Debye function
non-elementary integral that arises in the Debye model of solids
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Debye function
Summary
Debye function is a function[1]. It draws 44 Wikipedia views per month (function category, ranking #53 of 114).[2]
Key Facts
- Debye function is credited with the discovery of Peter Debye[3].
- Debye function's instance of is recorded as function[4].
- Peter Debye is named after Debye function[5].
- Debye function's has use is recorded as Debye model[6].
- Debye function's Freebase ID is recorded as /m/024k0h[7].
- Debye function's defining formula is recorded as D_n(x) = \frac{n}{x^n} \int_0^x \frac{t^n}{e^t - 1}\,dt[8].
- Debye function's maintained by WikiProject is recorded as WikiProject Mathematics[9].
- Debye function's Microsoft Academic ID is recorded as 82192180[10].
- Debye function's in defining formula is recorded as D_n[11].
- Debye function's OpenAlex ID is recorded as C82192180[12].
- Debye function's power series expansion is recorded as D_n(x) = 1 - \frac{n}{2(n+1)} x + n \sum_{k=1}^\infty \frac{B_{2k}}{(2k+n)(2k)!} x^{2k}[13].
Body
Works and Contributions
Debye function is credited with the discovery of Peter Debye[3].
Why It Matters
Debye function draws 44 Wikipedia views per month (function category, ranking #53 of 114).[2] It has Wikipedia articles in 5 language editions, a strong signal of global cultural recognition.[14]