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Proofgold Signed Transaction
vin
PrNHZ..
/
84ff4..
PUbwv..
/
82a34..
vout
PrNHZ..
/
54073..
63.97 bars
TMXQv..
/
74d97..
ownership of
1f19c..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMYnz..
/
426af..
ownership of
dfb94..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMXe5..
/
71ec9..
ownership of
b0aea..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMdbm..
/
b2a24..
ownership of
6cfb4..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMaEk..
/
8751e..
ownership of
f2cf1..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMScu..
/
610e7..
ownership of
04e5d..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMduW..
/
6c931..
ownership of
0a85f..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMQZk..
/
b0db7..
ownership of
caf07..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMNyh..
/
70c93..
ownership of
271f1..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMYNt..
/
773f0..
ownership of
ef39c..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMXBJ..
/
d7f5b..
ownership of
0343d..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMWGS..
/
30f1e..
ownership of
987b3..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMM2P..
/
7e1ad..
ownership of
80ed5..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMQf4..
/
43fb4..
ownership of
a2b35..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMX4j..
/
4cfbc..
ownership of
411ed..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMHqX..
/
1ff0d..
ownership of
134ba..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMK1N..
/
41812..
ownership of
da5de..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMVfk..
/
53be0..
ownership of
7fb30..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMQq4..
/
a4c45..
ownership of
2d01e..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMXte..
/
dfc9a..
ownership of
4089f..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMaBP..
/
36732..
ownership of
b64eb..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMShE..
/
68ad1..
ownership of
0337a..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMULr..
/
6f6ef..
ownership of
c4384..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMWbq..
/
5689a..
ownership of
0298e..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMTQG..
/
33128..
ownership of
9f095..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMTLB..
/
2af16..
ownership of
b4236..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMEny..
/
4a0f9..
ownership of
6ce0c..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMGbm..
/
9d4d9..
ownership of
ab7a7..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMa1T..
/
f9865..
ownership of
6a079..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMQQa..
/
784ef..
ownership of
fbee7..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMak9..
/
7c099..
ownership of
fbf90..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMF1R..
/
bb630..
ownership of
45860..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMH2G..
/
7187b..
ownership of
4b207..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMJoG..
/
94d64..
ownership of
e361b..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMTTR..
/
3bb0b..
ownership of
cfcd3..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMUMi..
/
c3f1e..
ownership of
dfb84..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMaLx..
/
f9935..
ownership of
dd7b0..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMKxQ..
/
fc5c0..
ownership of
0756a..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMS9E..
/
84dc4..
ownership of
209ef..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMWQp..
/
874f4..
ownership of
83d5e..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMQUy..
/
d1d66..
ownership of
5ccd4..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMTtm..
/
fe1a7..
ownership of
5c237..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMaRS..
/
ce769..
ownership of
85819..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMK9L..
/
8eeb8..
ownership of
a8e4e..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMX8L..
/
1575d..
ownership of
e67e1..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMbDM..
/
f5f7a..
ownership of
e48f2..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMG7j..
/
b4fc7..
ownership of
122e5..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMUBM..
/
71684..
ownership of
e18e0..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMFnV..
/
82b84..
ownership of
7dee0..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMZsT..
/
e5b3c..
ownership of
c716f..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMFrQ..
/
284f7..
ownership of
0d499..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMafE..
/
36a87..
ownership of
347c3..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMcYp..
/
e63f6..
ownership of
225be..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMVEi..
/
6ba12..
ownership of
64a2e..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMXzW..
/
608b1..
ownership of
4c64b..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMXwb..
/
bc954..
ownership of
80a90..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMNtz..
/
80d32..
ownership of
896e8..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMN2h..
/
b4b87..
ownership of
ec38b..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMGYu..
/
b563c..
ownership of
2984e..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMMhd..
/
da48f..
ownership of
d9f51..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMRwX..
/
319fc..
ownership of
a6c3c..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMGbY..
/
f7fbc..
ownership of
c6c5d..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMSZF..
/
4e1fa..
ownership of
f5214..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMJ4V..
/
9e35d..
ownership of
e16e7..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMY8v..
/
b3b2b..
ownership of
c0a79..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMP5B..
/
9a693..
ownership of
2161b..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMRPz..
/
f0974..
ownership of
0c018..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMcbd..
/
79842..
ownership of
5a904..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMY1m..
/
cc779..
ownership of
1b011..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMdMQ..
/
60d55..
ownership of
18376..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMGfF..
/
69896..
ownership of
a6a34..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMPey..
/
f0d07..
ownership of
2ad3f..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMYdd..
/
aef66..
ownership of
a9174..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMJbU..
/
97535..
ownership of
e30f2..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMaB8..
/
6a724..
ownership of
ec65d..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMZMU..
/
21ca0..
ownership of
777e8..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMd6F..
/
37e0e..
ownership of
5c75f..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMQCJ..
/
dbb5d..
ownership of
ea90c..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMNUe..
/
cf2f5..
ownership of
97ffd..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMSW9..
/
3bb0d..
ownership of
ad72a..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMEpv..
/
7aa9a..
ownership of
3cc99..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMR5b..
/
35b38..
ownership of
8faa1..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMahf..
/
ebf9b..
ownership of
d5104..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMM7b..
/
78d90..
ownership of
91a26..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMFbp..
/
87041..
ownership of
e84c3..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMNG5..
/
316e4..
ownership of
c8a0d..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMGy8..
/
f8429..
ownership of
b0521..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMUsp..
/
0b9f4..
ownership of
6e397..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMKUQ..
/
c2d89..
ownership of
3cd55..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMdag..
/
4f4ac..
ownership of
6face..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMY9H..
/
e099e..
ownership of
1a59f..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMPRu..
/
5139f..
ownership of
0665e..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMYmc..
/
9f656..
ownership of
58d64..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMPSq..
/
30ded..
ownership of
ebe6d..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMGE8..
/
9b2c3..
ownership of
7817d..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMYjy..
/
df899..
ownership of
64571..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMMcR..
/
7e2a5..
ownership of
77698..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMEgk..
/
c57c2..
ownership of
176f5..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMRfK..
/
ce342..
ownership of
7b42d..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMcBX..
/
d1777..
ownership of
a9014..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMTPR..
/
0cf99..
ownership of
575ab..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMPLU..
/
8f62d..
ownership of
80ea5..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMW8N..
/
294d9..
ownership of
8baec..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMKHq..
/
09b6b..
ownership of
e603b..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMF7N..
/
c966b..
ownership of
abaae..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMSKn..
/
03fe9..
ownership of
3b95b..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMV6x..
/
79f6d..
ownership of
21c47..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMJti..
/
c177a..
ownership of
767fd..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMMpv..
/
bcfa7..
ownership of
7ea9d..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMLVY..
/
8ce17..
ownership of
768a8..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMQeG..
/
77706..
ownership of
50a22..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMG8J..
/
94e36..
ownership of
905af..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMM3v..
/
c13b9..
ownership of
3f14e..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMHXh..
/
7d118..
ownership of
93fc9..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMbzR..
/
6f317..
ownership of
b0bea..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMUHv..
/
0ba99..
ownership of
4dd8f..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMYdX..
/
22480..
ownership of
1878d..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMHNJ..
/
dddc3..
ownership of
ba040..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMHhK..
/
f9e55..
ownership of
f0ff5..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMcwo..
/
af967..
ownership of
6b350..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMNg7..
/
4f3c7..
ownership of
95214..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMcoj..
/
7c203..
ownership of
15d87..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMGdr..
/
96374..
ownership of
7639b..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMY4v..
/
33a6f..
ownership of
60fe3..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMK1G..
/
cb938..
ownership of
7821b..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMbiE..
/
8b5ec..
ownership of
a6897..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMYnj..
/
055bf..
ownership of
28f7f..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMXDD..
/
99c8d..
ownership of
e081e..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMXaB..
/
4fd1e..
ownership of
5382c..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMVWT..
/
907fe..
ownership of
25d34..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMbTR..
/
13fab..
ownership of
9fce8..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMG7o..
/
18bf7..
ownership of
5b243..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMQfb..
/
8f74c..
ownership of
56551..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMLgN..
/
ae17c..
ownership of
3f6ec..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMQa6..
/
bd05d..
ownership of
1f7ab..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMSuz..
/
36d95..
ownership of
37bb2..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMGAD..
/
a1d38..
ownership of
68647..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMPxS..
/
56242..
ownership of
07def..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMZjf..
/
dc5ce..
ownership of
b3ff6..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMX7W..
/
1bc57..
ownership of
c3731..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMTXJ..
/
77209..
ownership of
67a2d..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMZsw..
/
069af..
ownership of
2747f..
as prop with payaddr
PrQUS..
rights free controlledby
PrQUS..
upto 0
TMcvQ..
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doc published by
PrQUS..
Param
CSNo
CSNo
:
ι
→
ο
Param
nIn
nIn
:
ι
→
ι
→
ο
Param
Sing
Sing
:
ι
→
ι
Param
ordsucc
ordsucc
:
ι
→
ι
Param
nat_p
nat_p
:
ι
→
ο
Definition
or
or
:=
λ x0 x1 : ο .
∀ x2 : ο .
(
x0
⟶
x2
)
⟶
(
x1
⟶
x2
)
⟶
x2
Param
ordinal
ordinal
:
ι
→
ο
Param
and
and
:
ο
→
ο
→
ο
Definition
ExtendedSNoElt_
ExtendedSNoElt_
:=
λ x0 x1 .
∀ x2 .
x2
∈
prim3
x1
⟶
or
(
ordinal
x2
)
(
∀ x3 : ο .
