Questions tagged [multilinear-algebra]
For questions about the extension of linear algebra to multilinear transformations of vector spaces.
1,007
questions
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22 views
Proof-verification:$im(\partial(f(x))\subset\mathcal{L}^m_{sym}(E,F)$, if $X\subset E$ open, and $f\in C^1(X,\mathcal{L}^m(E,F))$ with symmetric image
I believe to have solved an exercise of one of the Analysis books I am using to freshen up on the topic (H. Amann and J. Escher's "Analysis 2"), but I have not used one of the assumptions of ...
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0answers
18 views
Proof-Verification of a multilinear function
Let $f: \mathbb{R}^n \times \mathbb{R}^m \times \mathbb{R}^k \to \mathbb{R}^p$ be a multilinear function. I want to prove that $$\lim_{(h_1,h_2,h_3) \to \textbf{0}} \frac{||f(h_1,h_2,h_3)||}{||(h_1,...
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1answer
31 views
Identifying $L(V_1, V_2, \cdots, V_n)$ with $V_1^* \otimes \cdots \otimes V_n^*$ instead of $V_1 \otimes \cdots \otimes V_n$
Let $V_1, \cdots, V_n$ be vector spaces over $k$; let $L(V_1, \cdots, V_n)$ be the vector space of multilinear maps from $V_1 \times \cdots \times V_n$ to $k$.
we can identity elements of $L(V_1, \...
1
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1answer
67 views
Counterexample or proof - infinite dimensional vector space.
I have the following: Suppose that $E $ is an infinite dimensional vector space. Then that there exists a dual space $E^*$ such that the natural injection $\varphi : E^* \rightarrow L (E)$ given by $\...
3
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1answer
44 views
Show that there exists a dual space $E^*$ such that the natural injection $E^* \rightarrow L (E)$ is not surjective.
Suppose that $E $ is an infinite dimensional vector space. Show that there exists a dual space $E^*$ such that the natural injection $i:E^* \rightarrow L (E)$ defined by $i(e^*) = \langle - , e^* \...
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1answer
19 views
Assume that $ \pi $ is a projection operator in $ E $. Prove that $ \pi^{*} $ is a projection operator in $ E^{*} $.
Suppose $ \pi: E \rightarrow E $ and $ \pi^{*}: E^{*} \rightarrow E^{*} $ are dual mappings. Assume that $ \pi $ is a projection operator in $ E $. Prove that $ \pi^{*} $ is a projection operator in $ ...
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1answer
26 views
Multilinear map defined on a module product and the associativity of module products
Let $(E_i)_{i\in I}$ be a family of $\mathbf{Z}$-modules and let $(J_k)_{1\leq k\leq n}$ be a finite partition of $I$. Suppose
$$f:\prod_{k=1}^{n}\prod_{i\in J_k} E_i\rightarrow F$$
is a $\mathbf{Z}$-...
2
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1answer
103 views
Bourbaki's construction of generalized tensor product of modules
Let $(G_\lambda)_{\lambda\in L}$ be a family of $\mathbf{Z}$-modules. Let $\phi:\prod_{\lambda\in L}G_\lambda\rightarrow\mathbf{Z}^{(\prod_{\lambda\in L} G_\lambda)},\,x\mapsto e_x:=(\delta_x(x'))_{x'\...
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1answer
38 views
Definition of $\mathbf{Z}$-multilinear mapping
Let $(G_{\lambda})_{\lambda\in L}$ be a (not necessarily finite)
family of $\mathbf{Z}$-modules, $H$ a $\mathbf{Z}$-module and
$u:\prod_{\lambda\in L}G_\lambda\rightarrow H$. If for each $\mu\in
L$, $...
1
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0answers
11 views
Any bilinear function over $V\times V^*$ satisfying automorphism invariance is scaled inner product
Let $E, E^*$ be a pair of dual spaces and assume that $\Phi: E^* \times E \to \Gamma$ is a bilinear function such that
$$\Phi(\tau^{*-1}x^*, Tx) = \Phi(x^*, x)$$
for every pair of dual automorphisms. ...
