Transcript
α β γ δ ² ε ζ η
\alpha \beta \gamma \delta \epsilon \varepsilon \zeta \eta
θ ϑ ι κ λ µ ν ξ
\theta \vartheta \iota \kappa \lambda \mu \nu \xi
o π $ ρ % σ ς
o \pi \varpi \rho \varrho \sigma \varsigma
τ υ φ ϕ χ ψ ω
\tau \upsilon \phi \varphi \chi \psi \omega
Γ ∆ Θ
\Gamma \Delta \Theta
Λ Ξ Π
\Lambda \Xi \Pi
Σ Υ Φ
\Sigma \Upsilon \Phi
Ψ Ω
\Psi \Omega
Table 1: Greek Letters
∗
± \pm ∓ \mp × \times ÷ \div ∗ \ast ? \star ◦ \circ • \bullet · \cdot + + Not predefined in
∩ \cap ∪ \cup ] \uplus u \sqcap t \sqcup ∨ \vee ∧ \wedge \ \setminus o \wr − LATEX 2ε . Use one
¦a `
⊕ ª ⊗ ® ¯ ° † ‡ q
\diamond \bigtriangleup \bigtriangledown \triangleleft \triangleright \lhd∗ \rhd∗ \unlhd∗ \unrhd∗
/ . ¢ ¤ £ ¥
\oplus \ominus \otimes \oslash \odot \bigcirc \dagger \ddagger \amalg
of the packages latexsym, amsfonts or amssymb.
Table 2: Binary Operation Symbols
∗
≤ \leq ≥ \geq ≡ \equiv |= \models ≺ \prec  \succ ∼ \sim ⊥ \perp ¹ \preceq º \succeq ' \simeq | \mid ¿ \ll À \gg ³ \asymp k \parallel ⊂ \subset ⊃ \supset ≈ \approx ./ \bowtie ∼ ⊆ \subseteq ⊇ \supseteq 1 \Join∗ = \cong ∗ ∗ < \sqsubset = \sqsupset 6= \neq ^ \smile . v \sqsubseteq w \sqsupseteq = \doteq _ \frown ∈ \in 3 \ni ∝ \propto = = ` \vdash a \dashv < < > > : : Not predefined in LATEX 2ε . Use one of the packages latexsym, amsfonts or amssymb. Table 3: Relation Symbols
,
,
;
;
:
\colon
.
\ldotp
Table 4: Punctuation Symbols
1
·
\cdotp
∗
← ⇐ → ⇒ ↔ ⇔ 7→ ←( ) Not
\leftarrow ←− \longleftarrow ↑ \uparrow \Leftarrow ⇐= \Longleftarrow ⇑ \Uparrow \rightarrow −→ \longrightarrow ↓ \downarrow \Rightarrow =⇒ \Longrightarrow ⇓ \Downarrow \leftrightarrow ←→ \longleftrightarrow l \updownarrow \Leftrightarrow ⇐⇒ \Longleftrightarrow m \Updownarrow \mapsto 7−→ \longmapsto % \nearrow \hookleftarrow ,→ \hookrightarrow & \searrow \leftharpoonup * \rightharpoonup . \swarrow \leftharpoondown + \rightharpoondown - \nwarrow \rightleftharpoons ; \leadsto∗ predefined in LATEX 2ε . Use one of the packages latexsym, amsfonts or amssymb. Table 5: Arrow Symbols
∗
.. .. . . . . \ldots · · · \cdots . \vdots ℵ \aleph 0 \prime ∀ \forall ∞ ~ \hbar ∅ \emptyset ∃ \exists 2 ı \imath ∇ \nabla ¬ \neg 3 √ \jmath \surd [ \flat 4 ` \ell > \top \ \natural ♣ ℘ \wp ⊥ \bot ] \sharp ♦ < \Re k \| \ \backslash ♥ = \Im ∠ \angle ∂ \partial ♠ 0 \mho∗ . . | | Not predefined in LATEX 2ε . Use one of the packages latexsym,
\ddots \infty \Box∗ \Diamond∗ \triangle \clubsuit \diamondsuit \heartsuit \spadesuit amsfonts or amssymb.
