Table 1: Greek letters - KIPDF.COM

Table 1: Greek letters

20 E SSENTIAL LATEX A Mathematical symbols " & \alpha \epsilon \theta \lambda o \varrho \upsilon \psi \beta \varepsilon \varthet...

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20

E SSENTIAL LATEX

A

Mathematical symbols " &

\alpha \epsilon \theta \lambda o \varrho \upsilon \psi

\beta \varepsilon \vartheta \mu \pi \sigma \phi \omega

\Gamma \Xi \Phi #

'

\Delta \Pi \Psi

\gamma \zeta \iota \nu \varpi \varsigma \varphi

$ (

\delta \eta \kappa \xi \rho \tau \chi

!

\Theta \Sigma \Omega

\Lambda \Upsilon %

Table 1: Greek letters ) 1 5 9 = B F J @

\pm \mp \times \div \ast \star \circ \bullet \cdot

*

\cap \cup \uplus \sqcap \sqcup \vee \wedge \setminus \wr

. 2 6 : > C G K

+

\diamond \bigtriangleup \bigtriangledown \triangleleft \triangleright \lhd @ \rhd @ \unlhd @ \unrhd @

/ 3 7 ; ? D H L

, 0 4 8 < A E I M

\oplus \ominus \otimes \oslash \odot \bigcirc \dagger \ddagger \amalg

Not predefined in LATEX 2N . Use the packages latexsym or amssymb

Table 2: Binary operation symbols O U Z ^ c g l S

S

\leq \succ \simeq \parallel \subseteq \sqsupset \doteq =

P V R _

q

m

hS

d

\geq \sim \mid \subset \supseteq \neq \frown \vdash

Q W [ ` VS i n r

\equiv \perp \ll \supset \cong \smile \in \dashv

Table 3: Relation symbols

RS X \ a e

s

o

j

\models \preceq \gg \approx \Join \sqsubseteq \ni

E SSENTIAL LATEX

21

\rmoustache \arrowvert

\lmoustache \Arrowvert

\rgroup

\lgroup

\bracevert

Table 4: Large delimiters

R

\uparrow \{ \lfloor \langle |

^

\Uparrow \} \rfloor \rangle \|

\downarrow \updownarrow \lceil /

\Downarrow \Updownarrow \rceil \backslash

G

Table 5: Delimiters

! '

$# *

\leftarrow \Leftarrow \rightarrow \Rightarrow \leftrightarrow \Leftrightarrow \mapsto \hookleftarrow \leftharpoonup \leftharpoondown

! % ( + S

S

\longleftarrow \Longleftarrow \longrightarrow \Longrightarrow \longleftrightarrow \Longleftrightarrow \longmapsto \hookrightarrow \rightharpoonup \rightharpoondown

\uparrow \Uparrow \downarrow \Downarrow \updownarrow \Updownarrow \nearrow \searrow \swarrow \nwarrow

)

&

"

,

Table 6: Arrow symbols

.

l l l

3 7 = @

F W

\ldots \prime \exists \Diamond @ \top \bot \mho @

/ 4 98 > B

J J J

G

\cdots \forall \nabla \imath \flat \clubsuit \Re

.. .

0 5

:

? H

C

\vdots \infty \surd \jmath \natural \diamondsuit \Im

Not predefined in LATEX 2N . Use the packages latexsym or amssymb

Table 7: Miscellaneous symbols

1

..

6

; D

@ I

.

