Linear and Abstract Algebra Forum

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Join experts in discussing linear and abstract algebra topics. This includes vector spaces and linear transformations. Also groups and other algebraic structures along with Number Theory.
I Show that commutativity is a structural property
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I Complete sets and complete spaces
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I Order of a permutation is the lcm of the orders of cycles
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I Given order for every element in a symmetric group
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I Prove that elements of x^i 0<i<n-1 are distinct
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I Why choose traceless matrices as basis?
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I Can You Determine the Order of (a,b) in A x B?
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I Prove that x and x^-1 have same order
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I Showing that a binary operation is well-defined
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I How can we use induction to prove the generalized associative law?
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I What is orientation or shear transform collectively termed?
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I A little problem about quotient modules
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I Real function inner product space
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I Rings, Modules and the Lie Bracket
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I Field of zero characteristics
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I Zero divisors of an endomorphism ring
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I Is perspective a homothetic transformation?
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I A question I have about my L.A. textbook (2)
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I Submodules and Factor Modules of a Noetherian Module ....
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I Dyad as a product of two vectors: what does ii or jj mean?
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I Two Questions I Have About My L.A. Textbook
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I Outer product in geometric algebra
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I Group Theory: Elements as Ops, Representations as Math?
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I Solve Coin Sum Problem: Find Combinations for 200p
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I Generating/spanning modules and submodules .... ....
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I Generating modules and sub modules Blyth Theorem 2.3
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I External Direct Sums and the Sum of a Family of Mappings ....
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I Finitely Generated Modules and Maximal Submodules
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I Noetherian Modules and Submodules
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I Noetherian Modules - Bland, Example 3, Section 4.2 ....
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I Short Exact Sequences & Direct Sums .... Bland, Proposition 3.2.7
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I Understanding Z2 Graded Vector Spaces: Definition and Examples
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I Split Epimorphisms .... Bland Proposition 3.2.4 ....
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I Split Short Exact Sequences .... Bland, Proposition 3.2.6 ....
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I Split Monomorphisms .... Bland Defn 3.2.2 & Propn 3.2.3 ....
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I Eigenproblem for non-normal matrix
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I Understand homomorphisms from Z^a --> Z^b
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I Inverse of the sum of two matrices
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I What is difference between transformations and automorphisms
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I Linear Programming: how to identify conflicting equations
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I Intuitive Linear Transformation
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I Spin group SU(2) and SO(3)
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I Astrodynamics Question: Derivation of Sp. Orbital Energy?
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I Difference between R^n and other vector spaces
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I Direct Products of Modules .... Canonical Injections ....
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I Clarification of a specific orbit example
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I Direct Products of Modules .... Bland Proposition 2.1.1 ....
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I Understanding SU(2) and SO(3) Representations
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I Direct Products of Modules ....Another Question .... ....
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I Adding a matrix and a scalar.
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I What are the best resources for learning about Lorentz group representations?
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I Proving only 1 normalized unitary vector for normal matrix
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I Noetherian Modules .... Cohn Theorem 2.2 .... ....
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I How to model and resolve a static non-interpenetration constraint
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I Example on Z-modules .... Dummit & Foote, Page 339 ....
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I Linear mapping of a binary vector based on its decimal value
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I (R/I)-Modules .... Dummit and Foote Example (5), Section 10.1
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I Correspondence Theorem for Groups .... Another Question ....
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I Correspondence Theorem for Groups .... Rotman, Propn 1.82 ....
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I Third Isomorphism Theorem for Rings .... Bland Theorem 3.3.16
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I Second Isomorphism Theorem for Rings .... Bland Theorem 3.3.1
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I Quotient Rings .... Remarks by Adkins and Weintraub ....
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I Representation Theory clarification
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I Finite Integral Domains .... Adkins & Weintraub, Propn 1.5
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I Understanding 4-Vector Representations in the Lorentz Group
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I Division Rings & Ring Homomorphisms .... A&W Corollary 2.4 ...
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I What is the definition of a Semi-simple Lie algebra?
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I Solutions to equations involving linear transformations
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I Understanding Hilbert Vector Spaces
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I Can we construct a Lie algebra from the squares of SU(1,1)
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I 1st year linear algebra question
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I Proving that an operator is unbounded
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I Geometric intuition of a rank formula
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I Understanding the Vector Triple Product Proof
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I Orthogonal matrix construction
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I Splitting ring of polynomials - why is this result unfindable?
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I Question about inverse operators differential operators
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I Is a commutative A-algebra algebraic over A associative?
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I Is there a geometric interpretation of orthogonal functions?
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I What are the differences between matrices and tensors?
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I How to find admissible functions for a domain?
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I Projective Representations: a simple example
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I Non-Hermitian wavefunctions and their solutions
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I Diagonalization and change of basis
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I Is there a ket to correspond to every bra?
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I What are the groups for NxNxN puzzle cubes called?
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I Need clarification on a theorem about field extensions/isomorphisms
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I Eigenvectors and inner product
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I "Banana clock shapes" puzzle on social media
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I Measures of Linear Independence?
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I Relationship between a non-Hermitian Hamiltonian and its solution
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I Consequences on a system of ODEs after performing operations
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I Types of complex matrices, why only 3?
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I A different way to express the span
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I Is the Frobenius Norm a Reliable Indicator of Matrix Conditioning?
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I How to check if a matrix is Hilbert space and unitary?
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I How to study an ODE in matrix form in a Hilbert space?
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I Bases, operators and eigenvectors
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I Doubt about proof on self-adjoint operators.
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I What is the equivalent of a group in category theory?
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Linear and Abstract Algebra

Linear and abstract algebra are branches of mathematics that deal with algebraic structures and their properties.

Linear algebra primarily focuses on vector spaces, linear transformations, and systems of linear equations. It provides essential tools for understanding geometric concepts, solving linear equations, and working with matrices. Abstract algebra, on the other hand, is a more generalized study that investigates algebraic structures such as groups, rings, and fields. It delves into the properties and relationships of algebraic systems, aiming to identify common structures and abstract patterns.

Both linear and abstract algebra are foundational areas of mathematics with applications spanning diverse fields, from physics and computer science to cryptography and optimization.

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