(
∀ x4 .
and
(
x4
∈
x0
)
(
x2
=
Sing
x4
)
⟶
x3
)
⟶
x3
)
Known
Sing_nat_fresh_extension
Sing_nat_fresh_extension
:
∀ x0 .
nat_p
x0
⟶
1
∈
x0
⟶
∀ x1 .
ExtendedSNoElt_
x0
x1
⟶
∀ x2 .
x2
∈
x1
⟶
nIn
(
Sing
x0
)
x2
Known
nat_3
nat_3
:
nat_p
3
Known
In_1_3
In_1_3
:
1
∈
3
Known
CSNo_ExtendedSNoElt_3
CSNo_ExtendedSNoElt_3
:
∀ x0 .
CSNo
x0
⟶
ExtendedSNoElt_
3
x0
Theorem
quaternion_tag_fresh
quaternion_tag_fresh
:
∀ x0 .
CSNo
x0
⟶
∀ x1 .
x1
∈
x0
⟶
nIn
(
Sing
3
)
x1
(proof)
Param
binunion
binunion
:
ι
→
ι
→
ι
Definition
SetAdjoin
SetAdjoin
:=
λ x0 x1 .
binunion
x0
(
Sing
x1
)
Definition
pair_tag
pair_tag
:=
λ x0 x1 x2 .
binunion
x1
{
SetAdjoin
x3
x0
|x3 ∈
x2
}
Definition
CSNo_pair
CSNo_pair
:=
pair_tag
(
Sing
3
)
Known
pair_tag_0
pair_tag_0
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 .
pair_tag
x0
x2
0
=
x2
Theorem
CSNo_pair_0
CSNo_pair_0
:
∀ x0 .
CSNo_pair
x0
0
=
x0
(proof)
Known
pair_tag_prop_1
pair_tag_prop_1
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 x4 x5 .
x1
x2
⟶
x1
x4
⟶
pair_tag
x0
x2
x3
=
pair_tag
x0
x4
x5
⟶
x2
=
x4
Theorem
CSNo_pair_prop_1
CSNo_pair_prop_1
:
∀ x0 x1 x2 x3 .
CSNo
x0
⟶
CSNo
x2
⟶
CSNo_pair
x0
x1
=
CSNo_pair
x2
x3
⟶
x0
=
x2
(proof)
Known
pair_tag_prop_2
pair_tag_prop_2
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 x4 x5 .
x1
x2
⟶
x1
x3
⟶
x1
x4
⟶
x1
x5
⟶
pair_tag
x0
x2
x3
=
pair_tag
x0
x4
x5
⟶
x3
=
x5
Theorem
CSNo_pair_prop_2
CSNo_pair_prop_2
:
∀ x0 x1 x2 x3 .
CSNo
x0
⟶
CSNo
x1
⟶
CSNo
x2
⟶
CSNo
x3
⟶
CSNo_pair
x0
x1
=
CSNo_pair
x2
x3
⟶
x1
=
x3
(proof)
Param
CD_carr
CD_carr
:
ι
→
(
ι
→
ο
) →
ι
→
ο
Definition
HSNo
HSNo
:=
CD_carr
(
Sing
3
)
CSNo
Known
CD_carr_I
CD_carr_I
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 .
x1
x2
⟶
x1
x3
⟶
CD_carr
x0
x1
(
pair_tag
x0
x2
x3
)
Theorem
HSNo_I
HSNo_I
:
∀ x0 x1 .
CSNo
x0
⟶
CSNo
x1
⟶
HSNo
(
CSNo_pair
x0
x1
)
(proof)
Known
CD_carr_E
CD_carr_E
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 .
CD_carr
x0
x1
x2
⟶
∀ x3 :
ι → ο
.
(
∀ x4 x5 .
x1
x4
⟶
x1
x5
⟶
x2
=
pair_tag
x0
x4
x5
⟶
x3
(
pair_tag
x0
x4
x5
)
)
⟶
x3
x2
Theorem
HSNo_E
HSNo_E
:
∀ x0 .
HSNo
x0
⟶
∀ x1 :
ι → ο
.
(
∀ x2 x3 .
CSNo
x2
⟶
CSNo
x3
⟶
x0
=
CSNo_pair
x2
x3
⟶
x1
(
CSNo_pair
x2
x3
)
)
⟶
x1
x0
(proof)
Known
CD_carr_0ext
CD_carr_0ext
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
x1
0
⟶
∀ x2 .
x1
x2
⟶
CD_carr
x0
x1
x2
Known
CSNo_0
CSNo_0
:
CSNo
0
Theorem
CSNo_HSNo
CSNo_HSNo
:
∀ x0 .
CSNo
x0
⟶
HSNo
x0
(proof)
Theorem
HSNo_0
HSNo_0
:
HSNo
0
(proof)
Known
CSNo_1
CSNo_1
:
CSNo
1
Theorem
HSNo_1
HSNo_1
:
HSNo
1
(proof)
Known
UnionE_impred
UnionE_impred
:
∀ x0 x1 .
x1
∈
prim3
x0
⟶
∀ x2 : ο .
(
∀ x3 .
x1
∈
x3
⟶
x3
∈
x0
⟶
x2
)
⟶
x2
Known
binunionE
binunionE
:
∀ x0 x1 x2 .
x2
∈
binunion
x0
x1
⟶
or
(
x2
∈
x0
)
(
x2
∈
x1
)
Param
Subq
Subq
:
ι
→
ι
→
ο
Known
extension_SNoElt_mon
extension_SNoElt_mon
:
∀ x0 x1 .
x0
⊆
x1
⟶
∀ x2 .
ExtendedSNoElt_
x0
x2
⟶
ExtendedSNoElt_
x1
x2
Known
ordsuccI1
ordsuccI1
:
∀ x0 .
x0
⊆
ordsucc
x0
Known
UnionI
UnionI
:
∀ x0 x1 x2 .
x1
∈
x2
⟶
x2
∈
x0
⟶
x1
∈
prim3
x0
Known
ReplE_impred
ReplE_impred
:
∀ x0 .
∀ x1 :
ι → ι
.
∀ x2 .
x2
∈
prim5
x0
x1
⟶
∀ x3 : ο .
(
∀ x4 .
x4
∈
x0
⟶
x2
=
x1
x4
⟶
x3
)
⟶
x3
Known
orIR
orIR
:
∀ x0 x1 : ο .
x1
⟶
or
x0
x1
Known
andI
andI
:
∀ x0 x1 : ο .
x0
⟶
x1
⟶
and
x0
x1
Known
In_3_4
In_3_4
:
3
∈
4
Known
SingE
SingE
:
∀ x0 x1 .
x1
∈
Sing
x0
⟶
x1
=
x0
Theorem
HSNo_ExtendedSNoElt_4
HSNo_ExtendedSNoElt_4
:
∀ x0 .
HSNo
x0
⟶
ExtendedSNoElt_
4
x0
(proof)
Definition
Quaternion_j
Quaternion_j
:=
CSNo_pair
0
1
Param
Complex_i
Complex_i
:
ι
Definition
Quaternion_k
Quaternion_k
:=
CSNo_pair
0
Complex_i
Param
CD_proj0
CD_proj0
:
ι
→
(
ι
→
ο
) →
ι
→
ι
Definition
HSNo_proj0
HSNo_proj0
:=
CD_proj0
(
Sing
3
)
CSNo
Param
CD_proj1
CD_proj1
:
ι
→
(
ι
→
ο
) →
ι
→
ι
Definition
HSNo_proj1
HSNo_proj1
:=
CD_proj1
(
Sing
3
)
CSNo
Known
CD_proj0_1
CD_proj0_1
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 .
CD_carr
x0
x1
x2
⟶
and
(
x1
(
CD_proj0
x0
x1
x2
)
)
(
∀ x3 : ο .
(
∀ x4 .
and
(
x1
x4
)
(
x2
=
pair_tag
x0
(
CD_proj0
x0
x1
x2
)
x4
)
⟶
x3
)
⟶
x3
)
Theorem
HSNo_proj0_1
HSNo_proj0_1
:
∀ x0 .
HSNo
x0
⟶
and
(
CSNo
(
HSNo_proj0
x0
)
)
(
∀ x1 : ο .
(
∀ x2 .
and
(
CSNo
x2
)
(
x0
=
CSNo_pair
(
HSNo_proj0
x0
)
x2
)
⟶
x1
)
⟶
x1
)
(proof)
Known
CD_proj0_2
CD_proj0_2
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 .
x1
x2
⟶
x1
x3
⟶
CD_proj0
x0
x1
(
pair_tag
x0
x2
x3
)
=
x2
Theorem
HSNo_proj0_2
HSNo_proj0_2
:
∀ x0 x1 .
CSNo
x0
⟶
CSNo
x1
⟶
HSNo_proj0
(
CSNo_pair
x0
x1
)
=
x0
(proof)
Known
CD_proj1_1
CD_proj1_1
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 .
CD_carr
x0
x1
x2
⟶
and
(
x1
(
CD_proj1
x0
x1
x2
)
)
(
x2
=
pair_tag
x0
(
CD_proj0
x0
x1
x2
)
(
CD_proj1
x0
x1
x2
)
)
Theorem
HSNo_proj1_1
HSNo_proj1_1
:
∀ x0 .
HSNo
x0
⟶
and
(
CSNo
(
HSNo_proj1
x0
)
)
(
x0
=
CSNo_pair
(
HSNo_proj0
x0
)
(
HSNo_proj1
x0
)
)
(proof)
Known
CD_proj1_2
CD_proj1_2
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 .
x1
x2
⟶
x1
x3
⟶
CD_proj1
x0
x1
(
pair_tag
x0
x2
x3
)
=
x3
Theorem
HSNo_proj1_2
HSNo_proj1_2
:
∀ x0 x1 .
