Pure Point Spectrum
A self-adjoint operator A on H has pure point spectrum if and only if H has an orthonormal basis {ei}i ∈ I consisting of eigenvectors for A.
Example. The Hamiltonian for the harmonic oscillator has a quadratic potential V, that is
This Hamiltonian has pure point spectrum; this is typical for bound state Hamiltonians in quantum mechanics. As was pointed out in a previous example, a sufficient condition that an unbounded symmetric operator has eigenvectors which form a Hilbert space basis is that it has a compact inverse.
Read more about this topic: Self-adjoint Operator
Famous quotes containing the words pure and/or point:
“A reasonable change of the world can not be instrumented by pure reason.”
—Friedrich Dürrenmatt (1921–1990)
“When raging love with extreme pain
Most cruelly distrains my heart,
When that my tears, as floods of rain,
Bear witness of my woeful smart;
When sighs have wasted so my breath
That I lie at the point of death,”
—Henry Howard, Earl Of Surrey (1517?–1547)