Questions tagged [notation]
Question on the meaning, history, and usage of mathematical symbols and notation. Please remember to mention where (book, paper, webpage, etc.) you encountered any mathematical notation you are asking about.
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1answer
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Cycle notation for cyclic orders
Is there a convenient cycle notation for cyclic orders (https://en.wikipedia.org/wiki/Cyclic_order)?
For example:
Definition. A set of four elements $a, b, c, d$ of a cyclically ordered set is a 4-...
0
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1answer
32 views
About the notation <S,R> for ordered sets or <G,+> for groups. Is this notation absolutely rigorous or is it simply a convenient shortcut?
One can often read things like: let (S,R) be an ordered set, that is the set S ordered by the relation R; or, let (G,+) be a group, that is a set G together with an operation verifying such and such ...
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1answer
42 views
Is there a common notation for a matrix with one entry equal to one and zero otherwise?
Kind of like a unit vector, but it's a matrix.
For example, if the notation is $A_{ij}$, then this matrix has all zero elements, except $a_{ij} = 1$.
Is there a common notation/term for this kind of ...
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2answers
36 views
Symbol for the number of elements in a set
I would like to express below concisely and mathmatically
TP is a set of real numbers
$$C = \{ x \in TP : x > threshold \}$$
c_count = len(C)
Basically, in ...
0
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0answers
16 views
Notation to truncate a Laurent series
Suppose that, as $x$ vanishes, the function $f(x)$ is approximated by the Laurent series
$$f(x) \approx \frac 1 x - i\pi - \frac x 4 + \frac{i\pi x^2}{12} + \cdots$$
Question 1: can I write the ...
2
votes
2answers
44 views
What does the notations $X \times_{Z} Y$ mean?
Right now I am learning how to create commutative diagrams in Latex, and since I am also studying category theory right now, I have come across the notation before in category theory texts like ...
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3answers
33 views
Using 0/1 instead of T/F in propositional logic. Is there any interest in doing so? ( either at the language level or at the metalogical level)
Is there any interest in using 0/1 instead of T/F in propositional logic?
Does it allow things the T/F notation doesn't?
Does it make easier or simplyfy in any way the exposition of logical theory?...
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4answers
114 views
What is difference between $\{\{\}\}$ and $\{\varnothing\}$?
I need to know what is difference between $\{\{\}\}$ and $\{\varnothing\}$
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1answer
27 views
On vector notation
I've read that, when expressing a quantum mechanical operator into a particular representation, the more-formally correct notation is $\rightarrow$ rather than $=$, e.g. the momentum operator ...
0
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1answer
20 views
asymptotic proportionality
Is there a well established notation for asymptotic proportionality by a non-zero and non-unitary constant (for null contant we have little-oh, for unitary constant of asymptotic proportionality we ...
0
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1answer
41 views
Notation for reversed rows and/or columns of a matrix?
In this answer I am using a transformation of matrices, and I would like to know if there is a notation for this.
Given a matrix $A$, let $B$ be the same as $A$ with rows in reverse order, $C$ with ...
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1answer
23 views
is there a convention of the usage of square brackets and round brackets?
I am learning the justification of Sample variance
$${\displaystyle {\begin{aligned}
\operatorname {E} [\sigma _{Y}^{2}]&=\operatorname {E} \left[{\frac {1}{n}}\sum _{i=1}^{n}\left(Y_{i}-{\frac {...
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2answers
67 views
Congruence, Equal, and Equivalence
I know this is very basic problem about math. But sometimes confusing.
What is the difference among
Equal Sign $\left(\,=\,\right)$
Congruence Sign (we saw this on number theory) $\left(\,\equiv\,\...
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0answers
73 views
Beach-ball like differential operators of a two-dimensional function
I'm looking for references, known names of, and other useful pointers and insight about (pairs of) differential operators that are "beach-ball like" because they sample a 2-dimensional function in ...
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0answers
28 views
Mathematical notation nth smallest element of a set
I want to put the following in formula-form:
"$ T_i$ should be the sum of the $ b $ smallest durations out of all durations of the predecessors of $i$ (which is the set $P_i$)"
Does a mathematical ...
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0answers
52 views
Need help with a symbol, seems like inverted $\in$.
Need help with a symbol that appears in logic notations, as it appears (for the first time, in the book) on page 2 of the book : Elements of Real Analysis, by Denlinger.
The logical statement ...
0
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1answer
20 views
What is the meaning of the $0<x, y<\infty$ bound in this joint PDF?
I'm given a joint PDF,
\begin{equation}
f_{X,Y}(x,y) =
\begin{cases}
e^{-(\frac{x}{y}+y)}y^{-1} & \text{ , } 0<x,y<\infty\\
0 & \text{ , otherwise}
\end{cases}.