CSNo
x0
⟶
CSNo
x1
⟶
HSNo_proj1
(
CSNo_pair
x0
x1
)
=
x1
(proof)
Known
CD_proj0R
CD_proj0R
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 .
CD_carr
x0
x1
x2
⟶
x1
(
CD_proj0
x0
x1
x2
)
Theorem
HSNo_proj0R
HSNo_proj0R
:
∀ x0 .
HSNo
x0
⟶
CSNo
(
HSNo_proj0
x0
)
(proof)
Known
CD_proj1R
CD_proj1R
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 .
CD_carr
x0
x1
x2
⟶
x1
(
CD_proj1
x0
x1
x2
)
Theorem
HSNo_proj1R
HSNo_proj1R
:
∀ x0 .
HSNo
x0
⟶
CSNo
(
HSNo_proj1
x0
)
(proof)
Known
CD_proj0proj1_eta
CD_proj0proj1_eta
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 .
CD_carr
x0
x1
x2
⟶
x2
=
pair_tag
x0
(
CD_proj0
x0
x1
x2
)
(
CD_proj1
x0
x1
x2
)
Theorem
HSNo_proj0p1
HSNo_proj0p1
:
∀ x0 .
HSNo
x0
⟶
x0
=
CSNo_pair
(
HSNo_proj0
x0
)
(
HSNo_proj1
x0
)
(proof)
Known
CD_proj0proj1_split
CD_proj0proj1_split
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 .
CD_carr
x0
x1
x2
⟶
CD_carr
x0
x1
x3
⟶
CD_proj0
x0
x1
x2
=
CD_proj0
x0
x1
x3
⟶
CD_proj1
x0
x1
x2
=
CD_proj1
x0
x1
x3
⟶
x2
=
x3
Theorem
HSNo_proj0proj1_split
HSNo_proj0proj1_split
:
∀ x0 x1 .
HSNo
x0
⟶
HSNo
x1
⟶
HSNo_proj0
x0
=
HSNo_proj0
x1
⟶
HSNo_proj1
x0
=
HSNo_proj1
x1
⟶
x0
=
x1
(proof)
Param
CSNoLev
CSNoLev
:
ι
→
ι
Definition
HSNoLev
HSNoLev
:=
λ x0 .
binunion
(
CSNoLev
(
HSNo_proj0
x0
)
)
(
CSNoLev
(
HSNo_proj1
x0
)
)
Known
ordinal_binunion
ordinal_binunion
:
∀ x0 x1 .
ordinal
x0
⟶
ordinal
x1
⟶
ordinal
(
binunion
x0
x1
)
Known
CSNoLev_ordinal
CSNoLev_ordinal
:
∀ x0 .
CSNo
x0
⟶
ordinal
(
CSNoLev
x0
)
Theorem
HSNoLev_ordinal
HSNoLev_ordinal
:
∀ x0 .
HSNo
x0
⟶
ordinal
(
HSNoLev
x0
)
(proof)
Param
CD_minus
CD_minus
:
ι
→
(
ι
→
ο
) →
(
ι
→
ι
) →
ι
→
ι
Param
minus_CSNo
minus_CSNo
:
ι
→
ι
Definition
minus_HSNo
minus_HSNo
:=
CD_minus
(
Sing
3
)
CSNo
minus_CSNo
Param
CD_conj
CD_conj
:
ι
→
(
ι
→
ο
) →
(
ι
→
ι
) →
(
ι
→
ι
) →
ι
→
ι
Param
conj_CSNo
conj_CSNo
:
ι
→
ι
Definition
conj_HSNo
conj_HSNo
:=
CD_conj
(
Sing
3
)
CSNo
minus_CSNo
conj_CSNo
Param
CD_add
CD_add
:
ι
→
(
ι
→
ο
) →
(
ι
→
ι
→
ι
) →
ι
→
ι
→
ι
Param
add_CSNo
add_CSNo
:
ι
→
ι
→
ι
Definition
add_HSNo
add_HSNo
:=
CD_add
(
Sing
3
)
CSNo
add_CSNo
Param
CD_mul
CD_mul
:
ι
→
(
ι
→
ο
) →
(
ι
→
ι
) →
(
ι
→
ι
) →
(
ι
→
ι
→
ι
) →
(
ι
→
ι
→
ι
) →
ι
→
ι
→
ι
Param
mul_CSNo
mul_CSNo
:
ι
→
ι
→
ι
Definition
mul_HSNo
mul_HSNo
:=
CD_mul
(
Sing
3
)
CSNo
minus_CSNo
conj_CSNo
add_CSNo
mul_CSNo
Param
CD_exp_nat
CD_exp_nat
:
ι
→
(
ι
→
ο
) →
(
ι
→
ι
) →
(
ι
→
ι
) →
(
ι
→
ι
→
ι
) →
(
ι
→
ι
→
ι
) →
ι
→
ι
→
ι
Definition
exp_HSNo_nat
exp_HSNo_nat
:=
CD_exp_nat
(
Sing
3
)
CSNo
minus_CSNo
conj_CSNo
add_CSNo
mul_CSNo
Known
CSNo_Complex_i
CSNo_Complex_i
:
CSNo
Complex_i
Theorem
HSNo_Complex_i
HSNo_Complex_i
:
HSNo
Complex_i
(proof)
Theorem
HSNo_Quaternion_j
HSNo_Quaternion_j
:
HSNo
Quaternion_j
(proof)
Theorem
HSNo_Quaternion_k
HSNo_Quaternion_k
:
HSNo
Quaternion_k
(proof)
Known
CD_minus_CD
CD_minus_CD
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι → ι
.
(
∀ x3 .
x1
x3
⟶
x1
(
x2
x3
)
)
⟶
∀ x3 .
CD_carr
x0
x1
x3
⟶
CD_carr
x0
x1
(
CD_minus
x0
x1
x2
x3
)
Known
CSNo_minus_CSNo
CSNo_minus_CSNo
:
∀ x0 .
CSNo
x0
⟶
CSNo
(
minus_CSNo
x0
)
Theorem
HSNo_minus_HSNo
HSNo_minus_HSNo
:
∀ x0 .
HSNo
x0
⟶
HSNo
(
minus_HSNo
x0
)
(proof)
Known
CD_minus_proj0
CD_minus_proj0
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι → ι
.
(
∀ x3 .
x1
x3
⟶
x1
(
x2
x3
)
)
⟶
∀ x3 .
CD_carr
x0
x1
x3
⟶
CD_proj0
x0
x1
(
CD_minus
x0
x1
x2
x3
)
=
x2
(
CD_proj0
x0
x1
x3
)
Theorem
minus_HSNo_proj0
minus_HSNo_proj0
:
∀ x0 .
HSNo
x0
⟶
HSNo_proj0
(
minus_HSNo
x0
)
=
minus_CSNo
(
HSNo_proj0
x0
)
(proof)
Known
CD_minus_proj1
CD_minus_proj1
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι → ι
.
(
∀ x3 .
x1
x3
⟶
x1
(
x2
x3
)
)
⟶
∀ x3 .
CD_carr
x0
x1
x3
⟶
CD_proj1
x0
x1
(
CD_minus
x0
x1
x2
x3
)
=
x2
(
CD_proj1
x0
x1
x3
)
Theorem
minus_HSNo_proj1
minus_HSNo_proj1
:
∀ x0 .
HSNo
x0
⟶
HSNo_proj1
(
minus_HSNo
x0
)
=
minus_CSNo
(
HSNo_proj1
x0
)
(proof)
Known
CD_conj_CD
CD_conj_CD
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι → ι
.
(
∀ x3 .
x1
x3
⟶
x1
(
x2
x3
)
)
⟶
∀ x3 :
ι → ι
.
(
∀ x4 .
x1
x4
⟶
x1
(
x3
x4
)
)
⟶
∀ x4 .
CD_carr
x0
x1
x4
⟶
CD_carr
x0
x1
(
CD_conj
x0
x1
x2
x3
x4
)
Known
CSNo_conj_CSNo
CSNo_conj_CSNo
:
∀ x0 .
CSNo
x0
⟶
CSNo
(
conj_CSNo
x0
)
Theorem
HSNo_conj_HSNo
HSNo_conj_HSNo
:
∀ x0 .
HSNo
x0
⟶
HSNo
(
conj_HSNo
x0
)
(proof)
Known
CD_conj_proj0
CD_conj_proj0
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι → ι
.
(
∀ x3 .
x1
x3
⟶
x1
(
x2
x3
)
)
⟶
∀ x3 :
ι → ι
.
(
∀ x4 .
x1
x4
⟶
x1
(
x3
x4
)
)
⟶
∀ x4 .
CD_carr
x0
x1
x4
⟶
CD_proj0
x0
x1
(
CD_conj
x0
x1
x2
x3
x4
)
=
x3
(
CD_proj0
x0
x1
x4
)
Theorem
conj_HSNo_proj0
conj_HSNo_proj0
:
∀ x0 .
HSNo
x0
⟶
HSNo_proj0
(
conj_HSNo
x0
)
=
conj_CSNo
(
HSNo_proj0
x0
)
(proof)
Known
CD_conj_proj1
CD_conj_proj1
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι → ι
.
(
∀ x3 .
x1
x3
⟶
x1
(
x2
x3
)
)
⟶
∀ x3 :
ι → ι
.
(
∀ x4 .
x1
x4
⟶
x1
(
x3
x4
)
)
⟶
∀ x4 .
CD_carr
x0
x1
x4
⟶
CD_proj1
x0
x1
(
CD_conj
x0
x1
x2
x3
x4
)
=
x2
(
CD_proj1
x0
x1
x4
)
Theorem
conj_HSNo_proj1
conj_HSNo_proj1
:
∀ x0 .
