Scattering amplitude

In quantum physics, the scattering amplitude is the probability amplitude of the outgoing spherical wave relative to the incoming plane wave in a stationary-state scattering process.^[1] The plane wave is described by the wavefunction

\psi (\mathbf {r} )=e^{ikz}+f(\theta ){\frac {e^{ikr}}{r}}\;,

where $\mathbf {r} \equiv (x,y,z)$ is the position vector; $r\equiv |\mathbf {r} |$ ; $e^{ikz}$ is the incoming plane wave with the wavenumber $k$ along the $z$ axis; $e^{ikr}/r$ is the outgoing spherical wave; $θ$ is the scattering angle; and $f(\theta )$ is the scattering amplitude. The dimension of the scattering amplitude is length.

The scattering amplitude is a probability amplitude; the differential cross-section as a function of scattering angle is given as its modulus squared,

{\frac {d\sigma }{d\Omega }}=|f(\theta )|^{2}\;.

X-rays[]

The scattering length for X-rays is the Thomson scattering length or classical electron radius, $r$ ₀.

Neutrons[]

The nuclear neutron scattering process involves the coherent neutron scattering length, often described by $b$ .

Quantum mechanical formalism[]

A quantum mechanical approach is given by the S matrix formalism.

Measurement[]

The scattering amplitude can be determined by the scattering length in the low-energy regime.

References[]

^ Quantum Mechanics: Concepts and Applications Archived 2010-11-10 at the Wayback Machine By Nouredine Zettili, 2nd edition, page 623. ISBN 978-0-470-02679-3 Paperback 688 pages January 2009

[1] Quantum Mechanics: Concepts and Applications Archived 2010-11-10 at the Wayback Machine By Nouredine Zettili, 2nd edition, page 623. ISBN 978-0-470-02679-3 Paperback 688 pages January 2009

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