I am taking a quantum informatics and communication course, this is the first time I have faced with Dirac's Bra-ket notation.
I have the following equation(Swap gate with 3 cnot):
First equation
$|\phi_2\rangle = |i\bigoplus(i\bigoplus k)\rangle\bigotimes|i\bigoplus k\rangle$
the textbook derived this simplier formula :
$|\phi_2\rangle=|k\rangle\bigotimes|i\bigoplus k\rangle$
I came to the same answer , so my question is the rules I applied are they logically correct?
Here is my method:
- "Get rid of" the Kronecker sums by using the following property:
$i\bigoplus k = i\bigotimes I+I\bigotimes k$
but I also now $|i\rangle$ and $|k\rangle \in \{0,1\}$ so identity matrix(I) become the skalar 1(since $|k\rangle$ and $|i\rangle$ is also scalar)
$|i\bigotimes I + I \bigotimes (i\bigotimes k)\rangle\bigotimes|i \bigoplus k \rangle$=
=$|i\bigotimes (i\bigotimes k)\rangle\bigotimes |i\bigoplus k\rangle$=
since Kronecker product is associative
=$|(i\bigotimes i)\bigotimes k\rangle\bigotimes |i\bigoplus k\rangle$
I am not sure with the following, $i\bigotimes i = 1 $if i is scalar
and then $1 \bigotimes k$ = k?
=$|k\rangle\bigotimes|i\bigoplus k\rangle$
Thank you for your time!
