New posts in vector-spaces

A question on vector space over an infinite field [duplicate]

The difference between vector space and group

abstract-algebra group-theory vector-spaces

What is needed to make Euclidean spaces isomorphic as groups?

group-theory vector-spaces set-theory axiom-of-choice axioms

Every subspace of the dual of a finite-dimensional vector space is an annihilator

linear-algebra vector-spaces linear-transformations duality-theorems

Transfer from external direct sum to internal direct sum

linear-algebra vector-spaces direct-sum

I have two vector spaces $U$ and $V$. Can $U \cap V = \varnothing$? [closed]

linear-algebra vector-spaces

Quotient ring of a graded algebra with respect to a graded ideal

commutative-algebra vector-spaces graded-rings

Determinant of exact sequence

linear-algebra vector-spaces determinant multilinear-algebra

Showing vectors span a vector space by definition

linear-algebra vector-spaces

Probability that $n$ vectors drawn randomly from $\mathbb{R}^n$ are linearly independent

linear-algebra vector-spaces random-matrices

Examples of 'almost' vector spaces where unitary law fails

Show that the dimention of the intersection of projective linear sub-spaces of dimentions $d_1$ and $d_2$ of $\mathbb{P}^n$ is bigger than $d_1+d_2-n$

algebraic-geometry vector-spaces projective-space krull-dimension projective-schemes

How to show an inequality in an inner product space?

vector-spaces inner-products cauchy-schwarz-inequality geometric-inequalities

Difference between the Jacobian matrix and the metric tensor

differential-geometry vector-spaces coordinate-systems tensors

How to imagine vector spaces (and projective spaces) over a finite field

vector-spaces finite-fields projective-geometry finite-geometry

A doubt about the construction of a linear map $T$ such that $T:\mathbb R^N \to \mathbb R^p$ such that $K \cap \operatorname{ker} T = \{0\}$

differential-geometry vector-spaces linear-transformations proof-explanation smooth-manifolds

Prove projection is self adjoint if and only if kernel and image are orthogonal complements

linear-algebra vector-spaces inner-products

Loomis and Sternberg Problem 1.46

linear-algebra functions vector-spaces vectors problem-solving

Discrete subset of $\mathbb{R}^n$

group-theory vector-spaces vector-lattices

Full rank of $[A^0 v | A^1 v | A^2 v | \ldots | A^{d-1} v]$ when A is non-diagonalizeable

linear-algebra matrices vector-spaces