathbb{Z}}$ is commutative). Since $K$ is abelian and finite, i know that it is a…
3
votes
1 answer

Property of finite abelian groups.

Let $v$ be a positive integer. Show that if any group of order $v$ is cyclic then $v$ is not divisible by the square of a prime. This was originally an iff proof but I've proved the other direction. I have a feeling this direction should be…
3
votes
3 answers

Finding $\text{Aut}(D_3)$

The following is a problem from my algebra homework: Find all automorphisms of $D_3$ and determine which group $\text{Aut}(D_3)$ is isomorphic to. I am fairly new at abstract algebra so this problem is somewhat of a challenge. I understand that…
Kevin Sheng
  • 2,483
3
votes
3 answers

What are examples of non subgroups of the symmetric group $S_{10}$?

I am trying construct some examples of subsets of $S_{10}$ that are not subgroups? For instance would the set $\{\beta \in S_{10} : \beta(9) = 10\}$ not be a subgroup? Any examples with verifications would be great.
fr56
  • 69
3
votes
2 answers

Kernel of composition of homomorphism

Given $\theta$ is a homormophism from $G$ to $H$, and $\sigma$ is a homormophism from $H$ to $K$. How is Ker($\sigma\theta$) is related to Ker($\theta$)?If $\theta$ and $\sigma$ are onto and $G$ is finite, compute [Ker($\sigma\theta$):Ker($\theta$)]…
ghjk
  • 2,859
3
votes
3 answers

Constructing $\mathbb Q$ from $\mathbb Z$

Let $X = \{(a,b)|a,b \in \mathbb Z, b \neq 0 \}$. Define a relation $\sim$ on $X$ by $(a,b) \sim (c,d)$ iff $ad = bc $. a) I'm trying to show that ~ is an equivalence relation. So, is it reflexive? $(a,b) \sim (a,b) $ iff $ab = ab$, with $b$ not…
Buddy Holly
  • 1,189