HSNo
x0
⟶
HSNo_proj1
(
conj_HSNo
x0
)
=
minus_CSNo
(
HSNo_proj1
x0
)
(proof)
Known
CD_add_CD
CD_add_CD
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι →
ι → ι
.
(
∀ x3 x4 .
x1
x3
⟶
x1
x4
⟶
x1
(
x2
x3
x4
)
)
⟶
∀ x3 x4 .
CD_carr
x0
x1
x3
⟶
CD_carr
x0
x1
x4
⟶
CD_carr
x0
x1
(
CD_add
x0
x1
x2
x3
x4
)
Known
CSNo_add_CSNo
CSNo_add_CSNo
:
∀ x0 x1 .
CSNo
x0
⟶
CSNo
x1
⟶
CSNo
(
add_CSNo
x0
x1
)
Theorem
HSNo_add_HSNo
HSNo_add_HSNo
:
∀ x0 x1 .
HSNo
x0
⟶
HSNo
x1
⟶
HSNo
(
add_HSNo
x0
x1
)
(proof)
Known
CD_add_proj0
CD_add_proj0
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι →
ι → ι
.
(
∀ x3 x4 .
x1
x3
⟶
x1
x4
⟶
x1
(
x2
x3
x4
)
)
⟶
∀ x3 x4 .
CD_carr
x0
x1
x3
⟶
CD_carr
x0
x1
x4
⟶
CD_proj0
x0
x1
(
CD_add
x0
x1
x2
x3
x4
)
=
x2
(
CD_proj0
x0
x1
x3
)
(
CD_proj0
x0
x1
x4
)
Theorem
add_HSNo_proj0
add_HSNo_proj0
:
∀ x0 x1 .
HSNo
x0
⟶
HSNo
x1
⟶
HSNo_proj0
(
add_HSNo
x0
x1
)
=
add_CSNo
(
HSNo_proj0
x0
)
(
HSNo_proj0
x1
)
(proof)
Known
CD_add_proj1
CD_add_proj1
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι →
ι → ι
.
(
∀ x3 x4 .
x1
x3
⟶
x1
x4
⟶
x1
(
x2
x3
x4
)
)
⟶
∀ x3 x4 .
CD_carr
x0
x1
x3
⟶
CD_carr
x0
x1
x4
⟶
CD_proj1
x0
x1
(
CD_add
x0
x1
x2
x3
x4
)
=
x2
(
CD_proj1
x0
x1
x3
)
(
CD_proj1
x0
x1
x4
)
Theorem
add_HSNo_proj1
add_HSNo_proj1
:
∀ x0 x1 .
HSNo
x0
⟶
HSNo
x1
⟶
HSNo_proj1
(
add_HSNo
x0
x1
)
=
add_CSNo
(
HSNo_proj1
x0
)
(
HSNo_proj1
x1
)
(proof)
Known
CD_mul_CD
CD_mul_CD
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 x5 :
ι →
ι → ι
.
(
∀ x6 .
x1
x6
⟶
x1
(
x2
x6
)
)
⟶
(
∀ x6 .
x1
x6
⟶
x1
(
x3
x6
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x4
x6
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x5
x6
x7
)
)
⟶
∀ x6 x7 .
CD_carr
x0
x1
x6
⟶
CD_carr
x0
x1
x7
⟶
CD_carr
x0
x1
(
CD_mul
x0
x1
x2
x3
x4
x5
x6
x7
)
Known
CSNo_mul_CSNo
CSNo_mul_CSNo
:
∀ x0 x1 .
CSNo
x0
⟶
CSNo
x1
⟶
CSNo
(
mul_CSNo
x0
x1
)
Theorem
HSNo_mul_HSNo
HSNo_mul_HSNo
:
∀ x0 x1 .
HSNo
x0
⟶
HSNo
x1
⟶
HSNo
(
mul_HSNo
x0
x1
)
(proof)
Known
CD_mul_proj0
CD_mul_proj0
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 x5 :
ι →
ι → ι
.
(
∀ x6 .
x1
x6
⟶
x1
(
x2
x6
)
)
⟶
(
∀ x6 .
x1
x6
⟶
x1
(
x3
x6
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x4
x6
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x5
x6
x7
)
)
⟶
∀ x6 x7 .
CD_carr
x0
x1
x6
⟶
CD_carr
x0
x1
x7
⟶
CD_proj0
x0
x1
(
CD_mul
x0
x1
x2
x3
x4
x5
x6
x7
)
=
x4
(
x5
(
CD_proj0
x0
x1
x6
)
(
CD_proj0
x0
x1
x7
)
)
(
x2
(
x5
(
x3
(
CD_proj1
x0
x1
x7
)
)
(
CD_proj1
x0
x1
x6
)
)
)
Theorem
mul_HSNo_proj0
mul_HSNo_proj0
:
∀ x0 x1 .
HSNo
x0
⟶
HSNo
x1
⟶
HSNo_proj0
(
mul_HSNo
x0
x1
)
=
add_CSNo
(
mul_CSNo
(
HSNo_proj0
x0
)
(
HSNo_proj0
x1
)
)
(
minus_CSNo
(
mul_CSNo
(
conj_CSNo
(
HSNo_proj1
x1
)
)
(
HSNo_proj1
x0
)
)
)
(proof)
Known
CD_mul_proj1
CD_mul_proj1
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 x5 :
ι →
ι → ι
.
(
∀ x6 .
x1
x6
⟶
x1
(
x2
x6
)
)
⟶
(
∀ x6 .
x1
x6
⟶
x1
(
x3
x6
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x4
x6
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x5
x6
x7
)
)
⟶
∀ x6 x7 .
CD_carr
x0
x1
x6
⟶
CD_carr
x0
x1
x7
⟶
CD_proj1
x0
x1
(
CD_mul
x0
x1
x2
x3
x4
x5
x6
x7
)
=
x4
(
x5
(
CD_proj1
x0
x1
x7
)
(
CD_proj0
x0
x1
x6
)
)
(
x5
(
CD_proj1
x0
x1
x6
)
(
x3
(
CD_proj0
x0
x1
x7
)
)
)
Theorem
mul_HSNo_proj1
mul_HSNo_proj1
:
∀ x0 x1 .
HSNo
x0
⟶
HSNo
x1
⟶
HSNo_proj1
(
mul_HSNo
x0
x1
)
=
add_CSNo
(
mul_CSNo
(
HSNo_proj1
x1
)
(
HSNo_proj0
x0
)
)
(
mul_CSNo
(
HSNo_proj1
x0
)
(
conj_CSNo
(
HSNo_proj0
x1
)
)
)
(proof)
Known
CD_proj0_F
CD_proj0_F
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
x1
0
⟶
∀ x2 .
x1
x2
⟶
CD_proj0
x0
x1
x2
=
x2
Theorem
CSNo_HSNo_proj0
CSNo_HSNo_proj0
:
∀ x0 .
CSNo
x0
⟶
HSNo_proj0
x0
=
x0
(proof)
Known
CD_proj1_F
CD_proj1_F
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
x1
0
⟶
∀ x2 .
x1
x2
⟶
CD_proj1
x0
x1
x2
=
0
Theorem
CSNo_HSNo_proj1
CSNo_HSNo_proj1
:
∀ x0 .
CSNo
x0
⟶
HSNo_proj1
x0
=
0
(proof)
Theorem
HSNo_p0_0
HSNo_p0_0
:
HSNo_proj0
0
=
0
(proof)
Theorem
HSNo_p1_0
HSNo_p1_0
:
HSNo_proj1
0
=
0
(proof)
Theorem
HSNo_p0_1
HSNo_p0_1
:
HSNo_proj0
1
=
1
(proof)
Theorem
HSNo_p1_1
HSNo_p1_1
:
HSNo_proj1
1
=
0
(proof)
Theorem
HSNo_p0_i
HSNo_p0_i
:
HSNo_proj0
Complex_i
=
Complex_i
(proof)
Theorem
HSNo_p1_i
HSNo_p1_i
:
HSNo_proj1
Complex_i
=
0
(proof)
Theorem
HSNo_p0_j
HSNo_p0_j
:
HSNo_proj0
Quaternion_j
=
0
(proof)
Theorem
HSNo_p1_j
HSNo_p1_j
:
HSNo_proj1
Quaternion_j
=
1
(proof)
Theorem
HSNo_p0_k
HSNo_p0_k
:
HSNo_proj0
Quaternion_k
=
0
(proof)
Theorem
HSNo_p1_k
HSNo_p1_k
:
HSNo_proj1
Quaternion_k
=
Complex_i
(proof)
Known
CD_minus_F_eq
CD_minus_F_eq
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι → ι
.
x1
0
⟶
x2
0
=
0
⟶
∀ x3 .
x1
x3
⟶
CD_minus
x0
x1
x2
x3
=
x2
x3
Known
minus_CSNo_0
minus_CSNo_0
:
minus_CSNo
0
=
0
Theorem
minus_HSNo_minus_CSNo
minus_HSNo_minus_CSNo
:
∀ x0 .
CSNo
x0
⟶
minus_HSNo
x0
=
minus_CSNo
x0
(proof)
Theorem
minus_HSNo_0
minus_HSNo_0
:
minus_HSNo
0
=
0
(proof)
Known
CD_conj_F_eq
CD_conj_F_eq
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι → ι
.
x1
0
⟶
x2
0
=
0
⟶
∀ x3 :
ι → ι
.
∀ x4 .
x1
x4
⟶
CD_conj
x0
x1
x2
x3
x4
=
x3
x4
Theorem
conj_HSNo_conj_CSNo
conj_HSNo_conj_CSNo
:
∀ x0 .
CSNo
x0
⟶
conj_HSNo
x0
=
conj_CSNo
x0
(proof)
Param
SNo
SNo
:
ι
→
ο
Known
SNo_CSNo
SNo_CSNo
:
∀ x0 .
