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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Left Vector Space

In this proof I'm going through (it's slightly too advanced for me, hence the difficulties I'm running in to) I don't know what the author means by "view D as a left C-vector space." Neither does google apparently. Could anyone clarify? Thanks for…
Lammey
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Prove $\sigma \in S_n$ has the same cycle type as $\sigma^{-1} \in S_n$

Let $\sigma \in S_n$. We can then write $\sigma = s_1 \cdot \ldots \cdot s_k$ as a product of disjoint cycles $s_j$ for $1 \le j \le k$ Denote the cycle type of $\sigma$ as $x_1, \ldots ,x_k$ where $x_i \le x_j$ for $i \le j$. I want to prove that…
Shuzheng
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The language of abstract algebra in $ab=a, ab=b$ implies $a=b$

I am struggling to better understand the language of a basic proof in abstract algebra, namely that groups have a unique identity. The proof is presented as follows: Let $G$ be a group and $a,b \in G$ be identity elements. Because $a$ is an…
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Application of mathematical induction

If $p (x)= a_0 + a_1x^2+....a_nx^n$ in $\Bbb R [x]$ and $a \in \Bbb R$, then $p (x)$ can be written as $b_0+b_1(x-a)+.....b_n(x-a)^n$ ,Where $b_i \in\Bbb R \forall i\in\{0,1,2\ldots n\}$. Confusion: IF two polynomials are equal they both must have…
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Orbit-Stabilizer Theorem to prove a quotient set inequality

Is there a way to apply the orbit-stabilizer formula to conclude that for $H,K \leq G$, then $[G: H\cap K]\leq [G:H][G:K]$? The inequality isn't too hard to see, just by taking the map from $g/(H\cap K)\to G/H\times G/K$ defined as $$ g(H\cap…
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On the structure of subrings of $R/I$

I was thinking about the following problem: Let $I$ be an ideal of $R$ (commutative and contains $1$). Now consider a subring $S < R/I$. Can we say that the subring $S$ is of the form $S'/I$ where $S'$ is a subring of $R$? Can somebody add other…
user53970
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Kernel of the homomorphism $F\colon\mathbb{R}[x]\rightarrow \mathbb{C}$

Let $F:\mathbb{R}[x]\rightarrow \mathbb{C}$ be the evaluation function at $x= i$, the imaginary unit. I have shown that $F$ is a homomorphism, but to show that $\ker F= (x^2+1)\mathbb{R}[x]$ I am using some logical argument. It goes like…
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Prime Ideal of an Integral domain

(Confusion) Suppose $R$ is an integral domain with the distinct elements $\{0,1,a_1,a_2.......a_n\}$. If $p$ is a prime element belonging to $R$ then as per theorem $pR$ is a prime ideal. Now I have a confusion here. As per the definition of prime…
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$a+a^{-1}=1$ over $\mathbb F_{p}$

For what values of $p$ prime does the equation $a+a^{-1}=1$ hold true for some $a\in \mathbb F_{p}$ such that $a \ne0$? I tried counting field elements that are inverses of each other and playing with modular arithmetic, but I can't seem to work it…
Matt R
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How can we prove that the field of complex number is not isomorphic to the field of real numbers?

I want to prove this using contradiction, supposing that there is a ring isomorphism between the two and then finding a contradiction.
Jenny
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How to show the Symmetric Group $S_4$ has no elements of order $6$.

I have just shown that $\rho$, where $\rho$ is a product of disjoint cycles of lengths $m_i$ in $S_n$, has order $\operatorname{lcm}(m_1,m_2,\ldots,m_k)$. Now I have to show that there are no elements of order $6$ in $S_4$. I know that $S_4$ has…
user112495
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Units of 2 by 2 matrices with integer entries

I know that the units of 2 by 2 matrices with integer entries must have a determinant of 1 or -1, and I have proved that if the determinant is zero then the matrix is not a unit, however I am wondering how you would go about proving that matrices…
Jenny
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Distributivity of multiplication in tensor product

Let $A,B$ be $k$-algebras and $A \otimes_k B$ be their tensor product (over $k$). I want to show that $(a \otimes b)(a' \otimes b')=(aa' \otimes bb')$ is distributive (because I need to show that $A \otimes_k B$ is a ring with this…
Lucia
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Calculating a particular direct limit

Suppose we want to compute the direct limit of the direct system $$\mathbb{Z}^{14} \overset{A}{\longrightarrow}\mathbb{Z}^{14} \overset{A}{\longrightarrow}\mathbb{Z}^{14} \overset{A}{\longrightarrow}\cdots$$ where $A$ is a $14 \times 14$ square…
Eric
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Algebraic structures on proper classes

From time to time, I see proper classes being endowed with algebraic structure. The ordinals with addition is one example, but I've seen a lot more, most of which have been above my head. The standard definitions of standard algebraic structures…
Bartek
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