7.5 The Bloch sphere
We describe the state of a qubit by a vector
a |0⟩ + b |1⟩ = r1 eϕ1 i |0⟩ + r2 eϕ2 i |1⟩
in C2 with r1 and r2 non-negative numbers in R.
The magnitudes r1 and r2 are related by r12 + r22 = 1. This is a mathematical condition. We saw in section 7.3 2 − ϕ1 that is significant and not the individual phases ϕ1 and ϕ2. This is a physical condition and it also means we can take a to be real.
We also saw that we could represent a quantum state as
|ψ⟩ = cos(θ/2) |0⟩ + sin(θ/2) eϕ i |1⟩.
We do this via a non-linear projection and a change of coordinates, and get a point on the surface of the Bloch sphere.
The two angles have the ranges 0 ≤ θ ≤ π and 0 ≤ ϕ < 2π. θ is measured from the positive z axis and ϕ from the positive x axis in the xy...