SNo
x0
⟶
CSNo
x0
Known
conj_CSNo_id_SNo
conj_CSNo_id_SNo
:
∀ x0 .
SNo
x0
⟶
conj_CSNo
x0
=
x0
Theorem
conj_HSNo_id_SNo
conj_HSNo_id_SNo
:
∀ x0 .
SNo
x0
⟶
conj_HSNo
x0
=
x0
(proof)
Known
conj_CSNo_0
conj_CSNo_0
:
conj_CSNo
0
=
0
Theorem
conj_HSNo_0
conj_HSNo_0
:
conj_HSNo
0
=
0
(proof)
Known
conj_CSNo_1
conj_CSNo_1
:
conj_CSNo
1
=
1
Theorem
conj_HSNo_1
conj_HSNo_1
:
conj_HSNo
1
=
1
(proof)
Known
CD_add_F_eq
CD_add_F_eq
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι →
ι → ι
.
x1
0
⟶
x2
0
0
=
0
⟶
∀ x3 x4 .
x1
x3
⟶
x1
x4
⟶
CD_add
x0
x1
x2
x3
x4
=
x2
x3
x4
Known
add_CSNo_0L
add_CSNo_0L
:
∀ x0 .
CSNo
x0
⟶
add_CSNo
0
x0
=
x0
Theorem
add_HSNo_add_CSNo
add_HSNo_add_CSNo
:
∀ x0 x1 .
CSNo
x0
⟶
CSNo
x1
⟶
add_HSNo
x0
x1
=
add_CSNo
x0
x1
(proof)
Known
CD_mul_F_eq
CD_mul_F_eq
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 x5 :
ι →
ι → ι
.
x1
0
⟶
(
∀ x6 .
x1
x6
⟶
x1
(
x3
x6
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x5
x6
x7
)
)
⟶
x2
0
=
0
⟶
(
∀ x6 .
x1
x6
⟶
x4
x6
0
=
x6
)
⟶
(
∀ x6 .
x1
x6
⟶
x5
0
x6
=
0
)
⟶
(
∀ x6 .
x1
x6
⟶
x5
x6
0
=
0
)
⟶
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
CD_mul
x0
x1
x2
x3
x4
x5
x6
x7
=
x5
x6
x7
Known
add_CSNo_0R
add_CSNo_0R
:
∀ x0 .
CSNo
x0
⟶
add_CSNo
x0
0
=
x0
Known
mul_CSNo_0L
mul_CSNo_0L
:
∀ x0 .
CSNo
x0
⟶
mul_CSNo
0
x0
=
0
Known
mul_CSNo_0R
mul_CSNo_0R
:
∀ x0 .
CSNo
x0
⟶
mul_CSNo
x0
0
=
0
Theorem
mul_HSNo_mul_CSNo
mul_HSNo_mul_CSNo
:
∀ x0 x1 .
CSNo
x0
⟶
CSNo
x1
⟶
mul_HSNo
x0
x1
=
mul_CSNo
x0
x1
(proof)
Known
CD_minus_invol
CD_minus_invol
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι → ι
.
(
∀ x3 .
x1
x3
⟶
x1
(
x2
x3
)
)
⟶
(
∀ x3 .
x1
x3
⟶
x2
(
x2
x3
)
=
x3
)
⟶
∀ x3 .
CD_carr
x0
x1
x3
⟶
CD_minus
x0
x1
x2
(
CD_minus
x0
x1
x2
x3
)
=
x3
Known
minus_CSNo_invol
minus_CSNo_invol
:
∀ x0 .
CSNo
x0
⟶
minus_CSNo
(
minus_CSNo
x0
)
=
x0
Theorem
minus_HSNo_invol
minus_HSNo_invol
:
∀ x0 .
HSNo
x0
⟶
minus_HSNo
(
minus_HSNo
x0
)
=
x0
(proof)
Known
CD_conj_invol
CD_conj_invol
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
(
∀ x4 .
x1
x4
⟶
x1
(
x2
x4
)
)
⟶
(
∀ x4 .
x1
x4
⟶
x1
(
x3
x4
)
)
⟶
(
∀ x4 .
x1
x4
⟶
x2
(
x2
x4
)
=
x4
)
⟶
(
∀ x4 .
x1
x4
⟶
x3
(
x3
x4
)
=
x4
)
⟶
∀ x4 .
CD_carr
x0
x1
x4
⟶
CD_conj
x0
x1
x2
x3
(
CD_conj
x0
x1
x2
x3
x4
)
=
x4
Known
conj_CSNo_invol
conj_CSNo_invol
:
∀ x0 .
CSNo
x0
⟶
conj_CSNo
(
conj_CSNo
x0
)
=
x0
Theorem
conj_HSNo_invol
conj_HSNo_invol
:
∀ x0 .
HSNo
x0
⟶
conj_HSNo
(
conj_HSNo
x0
)
=
x0
(proof)
Known
CD_conj_minus
CD_conj_minus
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
(
∀ x4 .
x1
x4
⟶
x1
(
x2
x4
)
)
⟶
(
∀ x4 .
x1
x4
⟶
x1
(
x3
x4
)
)
⟶
(
∀ x4 .
x1
x4
⟶
x3
(
x2
x4
)
=
x2
(
x3
x4
)
)
⟶
∀ x4 .
CD_carr
x0
x1
x4
⟶
CD_conj
x0
x1
x2
x3
(
CD_minus
x0
x1
x2
x4
)
=
CD_minus
x0
x1
x2
(
CD_conj
x0
x1
x2
x3
x4
)
Known
conj_minus_CSNo
conj_minus_CSNo
:
∀ x0 .
CSNo
x0
⟶
conj_CSNo
(
minus_CSNo
x0
)
=
minus_CSNo
(
conj_CSNo
x0
)
Theorem
conj_minus_HSNo
conj_minus_HSNo
:
∀ x0 .
HSNo
x0
⟶
conj_HSNo
(
minus_HSNo
x0
)
=
minus_HSNo
(
conj_HSNo
x0
)
(proof)
Known
CD_minus_add
CD_minus_add
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι → ι
.
∀ x3 :
ι →
ι → ι
.
(
∀ x4 .
x1
x4
⟶
x1
(
x2
x4
)
)
⟶
(
∀ x4 x5 .
x1
x4
⟶
x1
x5
⟶
x1
(
x3
x4
x5
)
)
⟶
(
∀ x4 x5 .
x1
x4
⟶
x1
x5
⟶
x2
(
x3
x4
x5
)
=
x3
(
x2
x4
)
(
x2
x5
)
)
⟶
∀ x4 x5 .
CD_carr
x0
x1
x4
⟶
CD_carr
x0
x1
x5
⟶
CD_minus
x0
x1
x2
(
CD_add
x0
x1
x3
x4
x5
)
=
CD_add
x0
x1
x3
(
CD_minus
x0
x1
x2
x4
)
(
CD_minus
x0
x1
x2
x5
)
Known
minus_add_CSNo
minus_add_CSNo
:
∀ x0 x1 .
CSNo
x0
⟶
CSNo
x1
⟶
minus_CSNo
(
add_CSNo
x0
x1
)
=
add_CSNo
(
minus_CSNo
x0
)
(
minus_CSNo
x1
)
Theorem
minus_add_HSNo
minus_add_HSNo
:
∀ x0 x1 .
HSNo
x0
⟶
HSNo
x1
⟶
minus_HSNo
(
add_HSNo
x0
x1
)
=
add_HSNo
(
minus_HSNo
x0
)
(
minus_HSNo
x1
)
(proof)
Known
CD_conj_add
CD_conj_add
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 :
ι →
ι → ι
.
(
∀ x5 .
x1
x5
⟶
x1
(
x2
x5
)
)
⟶
(
∀ x5 .
x1
x5
⟶
x1
(
x3
x5
)
)
⟶
(
∀ x5 x6 .
x1
x5
⟶
x1
x6
⟶
x1
(
x4
x5
x6
)
)
⟶
(
∀ x5 x6 .
x1
x5
⟶
x1
x6
⟶
x2
(
x4
x5
x6
)
=
x4
(
x2
x5
)
(
x2
x6
)
)
⟶
(
∀ x5 x6 .
x1
x5
⟶
x1
x6
⟶
x3
(
x4
x5
x6
)
=
x4
(
x3
x5
)
(
x3
x6
)
)
⟶
∀ x5 x6 .
CD_carr
x0
x1
x5
⟶
CD_carr
x0
x1
x6
⟶
CD_conj
x0
x1
x2
x3
(
CD_add
x0
x1
x4
x5
x6
)
=
CD_add
x0
x1
x4
(
CD_conj
x0
x1
x2
x3
x5
)
(
CD_conj
x0
x1
x2
x3
x6
)
Known
conj_add_CSNo
conj_add_CSNo
:
∀ x0 x1 .
CSNo
x0
⟶
CSNo
x1
⟶
conj_CSNo
(
add_CSNo
x0
x1
)
=
add_CSNo
(
conj_CSNo
x0
)
(
conj_CSNo
x1
)
Theorem
conj_add_HSNo
conj_add_HSNo
:
∀ x0 x1 .
HSNo
x0
⟶
HSNo
x1
⟶
conj_HSNo
(
add_HSNo
x0
x1
)
=
add_HSNo
(
conj_HSNo
x0
)
(
conj_HSNo
x1
)
(proof)
Known
CD_add_com
CD_add_com
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι →
ι → ι
.
(
∀ x3 x4 .
x1
x3
⟶
x1
x4
⟶
x2
x3
x4
=
x2
x4
x3
)
⟶
∀ x3 x4 .
