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
4
votes
0 answers

Define cosine naturally

I'd like to make up a definition of cosine with certain properties of "naturalness". Here is a sketch of the line I wish to follow and I'm hoping someone can state this in a mathematically formal way and fill the holes in the definition. It would be…
Gere
  • 2,117
4
votes
1 answer

Intersection points of curves

In my lecture notes there is the following example for intersection points of curves: $$F(x, y, z)=xz^3-y^4 \\ G(x, y, z)=xz^2-y^3$$ in $\mathbb{P}^2(\mathbb{C})$, where $\mathbb{P}^2(\mathbb{C})=U_2 \cup H$ where $U_2=\{[x, y, 1] | x, y \in…
user175343
4
votes
2 answers

how to determine End$(\mathbb{Q},+)$

I think every homomorphism is determined by the map of $ \operatorname{id} $. So End$(\mathbb{Q},+)$ is isomorphic to $\mathbb{Q}$ but I am not sure it's right.
4
votes
3 answers

Generalization of irreducibility test .

Are there any other tests other than Eisenstein's general irreducibility test . And i wonder if it is possible to extend it to more than one variable . looking forward to get some response.
Theorem
  • 7,979
4
votes
1 answer

Proving a subset is closed under a binary operation on a set

Suppose that $*$ is an associative and commutative binary operation on a set $S$. Let $H=\{a\in S\mid a*a=a\}$. Show that $H$ is closed under $*$. I started this problem by listing the definitions of * being commutative and associate. So I let…
user23793
  • 1,243
4
votes
4 answers

Does There Exist of a Unique Group Homomorphism between the Additive Groups $(\mathbb{Q},+)$ and $(\mathbb{Z},+)$: $\mathbb{Q}\rightarrow\mathbb{Z}$?

Note (!) I have no confidence in the solution I'm putting forth here. I had this question on an algebra exam and I would like to ask: Is my conclusion is correct? Is there a better way to go about this? Am I allowed to multiply $\varphi(x)$ by…
Nobody
  • 999
4
votes
1 answer

Finite subgroups of $SO(3)$ for specific elements

My task: Describe all finite subgroups of SO(3) that contain the elements $$ H:= \begin{bmatrix} -1 & 0 & 0 \\ 0 & -1 & 0 \\ 0 & 0 & 1 \\ \end{bmatrix} \qquad \text{and} \qquad G:= \begin{bmatrix} -1 & 0 & 0 \\ 0 & 1 & 0 \\ 0 & 0 & -1…
user185346
4
votes
2 answers

what is the set $\mathbb R[X]$ defined as?

Can someone quickly tell me what the set $\mathbb R[X]$ is defined as, where $\mathbb R$ is the set of real numbers? Is it $$\mathbb R[X]=\{ a_nX^n+.........+a_1X+a_0\mid a_n,...,a_0 \in\mathbb R\}$$? but I do not know what n is? is it a natural…
snowman
  • 3,733
  • 8
  • 42
  • 73
4
votes
1 answer

Is there a criterion for $S+T$ to be a subrng?

Here is a criterion for group Let $G$ be a group and $H,K$ be subgroups of $G$. Then, $HK$ is a subgroup of $G$ iff $HK=KH$. Just like this, I'm curious to know whether there is a similar criterion for rng That is: Let $R$ be an rng and $S,T$ be…
cococomi
  • 319
4
votes
1 answer

Are there anything wrong in the following proofs

Problem 1 Let $\left(S,\circ\right)$ be a semigroup. If for any $a$ and $b$ the equations $a\circ x=b$ and $y\circ a=b$ has a solution then show that $\left(S,\circ\right)$ is a group. Proof We use the following definition of a group. A binary…
user170039
4
votes
2 answers

Why is $Z_2 \times Z_3 \times Z_4$ not isomorphic to $Z_{24}$?

Why is $Z_2 \times Z_3 \times Z_4$ not isomorphic to $Z_{24}$? I had written this as a step in solving a problem on my math exam, and my teacher marked it as incorrect. But I'm not sure as to why it's wrong, because $2$, $3$ and $4$ share no…
4
votes
1 answer

What is a basis in a semivector space?

Let $S$ be a semifield, that is an algebraic structure satisfiying all field axioms except (perhaps) the existence of additive inverses. A semivector space is a semimodule (a module without additive inverses) over a semifield. Let $V$ be a…
user23211
4
votes
2 answers

A group with trivial abelianization and a subgroup isomorphic to $\mathbb{Z} \times \mathbb{Z}$

Is there a group with trivial abelianization having as subgroup a group isomorphic to $\mathbb{Z} \times \mathbb{Z}$?
Antonio Alfieri
  • 1,555
  • 7
  • 13
3
votes
2 answers

Maximal subgroups of $\mathbb{Q}$

I have to prove that the group $(\mathbb{Q},+)$ hasn't got any maximal subgroup. Let $H$ be a maximal subgroup of $G=\mathbb{Q}$. So $H$ is normal in $G$ and I can consider the quotient group $G/H$. My idea is the following: if I prove 1) this…
3
votes
3 answers

If $H\leq G$ and $[G: H]=k$ then there exists a homomorphism $\varphi:G\longrightarrow S_k$?

Suppose $H\leq G$ and $[G: H]=k$ for some positive integer $k$. How can I show there exists a homomorphism $\varphi:G\longrightarrow S_k$ such that $\textrm{ker}(\varphi)\leq H$? Notation: Here $S_k$ is the group of permutations of the first $k$…
PtF
  • 9,655