Bloch sphere
In quantum mechanics, the Bloch sphere is a geometrical representation of the pure state space of a two-level quantum mechanical system (qubit), named after the physicist Felix Bloch.
Quantum mechanics is mathematically formulated in Hilbert space or projective Hilbert space. The space of pure states of a quantum system is given by the one-dimensional subspaces of the corresponding Hilbert space (or the "points" of the projective Hilbert space). For a two-dimensional Hilbert space, this is simply the complex projective line ℂℙ1. This is the Bloch sphere.
The Bloch sphere is a unit 2-sphere, with each pair of antipodal points corresponding to mutually orthogonal state vectors.
The north and south poles of the Bloch sphere are typically chosen to correspond to the standard basis vectors 
and 
, respectively,
which in turn might correspond e.g. to the spin-up and spin-down states of an electron.
This choice is arbitrary, however.
The points on the surface of the sphere correspond to the pure states of the system, whereas the interior points correspond to the mixed states.
The Bloch sphere may be generalized to an n-level quantum system but then the visualization is less useful.
Podcasts:
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by Reffer
Polish
by: RefferYou disguise yourself
In fake smiles
That I have learned
Just not to respond at all
I feel sorrow when I see
Naive ones repaying you
Restless, uneasy
Obsessed and greedy
You made me count much on you
Great intensions planned
Then let me down
You capture me teeling over
That the flowers after spring will never fall
Cold I be deceived again?
Not by any chance
Can't you see you'd have to change
to have someone you trust?
Someone to be your friend by your side
Cause I know you'll need to find someone sometime to
lean on
That's all we're looking for...
You're always polishing the most precious stone
Determined to stare
Beyond a misty horizon
Sewing in gold the cheap steel
Too bad your brightnees blind my eyes
There's no point anymore