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Ciro Santilli 40 Updated 2025-07-16

f : V_{1} (F) \to V_{2} (F)

where

V_{1} (F)

and

V_{2} (F)

are two vector spaces over underlying fields

F

such that:

\forall v_{1}, v_{2} \in V_{1}, c_{1}, c_{2} \in F f (c_{1} v_{1} + c_{2} v_{2}) = c_{1} f (v_{1}) + c_{2} f (v_{2})

(1)

A common case is

F = R

V_{1} = R_{m}

and

V_{2} = R_{n}

One thing that makes such functions particularly simple is that they can be fully specified by specifyin how they act on all possible combinations of input basis vectors: they are therefore specified by only a finite number of elements of

F

Every linear map in finite dimension can be represented by a matrix, the points of the domain being represented as vectors.

As such, when we say "linear map", we can think of a generalization of matrix multiplication that makes sense in infinite dimensional spaces like Hilbert spaces, since calling such infinite dimensional maps "matrices" is stretching it a bit, since we would need to specify infinitely many rows and columns.

The prototypical building block of infinite dimensional linear map is the derivative. In that case, the vectors being operated upon are functions, which cannot therefore be specified by a finite number of parameters, e.g.

For example, the left side of the time-independent Schrödinger equation is a linear map. And the time-independent Schrödinger equation can be seen as a eigenvalue problem.

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Form (mathematics) by

Ciro Santilli 40 Updated 2025-07-16

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A form is a function from a vector space to elements of the underlying field of the vector space.

Examples:

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Linear form by

Ciro Santilli 40 Updated 2025-07-16

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A Linear map where the image is the underlying field of the vector space, e.g.

R^{n} \to R

The set of all linear forms over a vector space forms another vector space called the dual space.

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Matrix representation of a linear form by

Ciro Santilli 40 Updated 2025-07-16

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For the typical case of a linear form over

R^{n}

, the form can be seen just as a row vector with n elements, the full form being specified by the value of each of the basis vectors.

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Dual space by

Ciro Santilli 40 Updated 2025-07-16

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The dual space of a vector space

V

, sometimes denoted

V^{*}

, is the vector space of all linear forms over

V

with the obvious addition and scalar multiplication operations defined.

Since a linear form is completely determined by how it acts on a basis, and since for each basis element it is specified by a scalar, at least in finite dimension, the dimension of the dual space is the same as the

V

, and so they are isomorphic because all vector spaces of the same dimension on a given field are isomorphic, and so the dual is quite a boring concept in the context of finite dimension.

Infinite dimension seems more interesting however, see: en.wikipedia.org/w/index.php?title=Dual_space&oldid=1046421278#Infinite-dimensional_case

One place where duals are different from the non-duals however is when dealing with tensors, because they transform differently than vectors from the base space

V

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Dual vector by

Ciro Santilli 40 Updated 2025-07-16

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Dual vectors are the members of a dual space.

In the context of tensors , we use raised indices to refer to members of the dual basis vs the underlying basis:

e_{1} e_{2} e_{3} e^{1} e^{2} e^{3} \in V \in V \in V \in V^{*} \in V^{*} \in V^{*}

(1)

The dual basis vectors

e^{i}

are defined to "pick the corresponding coordinate" out of elements of V. E.g.:

e^{1} (4, - 3, 6) e^{2} (4, - 3, 6) e^{3} (4, - 3, 6) = 4 = - 3 = 6

(2)

By expanding into the basis, we can put this more succinctly with the Kronecker delta as:

e^{i} (e_{j}) = δ_{ij}

(3)

Note that in Einstein notation, the components of a dual vector have lower indices. This works well with the upper case indices of the dual vectors, allowing us to write a dual vector

f

as:

f = f_{i} e^{i}

(4)

In the context of quantum mechanics, the bra notation is also used for dual vectors.

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Linear operator by

Ciro Santilli 40 Updated 2025-07-16

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We define it as a linear map where the domain is the same as the image, i.e. an endofunction.

