10.4 Phase estimation
Let U be an N by N square matrix with complex entries. From section 5.9
det(U − λ IN) = 0
are the eigenvalues {λ1, λ2, …, λN} of U. Some of the λj may be equal. If a particular eigenvalue λ shows up k times among the N, we say λ has multiplicity k.
Each eigenvalue λj corresponds to an eigenvector vj so that
U vj = λj vj
can take each vj to be a unit vector.
When U is unitary, we can say even more: each λj has absolute value 1 and so can be represented as
λj = e2π ϕj i where 0 ≤ ϕj < 1.
This is slightly different notation than we’ve used before, but it is common. It is the product 2π ϕ that is the full radian measure of the rotation.
Now we are ready to pose the question whose solution we outline in this section:
Let U be a quantum transformation...
