aleph ℵ
alpha α
angle ∠
approx ≈
approxeq ≊
ast ∗
asymp ≍
backepsilon ∍
backprime ‵
backsim ∽
barwedge ⊼
because ∵
beta β
beth ℶ
between ≬
bigcap ⋂
bigcirc ○
bigcup ⋃
bigodot ⨀
bigoplus ⨁
bigotimes ⨂
bigsqcup ⨆
bigstar ★
bigtriangledown ▽
bigtriangleup △
biguplus ⨄
bigvee ⋁
bigwedge ⋀
blacklozenge ◆
blacksquare ■
blacktriangle ▲
blacktriangledown ▼
blacktriangleleft ◀
blacktriangleright ▶
bot ⊥
bowtie ⋈
Box □
boxdot ⊡
boxminus ⊟
boxplus ⊞
boxtimes ⊠
bullet ∙
Bumpeq ≎
bumpeq ≏
cap ∩
Cap ⋒
cdot ⋅
cdots ⋯
centerdot ⋅
cents ¢
chi χ
circ ∘
circeq ≗
circlearrowleft ↺
circlearrowright ↻
circledast ⊛
circledcirc ⊚
circleddash ⊝
circledS Ⓢ
clubsuit ♣
colon :
complement ∁
cong ≅
coprod ∐
copyright ©
cup ∪
Cup ⋓
curlyeqprec ⋞
curlyeqsucc ⋟
curlyvee ⋎
curlywedge ⋏
curvearrowleft ↶
curvearrowright ↷
dagger †
daleth ℸ
dashleftarrow ⇠
dashrightarrow ⇢
dashv ⊣
ddagger ‡
ddots ⋱
degree °
Delta Δ
delta δ
diamond ⋄
Diamond ◇
diamondsuit ♢
digamma Ϝ
div ÷
divideontimes ⋇
doteq ≐
doteqdot ≑
dotplus ∔
dots …
downarrow ↓
Downarrow ⇓
downdownarrows ⇊
downharpoonleft ⇃
downharpoonright ⇂
ell ℓ
emptyset ∅
epsilon ∊
eqcirc ≖
equiv ≡
eta η
eth ð
euro €
exists ∃
fallingdotseq ≒
Finv Ⅎ
flat ♭
forall ∀
frown ⌢
Gamma Γ
gamma γ
ge ≥
geq ≥
geqq ≧
gg ≫
ggg ⋙
gimel ℷ
gtrdot ⋗
gtreqless ⋛
gtrless ≷
gtrsim ≳
hbar ℏ
hbar ℏ
heartsuit ♡
hookleftarrow ↩
hookrightarrow ↪
hslash ℏ
Im ℑ
implies ⇒
in ∈
infty ∞
int ∫
intercal ⊺
iota ι
Join ⋈
kappa κ
Lambda Λ
lambda λ
langle 〈
lceil ⌈
le ≤
leadsto ↝
leftarrow ←
Leftarrow ⇐
leftarrowtail ↢
leftharpoondown ↽
leftharpoonup ↼
leftleftarrows ⇇
leftrightarrow ↔
Leftrightarrow ⇔
leftrightarrows ⇆
leftrightharpoons ⇋
leftrightsquigarrow ↭
leftthreetimes ⋋
leq ≤
leqq ≦
leqslant ⩽
lessdot ⋖
lesseqgtr ⋚
lessgtr ≶
lesssim ≲
lfloor ⌊
lhd ⊲
ll ≪
Lleftarrow ⇚
lll ⋘
longleftarrow ⟵
Longleftarrow ⟸
longleftrightarrow ⟷
Longleftrightarrow ⟺
longmapsto ⟼
longrightarrow ⟶
Longrightarrow ⟹
looparrowleft ↫
looparrowright ↬
lozenge ◊
Lsh ↰
ltimes ⋉
mapsto ↦
measuredangle ∡
mho ℧
mid ∣
models ⊨
mp ∓
mu μ
multimap ⊸
nabla ∇
natural ♮
nearrow ↗
neg ¬
neq ≠
nexists ∄
ni ∋
notin ∉
nu ν
nwarrow ↖
odot ⊙
oint ∮
Omega Ω
omega ω
ominus ⊖
oplus ⊕
oslash ⊘
otimes ⊗
parallel ∥
partial ∂
perp ⊥
Phi Φ
phi ϕ
Pi Π
pi π
pilcrow ¶
pitchfork ⋔
pm ±
pound £
prec ≺
preccurlyeq ≼
preceq ⪯
precsim ≾
prime ′
prod ∏
propto ∝
Psi Ψ
psi ψ
rangle 〉
rceil ⌉
Re ℜ
registered ®
rfloor ⌋
rhd ⊳
rho ρ
rightarrow →
Rightarrow ⇒
rightarrowtail ↣
rightharpoondown ⇁
rightharpoonup ⇀
rightleftarrows ⇄
rightleftharpoons ⇌
rightrightarrows ⇉
rightsquigarrow ⇝
rightthreetimes ⋌
risingdotseq ≓
Rrightarrow ⇛
Rsh ↱
rtimes ⋊
searrow ↘
section §
setminus ∖
sharp ♯
shortparallel ∥
sigma σ
Sigma ∑
sim ∼
simeq ≃
smallfrown ⌢
smallsetminus ∖
smallsmile ⌣
smile ⌣
space ␣
spadesuit ♠
sphericalangle ∢
sqcap ⊓
sqcup ⊔
sqsubset ⊏
sqsubseteq ⊑
sqsupset ⊐
sqsupseteq ⊒
square □
star ⋆
subset ⊂
Subset ⋐
subseteq ⊆
succ ≻
succcurlyeq ≽
succeq ⪰
succsim ≿
sum ∑
supset ⊃
Supset ⋑
supseteq ⊇
surd √
swarrow ↙
tau τ
textregistered ®
texttrademark ™
therefore ∴
Theta Θ
theta θ
thickapprox ≈
thicksim ∼
times ×
top ⊤
trademark ™
triangle △
triangledown ▽
triangleleft ◁
trianglelefteq ⊴
triangleq ≜
triangleright ▷
trianglerighteq ⊵
twoheadleftarrow ↞
twoheadrightarrow ↠
unlhd ⊴
unrhd ⊵
uparrow ↑
Uparrow ⇑
updownarrow ↕
Updownarrow ⇕
upharpoonleft ↿
upharpoonright ↾
uplus ⊎
Upsilon Υ
upsilon υ
upuparrows ⇈
varepsilon ε
varkappa ϰ
varnothing ∅
varphi φ
varpi ϖ
varpropto ∝
varrho ϱ
varsigma ς
vartheta ϑ
vartriangle △
vartriangleleft ⊲
vartriangleright ⊳
vdash ⊢
vDash ⊨
Vdash ⊩
vdots ⋮
vee ∨
veebar ⊻
Vvdash ⊪
wedge ∧
wp ℘
wr ≀
Xi Ξ
xi ξ
zeta ζ
