Debye frequency
cut-off angular frequency for waves of a harmonic chain of masses in the Debye model
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Debye frequency
Summary
Debye frequency is a cutoff[1].
Key Facts
- Debye frequency's instance of is recorded as cutoff[2].
- Peter Debye is named after Debye frequency[3].
- Debye frequency's subclass of is recorded as angular frequency[4].
- Debye frequency's has use is recorded as Debye model[5].
- Debye frequency's Freebase ID is recorded as /m/0csngv[6].
- Debye frequency's defining formula is recorded as \omega {\rm {D}}^{n}=(4\pi)^{n/2}\Gamma \left(1+{\tfrac {n}{2}}\right){\frac {N}{L^{n}}}v{\rm {s}}^{n}[7].
- Debye frequency's in defining formula is recorded as \omega_{\mathrm D}[8].
- Debye frequency's in defining formula is recorded as N/L^n[9].
- Debye frequency's in defining formula is recorded as n[10].
- Debye frequency's in defining formula is recorded as \Gamma[11].
- Debye frequency's in defining formula is recorded as v_{\mathrm s}[12].