\end{equation}
From ...
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0answers
23 views
meaning of double headed arrow
I am studying properties of discrete time Fourier transform and I encountered a notation shown highlighted in attached photo
What is meant by this notation? Is it meaning equality? screenshot of ...
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0answers
28 views
Is this matrix notation correct?
I have a bunch of matrices that I denote as follows:
$$\mathbf{A_j}=(a_{c,k}^j)\in[0,1]^{d\times q}$$
The reason I don't use a tensor of order $3$ is because $d$ will vary for each $j$, which is why ...
4
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0answers
67 views
A new notation for operations and some questions
let $x^{/1/}=x+x$ (addition)
$x^{/2/}=x.x$ (multiplication)
$x^{/3/}=x^x$ (exponentiation)
$x^{/4/}=^xx$ (tetration)
and so on.....
I have the following questions:
$(1)$ Can we define an ...
2
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1answer
45 views
Subset notation in Rudin's “Principles of Mathematical Analysis”
I've just began reading Walter Rudin's "Principles of Mathematical Analysis". Early on in the text is introduced subset notation, with which I am familiar. My problem is that Rudin doesn't seem to ...
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0answers
17 views
Meaning of notation $f(\epsilon) = \mathrm{ord}(1)$ as $\epsilon \to 0$?
What is the meaning of
$$ f(\epsilon) = \mathrm{ord}(1) $$ as $\epsilon \to 0$? I have struggled to find the definition of this term online or in any notes I have access to.
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1answer
17 views
Notation for partial function composition
Given functions $f\colon X\to Y$ and $g\colon Y \to Z $, their composition, that is the function $h\colon X\to Z, x \mapsto g(f(x))$ is denoted by $h=g\circ f$. Let's call this the functional form, ...
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1answer
55 views
How to split three numbers with conditions?
Let $a, b, c \in \mathbf{N}_1$ and triples $(a, b, c)$ are formed from them randomly, for example, $(1, 5, 6)$, $(1, 2, 3)$, $(1, 2, 4)$. The order of numbers does not matter in a triplet. We can use ...
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1answer
57 views
How to find $\frac{∂f}{∂y}$ for Functions of the form $f(x,y,z(y))$?
This is the first time I'm using math.stackexchange. Please excuse me and correct me if I'm not doing things in the right format.
So my question is this: given a function of the form $f(x,y,z(y))$, ...
2
votes
1answer
38 views
Question about notation: The order notation
For example, when we Taylor expand say $e^x$ about $x=0$, we would write
$$e^x = 1+x+\frac 12 x^2 + \frac 16 x^3 + \mathcal O(x^4) \qquad \qquad \text{as } x \rightarrow 0$$
with the use of the "Big-...
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votes
1answer
44 views
What is the meaning of sentence E | x?
How to read this math notation?
Let closest(j) be the set of all points that are
closest to centroid cj. The algorithm proceeds during several passes, during each of which it updates each centroid ...
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0answers
14 views
What notation is available for denoting points on a path?
I have a closed-path motion on the plane, it looks like A-B-C-D-A on the figure. Each segment is a straight line.
The point A ...
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1answer
23 views
Writing an inequality in set notation
I'm having trouble writing a solution in set notation. Iv been asked to write an equation to describe a region from a graph but express the answer in set notation. My solution is y>x^2-4. How do I ...
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0answers
6 views
Notation to indicate a function is an aggregate of a family of sub-functions?
I have a bunch of component cost functions $C_g(x)$ and an aggregate cost function which is defined as a weighted sum of components $\sum_{g=1}^G \omega_g C_g(x)$. Currently I write $\mathcal{C}(x) = \...
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1answer
20 views
Notation for permutations of function composition
Given a set of functions $F$ of which all are functions in $X \to X$, where certain functions, say $a, b \in F$ can be composed together: $a(b(x)) = (a \circ b)(x)$. What is the notation for the set ...
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0answers
7 views
Formal notation for an unordered set used for define weighted median
For $i=1\ldots n$ let's define the couple ($X_i$, $W_i$).
I want to define a weigthed median as the highest value of $m$ fulfilling $\sum_{\{i|X(i)\leq m\}} W(i) < \frac{1}{2} \sum_{\{i\}} W(i)$. ...
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votes
1answer
40 views
What symbol means continues irrationally?
Typically we use an ellipsis (...) to show that a number continues on; e.g.:
1/3 = 0.33333...
Even in the English language, it is used to indicate that something ...
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vote
2answers
43 views
$d_1:ax+2y+4=0$; $d_2:3x-4y+12=0$; $|d_1d_2|=?$
$d_1:ax+2y+4=0$
$d_2:3x-4y+12=0$
$d_1$ // $d_2$
$|d_1d_2|=?$
This is a slightly modified version of a university entrance examination problem set up by the experts at this specific ...
