設 
定義為 
的函式,以引數 
表示,由
 |
(1)
|
那麼拉格朗日反演定理,也稱為拉格朗日展開,指出任何 
的函式都可以表示為 
的冪級數,對於足夠小的 
收斂,並具有以下形式
![F(z)=F(w)+alpha/1phi(w)F^'(w)+(alpha^2)/(1·2)partial/(partialw){[phi(w)]^2F^'(w)}
+...+(alpha^(n+1))/((n+1)!)(partial^n)/(partialw^n){[phi(w)]^(n+1)F^'(w)}+....](/images/equations/LagrangeInversionTheorem/NumberedEquation2.svg) |
(2)
|
該定理也可以如下表述。設 
和 
其中 
, 那麼
![x=x_0+sum_(k=1)^infty((y-y_0)^k)/(k!){(d^(k-1))/(dx^(k-1))[(x-x_0)/(f(x)-y_0)]^k}_(x=x_0)](/images/equations/LagrangeInversionTheorem/NumberedEquation3.svg) |
(3)
|
![g(x)=g(x_0)+sum_(k=1)^infty((y-y_0)^k)/(k!){(d^(k-1))/(dx^(k-1))[g^'(x)((x-x_0)/(f(x)-y_0))^k]}_(x=x_0).](/images/equations/LagrangeInversionTheorem/NumberedEquation4.svg) |
(4)
|
這種形式的展開式最早由拉格朗日 (1770; 1868, pp. 680-693) 考慮。
拉格朗日反演定理
另請參閱
比爾曼定理, 麥克勞林級數, 舒爾-雅博廷斯基定理, 泰勒級數, 特謝拉定理使用 探索
參考文獻
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拉格朗日反演定理請引用本文為
韋斯坦因,埃裡克·W. "拉格朗日反演定理。" 來自 Web 資源。 https://mathworld.tw/LagrangeInversionTheorem.html