CD_carr
x0
x1
x3
⟶
CD_carr
x0
x1
x4
⟶
CD_add
x0
x1
x2
x3
x4
=
CD_add
x0
x1
x2
x4
x3
Known
add_CSNo_com
add_CSNo_com
:
∀ x0 x1 .
CSNo
x0
⟶
CSNo
x1
⟶
add_CSNo
x0
x1
=
add_CSNo
x1
x0
Theorem
add_HSNo_com
add_HSNo_com
:
∀ x0 x1 .
HSNo
x0
⟶
HSNo
x1
⟶
add_HSNo
x0
x1
=
add_HSNo
x1
x0
(proof)
Known
CD_add_assoc
CD_add_assoc
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι →
ι → ι
.
(
∀ x3 x4 .
x1
x3
⟶
x1
x4
⟶
x1
(
x2
x3
x4
)
)
⟶
(
∀ x3 x4 x5 .
x1
x3
⟶
x1
x4
⟶
x1
x5
⟶
x2
(
x2
x3
x4
)
x5
=
x2
x3
(
x2
x4
x5
)
)
⟶
∀ x3 x4 x5 .
CD_carr
x0
x1
x3
⟶
CD_carr
x0
x1
x4
⟶
CD_carr
x0
x1
x5
⟶
CD_add
x0
x1
x2
(
CD_add
x0
x1
x2
x3
x4
)
x5
=
CD_add
x0
x1
x2
x3
(
CD_add
x0
x1
x2
x4
x5
)
Known
add_CSNo_assoc
add_CSNo_assoc
:
∀ x0 x1 x2 .
CSNo
x0
⟶
CSNo
x1
⟶
CSNo
x2
⟶
add_CSNo
(
add_CSNo
x0
x1
)
x2
=
add_CSNo
x0
(
add_CSNo
x1
x2
)
Theorem
add_HSNo_assoc
add_HSNo_assoc
:
∀ x0 x1 x2 .
HSNo
x0
⟶
HSNo
x1
⟶
HSNo
x2
⟶
add_HSNo
(
add_HSNo
x0
x1
)
x2
=
add_HSNo
x0
(
add_HSNo
x1
x2
)
(proof)
Known
CD_add_0L
CD_add_0L
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι →
ι → ι
.
x1
0
⟶
(
∀ x3 .
x1
x3
⟶
x2
0
x3
=
x3
)
⟶
∀ x3 .
CD_carr
x0
x1
x3
⟶
CD_add
x0
x1
x2
0
x3
=
x3
Theorem
add_HSNo_0L
add_HSNo_0L
:
∀ x0 .
HSNo
x0
⟶
add_HSNo
0
x0
=
x0
(proof)
Known
CD_add_0R
CD_add_0R
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι →
ι → ι
.
x1
0
⟶
(
∀ x3 .
x1
x3
⟶
x2
x3
0
=
x3
)
⟶
∀ x3 .
CD_carr
x0
x1
x3
⟶
CD_add
x0
x1
x2
x3
0
=
x3
Theorem
add_HSNo_0R
add_HSNo_0R
:
∀ x0 .
HSNo
x0
⟶
add_HSNo
x0
0
=
x0
(proof)
Known
CD_add_minus_linv
CD_add_minus_linv
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι → ι
.
∀ x3 :
ι →
ι → ι
.
(
∀ x4 .
x1
x4
⟶
x1
(
x2
x4
)
)
⟶
(
∀ x4 .
x1
x4
⟶
x3
(
x2
x4
)
x4
=
0
)
⟶
∀ x4 .
CD_carr
x0
x1
x4
⟶
CD_add
x0
x1
x3
(
CD_minus
x0
x1
x2
x4
)
x4
=
0
Known
add_CSNo_minus_CSNo_linv
add_CSNo_minus_CSNo_linv
:
∀ x0 .
CSNo
x0
⟶
add_CSNo
(
minus_CSNo
x0
)
x0
=
0
Theorem
add_HSNo_minus_HSNo_linv
add_HSNo_minus_HSNo_linv
:
∀ x0 .
HSNo
x0
⟶
add_HSNo
(
minus_HSNo
x0
)
x0
=
0
(proof)
Known
CD_add_minus_rinv
CD_add_minus_rinv
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 :
ι → ι
.
∀ x3 :
ι →
ι → ι
.
(
∀ x4 .
x1
x4
⟶
x1
(
x2
x4
)
)
⟶
(
∀ x4 .
x1
x4
⟶
x3
x4
(
x2
x4
)
=
0
)
⟶
∀ x4 .
CD_carr
x0
x1
x4
⟶
CD_add
x0
x1
x3
x4
(
CD_minus
x0
x1
x2
x4
)
=
0
Known
add_CSNo_minus_CSNo_rinv
add_CSNo_minus_CSNo_rinv
:
∀ x0 .
CSNo
x0
⟶
add_CSNo
x0
(
minus_CSNo
x0
)
=
0
Theorem
add_HSNo_minus_HSNo_rinv
add_HSNo_minus_HSNo_rinv
:
∀ x0 .
HSNo
x0
⟶
add_HSNo
x0
(
minus_HSNo
x0
)
=
0
(proof)
Known
CD_mul_0R
CD_mul_0R
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 x5 :
ι →
ι → ι
.
x1
0
⟶
x2
0
=
0
⟶
x3
0
=
0
⟶
x4
0
0
=
0
⟶
(
∀ x6 .
x1
x6
⟶
x5
0
x6
=
0
)
⟶
(
∀ x6 .
x1
x6
⟶
x5
x6
0
=
0
)
⟶
∀ x6 .
CD_carr
x0
x1
x6
⟶
CD_mul
x0
x1
x2
x3
x4
x5
x6
0
=
0
Theorem
mul_HSNo_0R
mul_HSNo_0R
:
∀ x0 .
HSNo
x0
⟶
mul_HSNo
x0
0
=
0
(proof)
Known
CD_mul_0L
CD_mul_0L
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 x5 :
ι →
ι → ι
.
x1
0
⟶
(
∀ x6 .
x1
x6
⟶
x1
(
x3
x6
)
)
⟶
x2
0
=
0
⟶
x4
0
0
=
0
⟶
(
∀ x6 .
x1
x6
⟶
x5
0
x6
=
0
)
⟶
(
∀ x6 .
x1
x6
⟶
x5
x6
0
=
0
)
⟶
∀ x6 .
CD_carr
x0
x1
x6
⟶
CD_mul
x0
x1
x2
x3
x4
x5
0
x6
=
0
Theorem
mul_HSNo_0L
mul_HSNo_0L
:
∀ x0 .
HSNo
x0
⟶
mul_HSNo
0
x0
=
0
(proof)
Known
CD_mul_1R
CD_mul_1R
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 x5 :
ι →
ι → ι
.
x1
0
⟶
x1
1
⟶
x2
0
=
0
⟶
x3
0
=
0
⟶
x3
1
=
1
⟶
(
∀ x6 .
x1
x6
⟶
x4
0
x6
=
x6
)
⟶
(
∀ x6 .
x1
x6
⟶
x4
x6
0
=
x6
)
⟶
(
∀ x6 .
x1
x6
⟶
x5
0
x6
=
0
)
⟶
(
∀ x6 .
x1
x6
⟶
x5
x6
1
=
x6
)
⟶
∀ x6 .
CD_carr
x0
x1
x6
⟶
CD_mul
x0
x1
x2
x3
x4
x5
x6
1
=
x6
Known
mul_CSNo_1R
mul_CSNo_1R
:
∀ x0 .
CSNo
x0
⟶
mul_CSNo
x0
1
=
x0
Theorem
mul_HSNo_1R
mul_HSNo_1R
:
∀ x0 .
HSNo
x0
⟶
mul_HSNo
x0
1
=
x0
(proof)
Known
CD_mul_1L
CD_mul_1L
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 x5 :
ι →
ι → ι
.
x1
0
⟶
x1
1
⟶
(
∀ x6 .
x1
x6
⟶
x1
(
x3
x6
)
)
⟶
x2
0
=
0
⟶
(
∀ x6 .
x1
x6
⟶
x4
x6
0
=
x6
)
⟶
(
∀ x6 .
x1
x6
⟶
x5
0
x6
=
0
)
⟶
(
∀ x6 .
x1
x6
⟶
x5
x6
0
=
0
)
⟶
(
∀ x6 .
x1
x6
⟶
x5
1
x6
=
x6
)
⟶
(
∀ x6 .
x1
x6
⟶
x5
x6
1
=
x6
)
⟶
∀ x6 .
CD_carr
x0
x1
x6
⟶
CD_mul
x0
x1
x2
x3
x4
x5
1
x6
=
x6
Known
mul_CSNo_1L
mul_CSNo_1L
:
∀ x0 .
CSNo
x0
⟶
mul_CSNo
1
x0
=
x0
Theorem
mul_HSNo_1L
mul_HSNo_1L
:
∀ x0 .
HSNo
x0
⟶
mul_HSNo
1
x0
=
x0
(proof)
Known
CD_conj_mul
CD_conj_mul
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 x5 :
ι →
ι → ι
.
(
∀ x6 .
x1
x6
⟶
x1
(
x2
x6
)
)
⟶
(
∀ x6 .
x1
x6
⟶
x1
(
x3
x6
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x4
x6
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x5
x6
x7
)
)
⟶
(
∀ x6 .
x1
x6
⟶
x2
(
x2
x6
)
=
x6
)
⟶
(
∀ x6 .
x1
x6
⟶
x3
(
x3
x6
)
=
x6
)
⟶
(
∀ x6 .
x1
x6
⟶
x3
(
x2
x6
)
=
x2
(
x3
x6
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x3
(
x4
x6
x7
)
=
x4
(
x3
x6
)
(
x3
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x2
(
x4
x6
x7
)
=
x4
(
x2
x6
)
(
x2
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x4
x6
x7
=
x4
x7
x6
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x3
(
x5
x6
x7
)
=
x5
(
x3
x7
)
(
x3
x6
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x5
x6
(
x2
x7
)
=
x2
(
x5
x6
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x5
(
x2
x6
)
x7
=
x2
(
x5
x6
x7
)
)
⟶
∀ x6 x7 .
