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QuantumFramework
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Exploring Fundamentals of Quantum Theory
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QuditBasis
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Wolfram`QuantumFramework`
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Examples
(
5
)
Basic Examples
(
4
)
Define a 2D basis with names:
I
n
[
1
]
:
=
Q
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B
a
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i
s
[
{
"
u
p
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,
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d
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}
]
O
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[
1
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=
|
d
o
w
n
〉
{
0
,
1
}
,
|
u
p
〉
{
1
,
0
}
Define a 2D basis:
I
n
[
1
]
:
=
Q
u
d
i
t
B
a
s
i
s
[
2
]
O
u
t
[
1
]
=
|
0
〉
{
1
,
0
}
,
|
1
〉
{
0
,
1
}
Define a 2
×
3 dimensional basis:
I
n
[
1
]
:
=
Q
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d
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B
a
s
i
s
[
{
2
,
3
}
]
O
u
t
[
1
]
=
|
0
0
〉
{
{
1
,
0
,
0
}
,
{
0
,
0
,
0
}
}
,
|
0
1
〉
{
{
0
,
1
,
0
}
,
{
0
,
0
,
0
}
}
,
|
0
2
〉
{
{
0
,
0
,
1
}
,
{
0
,
0
,
0
}
}
,
|
1
0
〉
{
{
0
,
0
,
0
}
,
{
1
,
0
,
0
}
}
,
|
1
1
〉
{
{
0
,
0
,
0
}
,
{
0
,
1
,
0
}
}
,
|
1
2
〉
{
{
0
,
0
,
0
}
,
{
0
,
0
,
1
}
}
Return corresponding basis for the named basis "Pauli":
I
n
[
1
]
:
=
Q
u
d
i
t
B
a
s
i
s
[
"
P
a
u
l
i
"
]
O
u
t
[
1
]
=
|
σ
0
〉
{
{
1
,
0
}
,
{
0
,
1
}
}
,
|
σ
1
〉
{
{
0
,
1
}
,
{
1
,
0
}
}
,
|
σ
2
〉
{
{
0
,
-
}
,
{
,
0
}
}
,
|
σ
3
〉
{
{
1
,
0
}
,
{
0
,
-
1
}
}
S
c
o
p
e
(
1
)
S
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A
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s
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Q
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▪
Q
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R
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▪
W
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f
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C
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w
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