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
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Various definitions of Galois Groups

The situation for this question deals with the varying definitions of the Galois group of a field extension. The question is how Dummit and Foote defines the Galois group. I'll list their definition after the specific example set up. In my Algebra…
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Given $\alpha, \beta \in \bar{F}$ are separable over $F$, prove that $\alpha + \beta$ is also separable over $F$.

As the title says: Given $\alpha, \beta \in \bar{F}$ are separable over $F$, prove that $\alpha + \beta$ is also separable over $F$. I'd like a push in the right direction, not a complete answer. Thanks!
GMB
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Criterion for a group to be abelian

Let $G$ be a group of order $pq$ , where $p,q$ are primes and $p
user10444
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Give an example of an ideal that is not a subring, and a subring that is not an ideal.

Give an example of an ideal that is not a subring, and a subring that is not an ideal. For the latter part, let $\mathbb{Q}$ be a ring and consider $\mathbb{Z}$ as a subring of $\mathbb{Q}$. Then we observe that $\mathbb{Z}$ is not an ideal of…
Idonknow
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Units in $R[x,x^{-1}]$

Let $R$ be an integral domain. I am looking for a general way to describe the units in $$ R[x,x^{-1}] := R[x,y]/(xy-1).$$ Clearly $$\{rx^n \mid n \in \mathbb{Z}, r \in R^\times \} \subseteq R[x,x^{-1}]^\times$$ is a subgroup, but how do I know…
57Jimmy
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the order of the factor ring $\mathbb{Z}_{15}\left [ x \right ] / \left \langle 3x^{2}+5x \right \rangle$

What is the order of the factor ring $\mathbb{Z}_{15}\left [ x \right ] / \left \langle 3x^{2}+5x \right \rangle$ ? Since $x$ and $3x+5$ are not relatively prime polynomial in $\mathbb{Z}_{15}$, so I can't use the Chinese Remainder Theorem. Any help…
purecj
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Are all finite-dimensional algebras over real numbers isomorphic to some sort of hypercomplex numbers?

I wonder if all finite-dimensional algebras over real numbers are isomorphic to an algebra where we add symbols (like $i,j,k$) and define an arbitrary multiplication table for them. For example complex numbers, dual numbers, quaternions, octonions,…
Sunny88
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Finding all morphisms between two groups

Many of my homework problems are of the form: Find all morphisms between $\text{Group 1}$ and $\text{Group 2}$. How does one in general approach these problems? We have looked at the morphism theorem, but it doesn't seem to be of much help here.…
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Zero divisor for polynomial ring

I am having trouble with how to begin with this problem from Abstract Algebra by Dummit and Foote (2nd ed): Let $R$ be a commutative ring with 1. Let $p(x)=a_nx^n+a_{n-1}x^{n-1}+\cdots+a_1x+a_0$ be an element of the polynomial ring $R[x]$. Prove…
cba
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Solvability of $S_3\times S_3$

I know that the direct product of two solvable groups are solvable. The group $S_3$ is solvable, so $S_3\times S_3$ is solvable. But how am I going to establish the subnormal series of $S_3\times S_3$?or is there any simpler way to show its…
Philip Benj
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Let $\alpha = \sqrt{2}+\sqrt{3}$. Can we make polynomial $r(\alpha) = \sqrt{n}$?

This is the extend version of my previous post Let $\alpha = \sqrt{2}+\sqrt{3}$. Find polynomial $r(x)$ such that $r(\alpha)=\sqrt{2}$. which I post due to find some standard process of obtaining polynomials. And from @Hagen von Eitzen, I see the…
phy_math
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Difference between dihedral and symmetric group

I am trying to wrap my head around the difference between a dihedral group and a symmetric group. If we think about the dihedral group as a set of vertices of some polygon labeled $1$ through $n$ and elements of the group being all the permutations…
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Are $S_3 \times \Bbb Z_4$ and $S_4$ isomorphic groups?

How to prove $S_3 \times \Bbb{Z}_4$ and $S_4 $ are not isomorphic groups ?
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Quotient Ring in $\mathbb{Z}[\sqrt{-5}]$

I have the following ideal in $\mathbb{Z}[\sqrt{-5}]$, $I = (2 - \sqrt{-5})$. I want to know how to explicitly represent $\mathbb{Z}[\sqrt{-5}]/I$ and determine if this is a field. I have tried $$\mathbb{Z}[\sqrt{-5}]/I \cong…
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Show $\mathbb{R}[x]/\langle x^{3}-1\rangle \cong \mathbb{R} \times \mathbb{C}$

I have to show $\frac{\mathbb{R}[x]}{x^{3}-1} \cong \mathbb{R} \times \mathbb{C}$ as rings. We know that $x^{3}-1 = (x-1)(x^{2}+x+1)$ and so by the Chinese remainder theorem, $\frac{\mathbb{R}[x]}{x^{3}-1} \cong \frac{\mathbb{R}[x]}{x-1} \times…