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0answers
28 views
Notation for Divisors in Liu's AG & AC
I have a question about a notation in Liu's "Algebraic Geometry and Arithmetic Curves" in the excerpt below (or look up at page 276):
What is here means by $(f)_0$ and $(f)_{\infty}$? Does anybody ...
0
votes
1answer
7 views
Denoting the Conditional Minimum
This questions concerns notation. I have a $2\times n$ matrix $X$. Is there a smooth way to denote the minimum of the $2$nd row conditional on elements in the first row being equal to some constant $c$...
0
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0answers
11 views
Nth-order Laplacian
Mind that I'm coming from a mostly physics background, so this may in fact be common mathematical notation that I simply haven't come across in my own field.
I've seen the symbol $\nabla^2$ "applied" ...
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0answers
20 views
Notation question for push forward substitution in iterated integral
Consider the following iterated integral
\begin{gather*}
\int_{0}^{1}\int_{0}^{\pi}y\sin(xy)d xd y.\tag{1}
\end{gather*}
It is standard to evaluate (1) as follows.
\begin{align*}
\int_{0}^{1}\int_{...
1
vote
1answer
49 views
Rationale behind this notation for integrations?
The marginal distribution formula from Wikipedia is:
$$
p_X(x) = \int_y p_{X,Y} (x, y) dy
$$
It makes sense.
But some use the following notation:
$$
\mathbb{P}_{X} = \int_Y d\mathbb{P}_{XY}
$$
Why do ...
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votes
0answers
22 views
Notation for scalar coefficients of a vector
I want to know if there is some existing notation for the "magnitude" of a vector when it is complex. For example, suppose I have the following vector:
$$\mathbb{v}=(2+i) \ \hat{x}$$
Is there any ...
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0answers
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Is my interpretation of the expression on the expectation is a correct one?
Consider the following expression
$$E_{x\sim p_{data}(x)}[ f(x) ] $$
I am understanding it as
1) if X is a collection of a discrete random variable $(X_1, X_2,......, X_n)$, and x is generated from ...
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0answers
33 views
Meaning of mathematical notation for summation with two variables.
Is the notation
$$ \sum_{x, y} $$
mathematically equivalent to:
$$ \sum_{x}\sum_{y}$$
0
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1answer
17 views
An acceptable way to express the maximum of a union of two finite sets
Suppose that $A= \{a_1, \ldots, a_n\}$ and $B= \{b_1, \ldots, b_n\}$ are two sets of real numbers.
In such a situation, I usually find myself writing $\max\{a_i, b_i\mid i=1, \ldots, n\}$ as ...
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votes
2answers
30 views
Summation Notations - (Discrete Math) I'm having trouble
I've been working on a single sigma notation problem for about 40 minutes now, and I'm having trouble conceptualizing the solution to this problem. I look at examples, and it seems that I begin to ...
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votes
2answers
95 views
Why are |vertical lines| used to mark matrix determinants?
This notation is sometimes used to denote the determinant:
$$ \begin{vmatrix}a & b \\ c & d\end{vmatrix} = ad-bc$$
Why? Where did this notation come from? Was there any relationship between ...
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1answer
26 views
What is the $\oplus$ sign mean in $R^{\oplus I}$?
I read a defenition of a "finite generated module":
An $R$-module $M$ is said to be finite generated if there exists a surjective homomorphism $R^{\oplus I}\to M$ for some finite set $I$. For $I=\{1,....
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2answers
70 views
Prove by induction on $n$ that $(1)(2)+(2)(3)+…+n(n+1)={1\over 3}n(n+1)(n+2)$
So after testing myself with this question, I was unable to solve it. I was able to prove the base case $n=1$, but I was pretty lost on the induction step. I took a look at the solution and here it is:...
1
vote
1answer
36 views
Prove that $(1+x)^n>1+nx$ for all integers $n\geq2$, where $x>-1$ and $x\neq0$.
I would like to get feedback on whether this proof is valid or not and would like to know if my usage of set-builder notation is correct.
I get the feeling that the discrete mathematics class I'm in ...
4
votes
1answer
70 views
notation in abstract algebra: $\mathbb{Q}(\sqrt{2})$
What does $\mathbb{Q}(\sqrt{2})$ mean? Is it $\{ a+b\sqrt{2} \mid a, b \in \mathbb{Q} \}$ ?
0
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1answer
44 views
What does the summation mean in the general Leibniz rule for 3 functions?
I stumbled upon this https://en.wikipedia.org/wiki/General_Leibniz_rule on the nth derivative of products of functions. I am wondering if anyone is knowledgeable enough to state the nth derivative for ...