\ddots \hbar \Box @ \ell \sharp \heartsuit \angle

2 /

J

< E

A

\aleph \emptyset \triangle \neg \wp \spadesuit \partial

22

E SSENTIAL LATEX

\arccos \arcsin \arctan \arg

\cos \cosh \cot \coth

\csc \deg \det \dim

\exp \gcd \hom \inf

\ker \lg \lim \liminf

\limsup \ln \log \max

\min \Pr \sec \sin

\sinh \sup \tan \tanh

Table 8: Log-like symbols

\hat{a} \check{a}

\acute{a} \grave{a}

\bar{a} \vec{a}

\dot{a} \ddot{a}

\breve{a} \tilde{a}

Table 9: Math mode accents

\sum \bigcap \bigodot

\prod \bigcup \bigotimes

\coprod \bigsqcup \bigoplus

\int \bigvee \biguplus

Table 10: Variable-sized symbols

!"!#

5

%'&

\widetilde{abc} \overleftarrow{abc} \overline{abc} \overbrace{abc} \sqrt{abc} f’

"!#! 5 $ ,.@)-0(+* /

\widehat{abc} \overrightarrow{abc} \underline{abc} \underbrace{abc} \sqrt[n]{abc} \frac{abc}{xyz}

Table 11: LATEX math constructs

13 6 :

8 = @ C

F @

\hbar \triangledown \circledS \nexists \Game @ \varnothing \blacksquare \sphericalangle \diagup @

1 4

FI ;

G

A D

>

\hslash \square \angle \mho \Bbbk @ \blacktriangle \blacklozenge \complement \diagdown @

2 5 9

< E

B

7 ?

\vartriangle \lozenge \measuredangle \Finv @ \backprime \blacktriangledown \bigstar \eth

Not defined in style amssymb, define using the LATEX 2N \DeclareMathSymbol command

Table 12: AMS miscellaneous symbols

\oint \bigwedge

E SSENTIAL LATEX

\digamma

23

\varkappa

\beth

\daleth

\gimel

Table 13: AMS Greek and Hebrew

\ulcorner

\urcorner

\llcorner

\lrcorner

Table 14: AMS delimiters

\dashrightarrow \leftrightarrows \leftarrowtail \curvearrowleft \upuparrows \multimap \rightleftarrows \twoheadrightarrow \rightleftharpoons \Rsh \downharpoonright

# & )

! $ ' *

\dashleftarrow \Lleftarrow \looparrowleft \circlearrowleft \upharpoonleft \leftrightsquigarrow \rightrightarrows \rightarrowtail \curvearrowright \downdownarrows \rightsquigarrow

" % (

\leftleftarrows \twoheadleftarrow \leftrightharpoons \Lsh \downharpoonleft \rightrightarrows \rightleftarrows \looparrowright \circlearrowright \upharpoonright

Table 15: AMS arrows +

\nleftarrow \nRightarrow

.

,

\nrightarrow \nleftrightarrow /

-

\nLeftarrow \nLeftrightarrow

0

Table 16: AMS negated arrows 1 4 7 : @

=

F

C

\dotplus \Cup \doublebarwedge \boxdot \ltimes \rightthreetimes \circleddash \centerdot

2 5 8 ; >

G

D

A

\smallsetminus \barwedge \boxminus \boxplus \rtimes \curlywedge \circledast \intercal

Table 17: AMS binary operators

3 6 9 < ? B E

\Cap \veebar \boxtimes \divideontimes \leftthreetimes \curlyvee \circledcirc

24

E SSENTIAL LATEX

\leqq \lesssim \lessdot \lesseqgtr \risingdotseq \backsimeq \sqsubset \precsim \trianglelefteq \smallsmile \Bumpeq \eqslantgtr \gtrdot \gtreqless \circeq \thickapprox \sqsupset \succsim \trianglerighteq \shortparallel \varpropto \backepsilon

f

#

&

)

,

g 1

4

7

:

=

!

$

'

*

-

/

2

5

8

;

>

\leqslant \lessapprox \lll \lesseqqgtr \fallingdotseq \subseteqq \preccurlyeq \precapprox \vDash \smallfrown \geqq \gtrsim \ggg \gtreqqless \triangleq \supseteqq \succcurlyeq \succapprox \Vdash \between \blacktriangleleft \blacktriangleright

"

%

(

+

.

0

3

6

9

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