\
\(\*
\*\)
\(\*\*
\*\*\)
theorem
definition
lemma
fact
remark
default
include
alias
coercion
coinductive
corec
in
on
inductive
let
match
qed
rec
record
with
and
to
as
using
names
\[
\|
\]
\{
\}
Set
Prop
Type
absurd
apply
assumption
auto
clear
clearbody
change
compare
constructor
contradiction
cut
decide equality
decompose
discriminate
elim
elimType
exact
exists
fail
fold
fourier
fwd
generalize
goal
id
injection
intro
intros
lapply
left
letin
normalize
reduce
reflexivity
replace
rewrite
right
ring
symmetry
simplify
split
to
transitivity
whd
try
solve
do
repeat
first
print
check
hint
quit
set
elim
hint
instance
locate
match
def
forall
lambda
to
exists
Rightarrow
Assign
land
lor
subst
vdash
"
"