2
votes
2answers
60 views
All sets of $11$ quaternions satisfy some multilinear $11$th degree polynomial equation with fixed real coefficients
Let $R$ be an arbitrary $n$-dimensional associative algebra, over a field $\mathbb F$. Denote by $P_k(\mathbb F)$ the space of formal $k$'th degree associative non-commutative polynomials, with ...
2
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1answer
28 views
Greub Multilinear Algebra bilinear mappings question
In Greub, Chapter 1, page 1 it says:
Suppose $E$, $F$ and $G$ are vector spaces and consider a mapping $$\psi\colon E \times F \rightarrow G.$$ The set
$$S = \{\psi (x,y) \in G \mid x \in E, y \in ...
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1answer
19 views
Is the set of all multilinear forms on a vector space $V$ over a field $F$ itself a vector space? [closed]
If so, what is vector addition on this space? Is it the usual pointwise addition of functions?
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0answers
21 views
Proof of an Identity using Bilinear Maps
I am attempting to prove the following statement: if $\phi$ is a bilinear map which takes $V_1 \times V_2$ to $W$ where $V_1$ and $V_2$ are vector spaces of dimension $l_1$ and $l_2$ respectively and $...
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4answers
67 views
Textbooks in which determinant is defined as an alternating multilinear map
I'm interested in this abstract definition of determinant, i.e. determinant is defined as an alternating multilinear map. Could you please suggest me some Linear Algebra textbooks that define ...
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1answer
58 views
What is meant by “how an element in the domain is mapped to its image”.
In the following lecture given by Fredric Schuller, he mentions this during the lecture which is on multilinear algebra (know that $P$ is a set of polynomials such that $p$ $\in$ $P$):
“consider the ...
2
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1answer
55 views
Difficulty interpreting high order derivatives in $\mathbb{R}^n$
If $f:U\subseteq\mathbb{R}^m\to \mathbb{R}^n$ is differentiable function then its derivative
$$
f':U\to M_{n\times m}(\mathbb{R})\simeq\mathcal{L}(\mathbb{R}^m;\mathbb{R}^n)
$$
can be seen, for each $...
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2answers
69 views
Understanding the properties of multilinear alternating maps
I recently came across this proposition in my math textbook:
Let $D: \mathbb{R}^3 \times \mathbb{R}^3 \times \mathbb{R}^3 \rightarrow \mathbb{R}$ be a multilinear, alternating map such that $D(a_1,...
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0answers
17 views
Wedge product of complexifications is complexification of wedge product
$V$ is a real finite dimensional vector space. Denote by $V_{\mathbb{C}}$ its complexification $V\otimes_{\mathbb{R}}\mathbb{C}$. I have already proved that $V_{\mathbb{C}}\otimes_{\mathbb{C}}V_{\...
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0answers
12 views
Complexification of real linear map and Hermitian metric
Consider
$V$ a finite dimensional real vector space with Euclidean metric $\langle|\rangle$
$\langle|\rangle_{\mathbb{C}}$ the induced Hermitian metric on the complexification $V_{\mathbb{C}}=V\...
1
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1answer
52 views
From vec-trick to matrix-trick for Kronecker products
for the vec-trick of the Kronecker product, we can write
$$
\left(\mathbf{B}^{\top} \otimes \mathbf{A}\right) \operatorname{vec}(\mathbf{X})=\operatorname{vec}(\mathbf{A} \mathbf{X} \mathbf{B}).
$$
...
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1answer
34 views
Multivariate Linear Function
Linear Definition is as follows
$$L(x + y )= L(x) + L(y) $$
$$L(ax) = aL(x)$$
I get confused with the definition for multivariate linear function.
Let's say we have a function like below.
$$L(x, y)=...
2
votes
1answer
33 views
How does the “Alternating Operator” distribute in Tensors?
(I'm not sure that I even phrased the question correctly. I will explain more about this below.)
Given a k-tensor $T$, we can define an alternating k-tensor $Alt(T)$ in the following way:
where $\...
1
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0answers
22 views
Finding angle between two hyperplanes given basis vectors
There is a Euclidean space $\mathbb{R}^n$. In it there live two hyperplanes of dimension $m$ each. Both hyperplanes pass through the origin $\vec{0}$. The hyperplanes are defined by the corresponding ...