CD_carr
x0
x1
x6
⟶
CD_carr
x0
x1
x7
⟶
CD_conj
x0
x1
x2
x3
(
CD_mul
x0
x1
x2
x3
x4
x5
x6
x7
)
=
CD_mul
x0
x1
x2
x3
x4
x5
(
CD_conj
x0
x1
x2
x3
x7
)
(
CD_conj
x0
x1
x2
x3
x6
)
Known
conj_mul_CSNo
conj_mul_CSNo
:
∀ x0 x1 .
CSNo
x0
⟶
CSNo
x1
⟶
conj_CSNo
(
mul_CSNo
x0
x1
)
=
mul_CSNo
(
conj_CSNo
x1
)
(
conj_CSNo
x0
)
Known
minus_mul_CSNo_distrR
minus_mul_CSNo_distrR
:
∀ x0 x1 .
CSNo
x0
⟶
CSNo
x1
⟶
mul_CSNo
x0
(
minus_CSNo
x1
)
=
minus_CSNo
(
mul_CSNo
x0
x1
)
Known
minus_mul_CSNo_distrL
minus_mul_CSNo_distrL
:
∀ x0 x1 .
CSNo
x0
⟶
CSNo
x1
⟶
mul_CSNo
(
minus_CSNo
x0
)
x1
=
minus_CSNo
(
mul_CSNo
x0
x1
)
Theorem
conj_mul_HSNo
conj_mul_HSNo
:
∀ x0 x1 .
HSNo
x0
⟶
HSNo
x1
⟶
conj_HSNo
(
mul_HSNo
x0
x1
)
=
mul_HSNo
(
conj_HSNo
x1
)
(
conj_HSNo
x0
)
(proof)
Known
CD_add_mul_distrL
CD_add_mul_distrL
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 x5 :
ι →
ι → ι
.
(
∀ x6 .
x1
x6
⟶
x1
(
x2
x6
)
)
⟶
(
∀ x6 .
x1
x6
⟶
x1
(
x3
x6
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x4
x6
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x5
x6
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x2
(
x4
x6
x7
)
=
x4
(
x2
x6
)
(
x2
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x3
(
x4
x6
x7
)
=
x4
(
x3
x6
)
(
x3
x7
)
)
⟶
(
∀ x6 x7 x8 .
x1
x6
⟶
x1
x7
⟶
x1
x8
⟶
x4
(
x4
x6
x7
)
x8
=
x4
x6
(
x4
x7
x8
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x4
x6
x7
=
x4
x7
x6
)
⟶
(
∀ x6 x7 x8 .
x1
x6
⟶
x1
x7
⟶
x1
x8
⟶
x5
x6
(
x4
x7
x8
)
=
x4
(
x5
x6
x7
)
(
x5
x6
x8
)
)
⟶
(
∀ x6 x7 x8 .
x1
x6
⟶
x1
x7
⟶
x1
x8
⟶
x5
(
x4
x6
x7
)
x8
=
x4
(
x5
x6
x8
)
(
x5
x7
x8
)
)
⟶
∀ x6 x7 x8 .
CD_carr
x0
x1
x6
⟶
CD_carr
x0
x1
x7
⟶
CD_carr
x0
x1
x8
⟶
CD_mul
x0
x1
x2
x3
x4
x5
x6
(
CD_add
x0
x1
x4
x7
x8
)
=
CD_add
x0
x1
x4
(
CD_mul
x0
x1
x2
x3
x4
x5
x6
x7
)
(
CD_mul
x0
x1
x2
x3
x4
x5
x6
x8
)
Known
mul_CSNo_distrL
mul_CSNo_distrL
:
∀ x0 x1 x2 .
CSNo
x0
⟶
CSNo
x1
⟶
CSNo
x2
⟶
mul_CSNo
x0
(
add_CSNo
x1
x2
)
=
add_CSNo
(
mul_CSNo
x0
x1
)
(
mul_CSNo
x0
x2
)
Known
mul_CSNo_distrR
mul_CSNo_distrR
:
∀ x0 x1 x2 .
CSNo
x0
⟶
CSNo
x1
⟶
CSNo
x2
⟶
mul_CSNo
(
add_CSNo
x0
x1
)
x2
=
add_CSNo
(
mul_CSNo
x0
x2
)
(
mul_CSNo
x1
x2
)
Theorem
mul_HSNo_distrL
mul_HSNo_distrL
:
∀ x0 x1 x2 .
HSNo
x0
⟶
HSNo
x1
⟶
HSNo
x2
⟶
mul_HSNo
x0
(
add_HSNo
x1
x2
)
=
add_HSNo
(
mul_HSNo
x0
x1
)
(
mul_HSNo
x0
x2
)
(proof)
Known
CD_add_mul_distrR
CD_add_mul_distrR
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 x5 :
ι →
ι → ι
.
(
∀ x6 .
x1
x6
⟶
x1
(
x2
x6
)
)
⟶
(
∀ x6 .
x1
x6
⟶
x1
(
x3
x6
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x4
x6
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x5
x6
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x2
(
x4
x6
x7
)
=
x4
(
x2
x6
)
(
x2
x7
)
)
⟶
(
∀ x6 x7 x8 .
x1
x6
⟶
x1
x7
⟶
x1
x8
⟶
x4
(
x4
x6
x7
)
x8
=
x4
x6
(
x4
x7
x8
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x4
x6
x7
=
x4
x7
x6
)
⟶
(
∀ x6 x7 x8 .
x1
x6
⟶
x1
x7
⟶
x1
x8
⟶
x5
x6
(
x4
x7
x8
)
=
x4
(
x5
x6
x7
)
(
x5
x6
x8
)
)
⟶
(
∀ x6 x7 x8 .
x1
x6
⟶
x1
x7
⟶
x1
x8
⟶
x5
(
x4
x6
x7
)
x8
=
x4
(
x5
x6
x8
)
(
x5
x7
x8
)
)
⟶
∀ x6 x7 x8 .
CD_carr
x0
x1
x6
⟶
CD_carr
x0
x1
x7
⟶
CD_carr
x0
x1
x8
⟶
CD_mul
x0
x1
x2
x3
x4
x5
(
CD_add
x0
x1
x4
x6
x7
)
x8
=
CD_add
x0
x1
x4
(
CD_mul
x0
x1
x2
x3
x4
x5
x6
x8
)
(
CD_mul
x0
x1
x2
x3
x4
x5
x7
x8
)
Theorem
mul_HSNo_distrR
mul_HSNo_distrR
:
∀ x0 x1 x2 .
HSNo
x0
⟶
HSNo
x1
⟶
HSNo
x2
⟶
mul_HSNo
(
add_HSNo
x0
x1
)
x2
=
add_HSNo
(
mul_HSNo
x0
x2
)
(
mul_HSNo
x1
x2
)
(proof)
Known
CD_minus_mul_distrR
CD_minus_mul_distrR
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 x5 :
ι →
ι → ι
.
(
∀ x6 .
x1
x6
⟶
x1
(
x2
x6
)
)
⟶
(
∀ x6 .
x1
x6
⟶
x1
(
x3
x6
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x4
x6
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x5
x6
x7
)
)
⟶
(
∀ x6 .
x1
x6
⟶
x3
(
x2
x6
)
=
x2
(
x3
x6
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x2
(
x4
x6
x7
)
=
x4
(
x2
x6
)
(
x2
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x5
x6
(
x2
x7
)
=
x2
(
x5
x6
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x5
(
x2
x6
)
x7
=
x2
(
x5
x6
x7
)
)
⟶
∀ x6 x7 .
CD_carr
x0
x1
x6
⟶
CD_carr
x0
x1
x7
⟶
CD_mul
x0
x1
x2
x3
x4
x5
x6
(
CD_minus
x0
x1
x2
x7
)
=
CD_minus
x0
x1
x2
(
CD_mul
x0
x1
x2
x3
x4
x5
x6
x7
)
Theorem
minus_mul_HSNo_distrR
minus_mul_HSNo_distrR
:
∀ x0 x1 .
HSNo
x0
⟶
HSNo
x1
⟶
mul_HSNo
x0
(
minus_HSNo
x1
)
=
minus_HSNo
(
mul_HSNo
x0
x1
)
(proof)
Known
CD_minus_mul_distrL
CD_minus_mul_distrL
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 x5 :
ι →
ι → ι
.
(
∀ x6 .
x1
x6
⟶
x1
(
x2
x6
)
)
⟶
(
∀ x6 .
x1
x6
⟶
x1
(
x3
x6
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x4
x6
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x5
x6
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x2
(
x4
x6
x7
)
=
x4
(
x2
x6
)
(
x2
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x5
x6
(
x2
x7
)
=
x2
(
x5
x6
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x5
(
x2
x6
)
x7
=
x2
(
x5
x6
x7
)
)
⟶
∀ x6 x7 .
CD_carr
x0
x1
x6
⟶
CD_carr
x0
x1
x7
⟶
CD_mul
x0
x1
x2
x3
x4
x5
(
CD_minus
x0
x1
x2
x6
)
x7
=
CD_minus
x0
x1
x2
(
CD_mul
x0
x1
x2
x3
x4
x5
x6
x7
)
Theorem
minus_mul_HSNo_distrL
minus_mul_HSNo_distrL
:
∀ x0 x1 .
