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Orthogonal Quantum States
The examples of photons with vertical ("V") or horizontal ("H")
polarization introduce the concept of orthogonal quantum states. A "V"
photon will never pass a test for "H" polarization (and vice
versa), and so using the language of vectors, we say that "V"
and "H" are two orthogonal quantum states of a photon. It is
a remarkable property of photons that any other single-photon polarization
state can be formed from a suitable linear combination of "V"
and "H" states, possibly with complex coefficients. We say that
single-photon polarization is a two-state (or two-level) quantum system,
and that "V" and "H" form a basis for the space of
polarizations (an example of a Hilbert space).
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