Examples:

a 2x2 matrix can represent a linear map from $R^{2}$ to $R^{2}$ , so which is a linear operator
the derivative is a linear map from $C^{\infty}$ to $C^{\infty}$ , so which is also a linear operator

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Adjoint operator by

Ciro Santilli 40 Updated 2025-07-16

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Given a linear operator

A

over a space

S

that has a inner product defined, we define the adjoint operator

A^{†}

(the

†

symbol is called "dagger") as the unique operator that satisfies:

\forall v, w \in S, < A v, w >=< v, A^{†} w >

(1)

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Self-adjoint operator by

Ciro Santilli 40 Updated 2025-07-16

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Bilinear map by

Ciro Santilli 40 Updated 2025-07-16

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Linear map of two variables.

More formally, given 3 vector spaces X, Y, Z over a single field, a bilinear map is a function from:

f : X \times Y \to Z

(1)

that is linear on the first two arguments from X and Y, i.e.:

f (a_{1} x_{1} + a_{2} x_{2}, y) = a_{1} f (x_{1}, y) + a_{2} f (x_{2}, y)

(2)

Note that the definition only makes sense if all three vector spaces are over the same field, because linearity can mix up each of them.

The most important example by far is the dot product from

R^{n} \times R^{n} \to R

, which is more specifically also a symmetric bilinear form.

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Bilinear form by

Ciro Santilli 40 Updated 2025-07-16

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Analogous to a linear form, a bilinear form is a Bilinear map where the image is the underlying field of the vector space, e.g.

R^{n} \times R^{m} \to R

Some definitions require both of the input spaces to be the same, e.g.

R^{n} \times R^{n} \to R

, but it doesn't make much different in general.

The most important example of a bilinear form is the dot product. It is only defined if both the input spaces are the same.

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Matrix representation of a bilinear form by

Ciro Santilli 40 Updated 2025-07-16

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As usual, it is useful to think about how a bilinear form looks like in terms of vectors and matrices.

Unlike a linear form, which was a vector, because it has two inputs, the bilinear form is represented by a matrix

M

which encodes the value for each possible pair of basis vectors.

In terms of that matrix, the form

B (x, y)

is then given by:

B (x, y) = x^{T} M y

(1)

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Effect of a change of basis on the matrix of a bilinear form by

Ciro Santilli 40 Updated 2025-07-16

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C

is the change of basis matrix, then the matrix representation of a bilinear form

M

that looked like:

B (x, y) = x^{T} M y

(1)

then the matrix in the new basis is:

C^{T} MC

(2)

Sylvester's law of inertia then tells us that the number of positive, negative and 0 eigenvalues of both of those matrices is the same.

Proof: the value of a given bilinear form cannot change due to a change of basis, since the bilinear form is just a function, and does not depend on the choice of basis. The only thing that change is the matrix representation of the form. Therefore, we must have:

x^{T} M y = x_{n e w}^{T} M_{n e w} y_{n e w}

(3)

and in the new basis:

x = C x_{n e w} y = C y_{n e w} x_{n e w}^{T} M_{n e w} y_{n e w} = x^{T} M y = (C x_{n e w})^{T} M (C y_{n e w}) = x_{n e w}^{T} (C^{T} MC) y_{n e w}

(4)

and so since:

\forall x_{n e w}, y_{n e w} x_{n e w}^{T} M_{n e w} y_{n e w} = x_{n e w}^{T} (C^{T} MC) y_{n e w} ⟹ M_{n e w} = C^{T} MC

(5)

proofwiki.org/wiki/Matrix_of_Bilinear_Form_Under_Change_of_Basis

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Multilinear form by

Ciro Santilli 40 Updated 2025-07-16

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See form.

Analogous to a linear form, a multilinear form is a Multilinear map where the image is the underlying field of the vector space, e.g.

R^{n_{1}} \times R^{n_{2}} \times R^{n_{2}} \to R

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Symmetric bilinear map by

Ciro Santilli 40 Updated 2025-07-16

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Subcase of symmetric multilinear map:

f (x, y) = f (y, x)

(1)

Requires the two inputs

x

and

y

to be in the same vector space of course.

The most important example is the dot product, which is also a positive definite symmetric bilinear form.