Table 6: Miscellaneous Symbols P Q ` R H
\sum \prod \coprod \int \oint
T S F W V
\bigcap \bigcup \bigsqcup \bigvee \bigwedge
J N L U
\bigodot \bigotimes \bigoplus \biguplus
Table 7: Variable-sized Symbols
\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
( [ { b h |
( [ \{ \lfloor \langle |
) ] } c i k
) ] \} \rfloor \rangle \|
↑ ↓ l d /
\uparrow \downarrow \updownarrow \lceil /
Table 9: Delimiters
2
⇑ ⇓ m e \
\Uparrow \Downarrow \Updownarrow \rceil \backslash
\rmoustache \arrowvert
w w
\lmoustache \Arrowvert
\rgroup
\lgroup
\bracevert
Table 10: Large Delimiters
a ˆ a ˇ
\hat{a} \check{a}
a ´ a `
\acute{a} \grave{a}
a ¯ ~a
a˙ a ¨
\bar{a} \vec{a}
\dot{a} \ddot{a}
a ˘ a ˜
\breve{a} \tilde{a}
Table 11: Math mode accents f abc ←− abc abc z}|{ abc √ abc f0
\widetilde{abc} \overleftarrow{abc} \overline{abc}
c abc −→ abc abc
\widehat{abc} \overrightarrow{abc} \underline{abc}
\overbrace{abc}
abc |{z} √ n abc
\underbrace{abc}
\sqrt{abc} f’
\sqrt[n]{abc} \frac{abc}{xyz}
abc xyz
Table 12: Some other constructions p
\ulcorner
q
x
\urcorner
\llcorner
y
\lrcorner
Table 13: AMS Delimiters 99K W ® · ! À ¸
\dashrightarrow \Lleftarrow \leftrightharpoons \upuparrows \leftrightsquigarrow \rightleftarrows \rightleftharpoons \downdownarrows
L99 ´ x » ⇒ ³ y ¹
\dashleftarrow \twoheadleftarrow \curvearrowleft \upharpoonleft \rightrightarrows \twoheadrightarrow \curvearrowright \upharpoonright
⇔ ¾ ª ¼ À ½ © º
\leftleftarrows \leftarrowtail \circlearrowleft \downharpoonleft \rightleftarrows \rightarrowtail \circlearrowright \downharpoonright
¿ " Á ( ⇒ # Â Ã
\leftrightarrows \looparrowleft \Lsh \multimap \rightrightarrows \looparrowright \Rsh \rightsquigarrow
Table 14: AMS Arrows 8 =
\nleftarrow \nleftrightarrow
9 <
:
\nrightarrow \nLeftrightarrow
\nLeftarrow
Table 15: AMS Negated Arrows z
κ
\digamma
\varkappa
Table 16: AMS Greek i
\beth
k
\daleth
ג
Table 17: AMS Hebrew
3
\gimel
;
\nRightarrow
~ ¤ ] a N F Á
} ♦ @ k H ^ Â
\hbar \square \measuredangle \Game \blacktriangle \bigstar \diagup
M s 0 8 ¥ {
\hslash \lozenge \nexists \Bbbk \blacktriangledown \sphericalangle \diagdown
\vartriangle \circledS \mho \backprime \blacksquare \complement
O ∠ ` ∅ ¨ ð
\triangledown \angle \Finv \varnothing \blacklozenge \eth
Table 18: AMS Miscellaneous u Z £ n f }
\dotplus \barwedge \boxtimes \ltimes \curlywedge \circledcirc
r Y ½ o g ¦
\smallsetminus \veebar \boxdot \rtimes \curlyvee \centerdot
e [ ¢ h Ä |
\Cap \doublebarwedge \boxplus \leftthreetimes \circleddash \intercal
d ¯ > i ~
\Cup \boxminus \divideontimes \rightthreetimes \circledast
Table 19: AMS Binary Operators 5 / ≶ : j 2 E a > m T ∼ = v p ∝ I
\leqq \lessapprox \lessgtr \risingdotseq \subseteqq \curlyeqprec \trianglelefteq \smallfrown \geqslant \gtrdot \gtreqqless \thicksim \sqsupset \succapprox \shortmid \varpropto \blacktriangleright
6 u Q ; b ² l 1 ≫ P ≈ < B q J ∵
\leqslant \approxeq \lesseqgtr \fallingdotseq \Subset \precsim \vDash \bumpeq \eqslantgtr \ggg \eqcirc \thickapprox \succcurlyeq \vartriangleright \shortparallel \blacktriangleleft \because
0 l S v < w ± m & ≷ $ k 3 D G ∴
\eqslantless \lessdot \lesseqqgtr \backsim \sqsubset \precapprox \Vvdash \Bumpeq \gtrsim \gtrless \circeq \supseteqq \curlyeqsucc \trianglerighteq \between \therefore
. ≪ + w 4 C ` = ' R , c % ° t Ä
\lesssim \lll \doteqdot \backsimeq \preccurlyeq \vartriangleleft \smallsmile \geqq \gtrapprox \gtreqless \triangleq \Supset \succsim \Vdash \pitchfork \backepsilon
Table 20: AMS Binary Relations ≮ ¯ ½ » 0 * & ¸ ¶ ² / 7 )
\nless \lneq \lnapprox \precnapprox \nvdash \nsubseteq \varsubsetneqq \ngeqq \gnsim \nsucceq \nshortparallel \ntriangleright \supsetneq
£ © ⊀ ¿ 2 ( ≯ ° ¾ ´ ∦ 4 !