HSNo
x0
⟶
HSNo
x1
⟶
mul_HSNo
(
minus_HSNo
x0
)
x1
=
minus_HSNo
(
mul_HSNo
x0
x1
)
(proof)
Known
CD_exp_nat_0
CD_exp_nat_0
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 x5 :
ι →
ι → ι
.
∀ x6 .
CD_exp_nat
x0
x1
x2
x3
x4
x5
x6
0
=
1
Theorem
exp_HSNo_nat_0
exp_HSNo_nat_0
:
∀ x0 .
exp_HSNo_nat
x0
0
=
1
(proof)
Known
CD_exp_nat_S
CD_exp_nat_S
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 x5 :
ι →
ι → ι
.
∀ x6 x7 .
nat_p
x7
⟶
CD_exp_nat
x0
x1
x2
x3
x4
x5
x6
(
ordsucc
x7
)
=
CD_mul
x0
x1
x2
x3
x4
x5
x6
(
CD_exp_nat
x0
x1
x2
x3
x4
x5
x6
x7
)
Theorem
exp_HSNo_nat_S
exp_HSNo_nat_S
:
∀ x0 x1 .
nat_p
x1
⟶
exp_HSNo_nat
x0
(
ordsucc
x1
)
=
mul_HSNo
x0
(
exp_HSNo_nat
x0
x1
)
(proof)
Known
CD_exp_nat_1
CD_exp_nat_1
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 x5 :
ι →
ι → ι
.
x1
0
⟶
x1
1
⟶
x2
0
=
0
⟶
x3
0
=
0
⟶
x3
1
=
1
⟶
(
∀ x6 .
x1
x6
⟶
x4
0
x6
=
x6
)
⟶
(
∀ x6 .
x1
x6
⟶
x4
x6
0
=
x6
)
⟶
(
∀ x6 .
x1
x6
⟶
x5
0
x6
=
0
)
⟶
(
∀ x6 .
x1
x6
⟶
x5
x6
1
=
x6
)
⟶
∀ x6 .
CD_carr
x0
x1
x6
⟶
CD_exp_nat
x0
x1
x2
x3
x4
x5
x6
1
=
x6
Theorem
exp_HSNo_nat_1
exp_HSNo_nat_1
:
∀ x0 .
HSNo
x0
⟶
exp_HSNo_nat
x0
1
=
x0
(proof)
Known
CD_exp_nat_2
CD_exp_nat_2
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 x5 :
ι →
ι → ι
.
x1
0
⟶
x1
1
⟶
x2
0
=
0
⟶
x3
0
=
0
⟶
x3
1
=
1
⟶
(
∀ x6 .
x1
x6
⟶
x4
0
x6
=
x6
)
⟶
(
∀ x6 .
x1
x6
⟶
x4
x6
0
=
x6
)
⟶
(
∀ x6 .
x1
x6
⟶
x5
0
x6
=
0
)
⟶
(
∀ x6 .
x1
x6
⟶
x5
x6
1
=
x6
)
⟶
∀ x6 .
CD_carr
x0
x1
x6
⟶
CD_exp_nat
x0
x1
x2
x3
x4
x5
x6
2
=
CD_mul
x0
x1
x2
x3
x4
x5
x6
x6
Theorem
exp_HSNo_nat_2
exp_HSNo_nat_2
:
∀ x0 .
HSNo
x0
⟶
exp_HSNo_nat
x0
2
=
mul_HSNo
x0
x0
(proof)
Known
CD_exp_nat_CD
CD_exp_nat_CD
:
∀ x0 .
∀ x1 :
ι → ο
.
(
∀ x2 .
x1
x2
⟶
∀ x3 .
x3
∈
x2
⟶
nIn
x0
x3
)
⟶
∀ x2 x3 :
ι → ι
.
∀ x4 x5 :
ι →
ι → ι
.
(
∀ x6 .
x1
x6
⟶
x1
(
x2
x6
)
)
⟶
(
∀ x6 .
x1
x6
⟶
x1
(
x3
x6
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x4
x6
x7
)
)
⟶
(
∀ x6 x7 .
x1
x6
⟶
x1
x7
⟶
x1
(
x5
x6
x7
)
)
⟶
x1
0
⟶
x1
1
⟶
∀ x6 .
CD_carr
x0
x1
x6
⟶
∀ x7 .
nat_p
x7
⟶
CD_carr
x0
x1
(
CD_exp_nat
x0
x1
x2
x3
x4
x5
x6
x7
)
Theorem
HSNo_exp_HSNo_nat
HSNo_exp_HSNo_nat
:
∀ x0 .
HSNo
x0
⟶
∀ x1 .
nat_p
x1
⟶
HSNo
(
exp_HSNo_nat
x0
x1
)
(proof)
Theorem
add_CSNo_com_3b_1_2
add_CSNo_com_3b_1_2
:
∀ x0 x1 x2 .
CSNo
x0
⟶
CSNo
x1
⟶
CSNo
x2
⟶
add_CSNo
(
add_CSNo
x0
x1
)
x2
=
add_CSNo
(
add_CSNo
x0
x2
)
x1
(proof)
Theorem
add_CSNo_com_4_inner_mid
add_CSNo_com_4_inner_mid
:
∀ x0 x1 x2 x3 .
CSNo
x0
⟶
CSNo
x1
⟶
CSNo
x2
⟶
CSNo
x3
⟶
add_CSNo
(
add_CSNo
x0
x1
)
(
add_CSNo
x2
x3
)
=
add_CSNo
(
add_CSNo
x0
x2
)
(
add_CSNo
x1
x3
)
(proof)
Theorem
add_CSNo_rotate_4_0312
add_CSNo_rotate_4_0312
:
∀ x0 x1 x2 x3 .
CSNo
x0
⟶
CSNo
x1
⟶
CSNo
x2
⟶
CSNo
x3
⟶
add_CSNo
(
add_CSNo
x0
x1
)
(
add_CSNo
x2
x3
)
=
add_CSNo
(
add_CSNo
x0
x3
)
(
add_CSNo
x1
x2
)
(proof)
Known
Complex_i_sqr
Complex_i_sqr
:
mul_CSNo
Complex_i
Complex_i
=
minus_CSNo
1
Theorem
Quaternion_i_sqr
Quaternion_i_sqr
:
mul_HSNo
Complex_i
Complex_i
=
minus_HSNo
1
(proof)
Theorem
Quaternion_j_sqr
Quaternion_j_sqr
:
mul_HSNo
Quaternion_j
Quaternion_j
=
minus_HSNo
1
(proof)
Known
conj_CSNo_i
conj_CSNo_i
:
conj_CSNo
Complex_i
=
minus_CSNo
Complex_i
Theorem
Quaternion_k_sqr
Quaternion_k_sqr
:
mul_HSNo
Quaternion_k
Quaternion_k
=
minus_HSNo
1
(proof)
Theorem
Quaternion_i_j
Quaternion_i_j
:
mul_HSNo
Complex_i
Quaternion_j
=
Quaternion_k
(proof)
Known
SNo_0
SNo_0
:
SNo
0
Theorem
Quaternion_j_k
Quaternion_j_k
:
mul_HSNo
Quaternion_j
Quaternion_k
=
Complex_i
(proof)
Theorem
Quaternion_k_i
Quaternion_k_i
:
mul_HSNo
Quaternion_k
Complex_i
=
Quaternion_j
(proof)
Theorem
Quaternion_j_i
Quaternion_j_i
:
mul_HSNo
Quaternion_j
Complex_i
=
minus_HSNo
Quaternion_k
(proof)
Known
SNo_1
SNo_1
:
SNo
1
Theorem
Quaternion_k_j
Quaternion_k_j
:
mul_HSNo
Quaternion_k
Quaternion_j
=
minus_HSNo
Complex_i
(proof)
Theorem
Quaternion_i_k
Quaternion_i_k
:
mul_HSNo
Complex_i
Quaternion_k
=
minus_HSNo
Quaternion_j
(proof)
Theorem
add_CSNo_rotate_3_1
add_CSNo_rotate_3_1
:
∀ x0 x1 x2 .
CSNo
x0
⟶
CSNo
x1
⟶
CSNo
x2
⟶
add_CSNo
x0
(
add_CSNo
x1
x2
)
=
add_CSNo
x2
(
add_CSNo
x0
x1
)
(proof)
Known
mul_CSNo_com
mul_CSNo_com
:
∀ x0 x1 .
CSNo
x0
⟶
CSNo
x1
⟶
mul_CSNo
x0
x1
=
mul_CSNo
x1
x0
Known
mul_CSNo_assoc
mul_CSNo_assoc
:
∀ x0 x1 x2 .
CSNo
x0
⟶
CSNo
x1
⟶
CSNo
x2
⟶
mul_CSNo
x0
(
mul_CSNo
x1
x2
)
=
mul_CSNo
(
mul_CSNo
x0
x1
)
x2
Theorem
mul_CSNo_rotate_3_1
mul_CSNo_rotate_3_1
:
∀ x0 x1 x2 .
CSNo
x0
⟶
CSNo
x1
⟶
CSNo
x2
⟶
mul_CSNo
x0
(
mul_CSNo
x1
x2
)
=
mul_CSNo
x2
(
mul_CSNo
x0
x1
)
(proof)
Theorem
conj_HSNo_i
conj_HSNo_i
:
conj_HSNo
Complex_i
=
minus_HSNo
Complex_i
(proof)
Theorem
conj_HSNo_j
conj_HSNo_j
:
conj_HSNo
Quaternion_j
=
minus_HSNo
Quaternion_j
(proof)
Theorem
conj_HSNo_k
conj_HSNo_k
:
conj_HSNo
Quaternion_k
=
minus_HSNo
Quaternion_k
(proof)