Physics:Limiting amplitude principle

In mathematics, the limiting amplitude principle is a concept from operator theory and scattering theory used for choosing a particular solution to the Helmholtz equation. The choice is made by considering a particular time-dependent problem of the forced oscillations due to the action of a periodic force. The principle was introduced by Andrey Nikolayevich Tikhonov and Alexander Andreevich Samarskii.^[1] It is closely related to the limiting absorption principle (1905) and the Sommerfeld radiation condition (1912). The terminology -- both the limiting absorption principle and the limiting amplitude principle -- was introduced by Aleksei Sveshnikov.^[2]

Formulation

To find which solution to the Helmholz equation with nonzero right-hand side

[math]\displaystyle{ \Delta v(x)+k^2 v(x)=-F(x),\quad x\in\R^3, }[/math]

with some fixed [math]\displaystyle{ k\gt 0 }[/math], corresponds to the outgoing waves, one considers the wave equation with the source term,

[math]\displaystyle{ (\Delta-\partial_t^2)u(x,t)=-F(x)e^{-i k t},\quad t\ge 0, \quad x\in\R^3, }[/math]

with zero initial data [math]\displaystyle{ u(x,0)=0,\,\partial_t u(x,0)=0 }[/math]. A particular solution to the Helmholtz equation corresponding to outgoing waves is obtained as the limit

[math]\displaystyle{ v(x)=\lim_{t\to +\infty}u(x,t)e^{i k t} }[/math]

for large times.^[1][3]

See also

• Limiting absorption principle
• Sommerfeld radiation condition

References

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