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0answers
15 views
Linearization of a polynomial
Arora and Barak in their book, CC A modern approach here may have a typo in
(8.15) on the page $161$:
$\exists_{X_i}p(X_1,...,X_n)=p(X_1,...,X_{i-1},0,X_{i+1},...,x_n)+p(X_1,...,X_{i-1},1,X_{i+1},...,...
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0answers
16 views
Equivalence between the product of a skew symmetric matrix and the product of a bivector and a vector
I stumbled upon the following statement on the wikipedia page (https://en.wikipedia.org/wiki/Cross_product#cite_note-lounesto2001-14) about the cross product:
The vector cross product also can be ...
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0answers
20 views
Moment of inertia tensor and the tensor definition
A tensor is defined as follows; A tensor of type (r, s) on V is a multilinear map T : $(V^*)^r \times V^s \to R$. The set of tensors of type (r, s) on V will be denoted by $T^r_s(V)$. How does this ...
0
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1answer
30 views
Tensors: How to construct multilinear maps?
A tensor is defined as follows; A tensor of type (r, s) on V is a multilinear map T : $(V^*)^r \times V^s \to R$. The set of tensors of type (r, s) on V will be denoted by $T^r_s(V)$.
It takes r ...
0
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1answer
30 views
Bilinear Maps between Finite-Dimensional Vector Spaces & the Outer Product
Theorem. A function $f : \mathbb{R}^{n_1} \times \mathbb{R}^{n_2} \to \mathbb{R}^{n_3}$ is bilinear iff each component of $f(v,w)$ is a linear combination of terms of the form $v_iw_j$, where $v=\...
1
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1answer
30 views
A question on forms
Let $V$ be a vector space of dimension $d<\infty$, and let $v\in V\setminus\{0\}$.
Let $f\in \Lambda^p V$ be such that $v\wedge f=0$.
I want to show that there exists a $g\in \Lambda^{p-1}V$ such ...
0
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2answers
56 views
Trying to understand the Isomorphism between $T^1_1(V)$ and $End(V)$
Let $V$ be an n dimensional vector space.
Let $T_1^1$ be the set of bilinear functions $F: V^* \times V \rightarrow \mathbb{R}$ and $End(V)$ be all the set of all linear functions $A: V \rightarrow ...
2
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0answers
102 views
Is Geometric Algebra/Geometric Calculus all that it's hyped up to be? [closed]
There appears to be a cult following of geometric algebra/geometric calculus (GA/GC) as developed by David Hestenes. Many questions on stack exchange regarding this. I wanted to make this question ...
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0answers
23 views
Is there an analog of polarization for skew-symmetric forms?
Polarization works both ways. Not only can you represent any homogeneous polynomial $f$ of degree $d$ as $F(x,...,x)$ for a multilinear form $F(x_1,...,x_d)$ but also conversely, any symmetric ...
2
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1answer
60 views
Alternating tensors: Difference between $Alt$ and $\frac{1}{k!} Alt$?
From Dummit Foote Chapter 11.5: pages 452 and 453. I believe I was able to reprove these with $Alt$ instead of $\frac{1}{k!} Alt$. Maybe I made a mistake.
What's the difference between $Alt$ and $\...
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1answer
22 views
linear independence of symmetric tensors
I am reading a paper that incidentally uses a bit of theory of symmetric tensor spaces. I came across the following claim:
If we're given linearly independent vectors
$x_1, \ldots, x_n \in \mathbb{...
0
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1answer
38 views
Prove that $f(x,y) = - f(y,x)$
I have the following proof statement but I can't prove it
Let $ f : V \times V \longrightarrow \mathbb{K} $ an alternating multilinear map.
How can I prove that : $f(x,y) = - f(y,x)$
This is what ...
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0answers
20 views
When are tensor components invariant of the basis?
I am self-studying Bishop and Goldberg's nice book on Tensors and Manifolds, but got stuck on Exercise 2.13.3: If $A$ is a tensor of type $(r,s)$ such that the components of $A$ are the same with ...