\nleq \lneqq \nprec \nsim \nvDash \subsetneq \ngtr \gneq \gnapprox \succnsim \nparallel \ntrianglerighteq \varsupsetneq
¡ ± . 6 Ã ¤ ª ¨ ¼ 2 + %
\nleqslant \lvertneqq \npreceq \nshortmid \ntriangleleft \varsubsetneq \ngeq \gneqq \nsucc \succnapprox \nvDash \nsupseteq \supsetneqq
Table 21: AMS Negated Binary Relations
4
· µ ³ 5 $ ® ¢ ² À 3 # '
\nleqq \lnsim \precnsim \nmid \ntrianglelefteq \subsetneqq \ngeqslant \gvertneqq \nsucceq \ncong \nVDash \nsupseteqq \varsupsetneqq
H V J
\Lbag \llceil \llbracket
I W K
\Rbag \rrceil \rrbracket
* T
+ U
\lbag \llfloor
\rbag \rrfloor
Table 22: stmaryrd Delimiters
⇐=\ 1 ¤ ←−[ Ã
Z=⇒ 0 £ ←[ M
\Longmapsfrom \nnearrow \shortdownarrow \longmapsfrom \lightning
\Longmapsto \nnwarrow \shortuparrow \mapsfrom \rrparenthesis
⇐\ % ¡ ^ -
Z⇒ $ ¢ _ ]
\Mapsfrom \ssearrow \shortleftarrow \leftarrowtriangle \leftrightarroweq
\Mapsto \sswarrow \shortrightarrow \rightarrowtriangle \leftrightarrowtriangle
Table 23: stmaryrd Arrows Y X
\
\Arrownot \arrownot
[
\Mapsfromchar \mapsfromchar
Z
\Mapstochar
Table 24: stmaryrd Extension Characters ¦ ® » À . ) 2 C = 3 © · 4 ²
\Ydown \baro \boxast \boxcircle \curlyveedownarrow \fatbslash \leftslice \nplus \ogreaterthan \rightslice \varcurlyvee \varobslash \varolessthan \varotimes
§ ° ¼ ½ / # ! : < ¯ ª ¸ º 6
\Yleft \bbslash \boxbar \boxdot \curlyveeuparrow \fatsemi \merge \obar \olessthan \sslash \varcurlywedge \varocircle \varominus \varovee
¨ N Á Â ' ( @ > 8 ³ µ ¹ 7
\Yright \binampersand \boxbox \boxempty \curlywedgedownarrow \fatslash \minuso \oblong \ovee \talloblong \varoast \varodot \varoplus \varowedge
¥ O ¿ ¾ & 9 ± ; ? , ´ 5 ¶ "
\Yup \bindnasrepma \boxbslash \boxslash \curlywedgeuparrow \interleave \moo \obslash \owedge \varbigcirc \varobar \varogreaterthan \varoslash \vartimes
Table 25: stmaryrd Binary Operators e g d
\bigbox \biginterleave \bigsqcap
b p `
\bigcurlyvee \bignplus \bigtriangledown
c f a
\bigcurlywedge \bigparallel \bigtriangleup
Table 26: stmaryrd Large Binary Operators A E
\inplus \supsetplus
B G
\niplus \supsetpluseq
D P
\subsetplus \trianglelefteqslant
F Q
\subsetpluseq \trianglerighteqslant
Table 27: stmaryrd Binary Relations R
S
\ntrianglelefteqslant
\ntrianglerighteqslant
Table 28: stmaryrd Negated Binary Relations
5
Required package ABCdef ABCdef ABCdef ABC ABC ABCdef ABC
\mathrm{ABCdef} \mathit{ABCdef} \mathnormal{ABCdef} \mathcal{ABC} \mathcal{ABC} \mathscr{ABC} \mathfrak{ABCdef} \mathbb{ABC}
euscript with option: mathcal euscript with option: mathcr eufrak amsfonts or amssymb
Table 29: Math Alphabets
6