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Matrix representation of a symmetric bilinear form by

Ciro Santilli 40 Updated 2025-07-16

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Like the matrix representation of a bilinear form, it is a matrix, but now the matrix has to be a symmetric matrix.

We can then immediately see that the matrix is symmetric, then so is the form. We have:

B (x, y) = x^{T} M y

(1)

But because

B (x, y)

is a scalar, we have:

B (x, y) = B (x, y)^{T}

(2)

and:

B (x, y) = B (x, y)^{T} = (x^{T} M y)^{T} = y^{T} M^{T} x = y^{T} M^{T} x = y^{T} M x = B (y, x)

(3)

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Hermitian form by

Ciro Santilli 40 Updated 2025-07-16

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The complex number analogue of a symmetric bilinear form.

The prototypical example of it is the complex dot product.

Note that this form is neither strictly symmetric, it satisfies:

< x, y >= \overline{< y, x >}

(1)

where the over bar indicates the complex conjugate, nor is it linear for complex scalar multiplication on the second argument.

Bibliography:

mathworld.wolfram.com/HermitianForm.html

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Quadratic form by

Ciro Santilli 40 Updated 2025-07-16

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Multivariate polynomial where each term has degree 2, e.g.:

f (x, y) = 2 y^{2} + 10 y x + x^{2}

(1)

is a quadratic form because each term has degree 2:

$y^{2}$
$x y$
$x^{2}$

but e.g.:

f (x, y) = 2 y^{2} + 10 y x + x^{3}

(2)

is not because the term

x^{3}

has degree 3.

More generally for any number of variables it can be written as:

f (x_{1}, x_{2}, \dots, x_{n}) = \sum_{i, j} a_{i} a_{j} x_{i} x_{j}

(3)

There is a 1-to-1 relationship between quadratic forms and symmetric bilinear forms. In matrix representation, this can be written as:

x^{T} B x

(4)

where

x

contains each of the variabes of the form, e.g. for 2 variables:

x = [x, y]

(5)

Strictly speaking, the associated bilinear form would not need to be a symmetric bilinear form, at least for the real numbers or complex numbers which are commutative. E.g.:

[x y] [0210] [x y] = [x y] [y 2 x] = x y + 2 y x = 3 x y

(6)

But that same matrix could also be written in symmetric form as:

[0 1.5 1.5 0]

(7)

so why not I guess, its simpler/more restricted.

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Positive definite symmetric bilinear form by

Ciro Santilli 40 Updated 2025-07-16

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Symmetric bilinear form that is also positive definite, i.e.:

\forall x, B (x, x) > 0

(1)

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Matrix representation of a positive definite symmetric bilinear form by

Ciro Santilli 40 Updated 2025-07-16

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A positive definite matrix that is also a symmetric matrix.

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Video 1.

Intro to OurBigBook

. Source.

We have two killer features:

topics: topics group articles by different users with the same title, e.g. here is the topic for the "Fundamental Theorem of Calculus" ourbigbook.com/go/topic/fundamental-theorem-of-calculus
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- a Wikipedia where each user can have their own version of each article
- a Q&A website like Stack Overflow, where multiple people can give their views on a given topic, and the best ones are sorted by upvote. Except you don't need to wait for someone to ask first, and any topic goes, no matter how narrow or broad
This feature makes it possible for readers to find better explanations of any topic created by other writers. And it allows writers to create an explanation in a place that readers might actually find it.
Figure 1.
Screenshot of the "Derivative" topic page
. View it live at: ourbigbook.com/go/topic/derivative
Video 2.
OurBigBook Web topics demo
. Source.
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This way you can be sure that even if OurBigBook.com were to go down one day (which we have no plans to do as it is quite cheap to host!), your content will still be perfectly readable as a static site.
Figure 2.
You can publish local OurBigBook lightweight markup files to either https://OurBigBook.com or as a static website
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Figure 3.
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Figure 4.
Visual Studio Code extension tree navigation
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Figure 5.
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. You can also edit articles on the Web editor without installing anything locally.
Video 3.
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. Source. This shows editing OurBigBook Markup and publishing it using the Visual Studio Code extension.
Video 4.
OurBigBook Visual Studio Code extension editing and navigation demo
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Infinitely deep tables of contents:
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