3
votes
1answer
68 views
Question on the differences in the definitions of what a tensor is
Below are the common definitions of tensor.
a. "a tensor is a quantity which transforms according to a definite law under the change of the coordinate system".
b. "a tensor is a multilinear function ...
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0answers
45 views
Doubt on a particular commutative diagram using the Tensor Product construction
I've posted two other questions* $[1]$ $[2]$, discussing and asking about the Tensor Product construction, in particular the "canonical construction", which is the one $[4]$:
$$ \frac{F(V \times W)}{...
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0answers
14 views
Doubt on the notation of the generators of the subspace $S \subset F(V \times W)$ in tensor product construction [duplicate]
I understand the particular form of vectors of subspace $S$ of Free vector space $F(V \times W)$;
$$ (v+v',w)-(v,w)-(v',w) $$
$$ (v,w+w')-(v,w)-(v,w') $$
$$ a(v,w)-(av,w) $$
$$ a(v,w)-(v,aw) $$
...
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0answers
21 views
Definition of Wedge Product on Exterior Algebra
I'm confused on a detail of the construction of the exterior algebra $\Lambda(V^*)$ from the individual exterior powers $\Lambda^k(V^*)$ of the dual of an $n$-dimensional vector space $V$. We define ...
2
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0answers
68 views
Doubt on the understanding of the role of Quotient Spaces on Tensor Product construction
I'm studyin,g for the first time, the Tensor Product of Vector Spaces. After the answer of a particular question, $[1]$, I think that I grasped the key point of the role of Quotient Vector Space; the ...
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0answers
19 views
Different Definitions of the kth Exterior Power
If $V$ is an $n$-dimensional real vector space then the $k$th exterior power $\Lambda^kV$ can be defined in a bunch of different ways and everyone seems to have their own preference. I've been exposed ...
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0answers
5 views
Intersection of multilinear ideals
Let $K$ be a field. Let $I$ and $J$ two ideals of $K[x_0,x_1,\ldots,x_n,y_0,y_1,\ldots,y_n,z_0,z_1,\ldots,z_n]$ such that $I\subset K[x_0,x_1,\ldots,x_n,y_0,y_1,\ldots,y_n] $ is generated by ...
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0answers
17 views
Suppose S is a set of linearly independent vectors in E, and suppose T is a basis of E
Suppose S is a set of linearly independent vectors in E, and suppose T is a basis of E. Prove that there ir a subset of T which, together with S, is again a basis of E.
0
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1answer
26 views
Let $(x_\alpha )_{\alpha \in A}$ be a basis for a vector space E and consider a vector $ a= \sum_\alpha \xi^{\alpha}x_\alpha$ [closed]
Let $(x_\alpha )_{\alpha \in A}$ be a basis for a vector space E and consider a vector $ a= \sum_\alpha \xi^{\alpha}x_\alpha$
Suppose that for some $ \beta \in A$, $\xi^{\beta} \not= 0$. Show that ...
0
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0answers
37 views
Does it make sense to replace scalar with vector in an inner product space?
I obtain a formulation in my study and I found I can rewrite it as a simple and reasonable form but it needs some special operations as follows.
Basically, I just replace the scalars with vectors in ...
4
votes
1answer
111 views
Given math model to model relations using a tensor, how do we put restriciton on tensor so that it can capture symmetric relations
The goal is to model real life relations between stuff and people.
Say we have sets $E$, $R$ and functions $h:E \to V$, $t :E \to W$ and $r:R \to U$, where $V,W,U$ are finite dimentional vector spaces ...
0
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0answers
16 views
property of mode_n tensor product
So given a tensor $\chi = \mathcal{T} \times_1A \times_2B \times_3C$ (assuming compatibility of operations), we need to show
$\chi_{(1)}=A\mathcal{T}_{(1)}(C\otimes B)^T$
Here $\otimes$ means ...
0
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0answers
10 views
Diagonal root of symmetric multilinear map
Let $F$ be a symmetric multilinear form from $(\mathbb{C}^n)^n$ to $\mathbb{C}$ with real coefficients (these are polynomials). By symmetric I mean that one may permute the arguments
$$
\forall \sigma ...
